tm: thys/Abacus.thy@a9003e6d0463 (annotated)

173 b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	1	(* Title: thys/Abacus.thy
b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	2	Author: Jian Xu, Xingyuan Zhang, and Christian Urban
b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	3	*)
b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	4
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	5	chapter {* Abacus Machines *}
173 b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	6
163 67063c5365e1 changed theory names to uppercase Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 115 diff changeset	7	theory Abacus
173 b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	8	imports Turing_Hoare Abacus_Mopup
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	9	begin
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	10
111 dfc629cd11de made uncomputable compatible with abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 101 diff changeset	11	declare replicate_Suc[simp add]
dfc629cd11de made uncomputable compatible with abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 101 diff changeset	12
165 582916f289ea took out all deadcode from abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 163 diff changeset	13	(* Abacus instructions *)
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	14
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	15	datatype abc_inst =
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	16	Inc nat
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	17	\| Dec nat nat
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	18	\| Goto nat
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	19
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	20	type_synonym abc_prog = "abc_inst list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	21
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	22	type_synonym abc_state = nat
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	23
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	24	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	25	The memory of Abacus machine is defined as a list of contents, with
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	26	every units addressed by index into the list.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	27	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	28	type_synonym abc_lm = "nat list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	29
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	30	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	31	Fetching contents out of memory. Units not represented by list elements are considered
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	32	as having content @{text "0"}.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	33	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	34	fun abc_lm_v :: "abc_lm \<Rightarrow> nat \<Rightarrow> nat"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	35	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	36	"abc_lm_v lm n = (if (n < length lm) then (lm!n) else 0)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	37
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	38
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	39	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	40	Set the content of memory unit @{text "n"} to value @{text "v"}.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	41	@{text "am"} is the Abacus memory before setting.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	42	If address @{text "n"} is outside to scope of @{text "am"}, @{text "am"}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	43	is extended so that @{text "n"} becomes in scope.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	44	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	45
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	46	fun abc_lm_s :: "abc_lm \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> abc_lm"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	47	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	48	"abc_lm_s am n v = (if (n < length am) then (am[n:=v]) else
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	49	am@ (replicate (n - length am) 0) @ [v])"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	50
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	51
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	52	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	53	The configuration of Abaucs machines consists of its current state and its
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	54	current memory:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	55	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	56	type_synonym abc_conf = "abc_state \<times> abc_lm"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	57
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	58	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	59	Fetch instruction out of Abacus program:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	60	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	61
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	62	fun abc_fetch :: "nat \<Rightarrow> abc_prog \<Rightarrow> abc_inst option"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	63	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	64	"abc_fetch s p = (if (s < length p) then Some (p ! s)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	65	else None)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	66
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	67	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	68	Single step execution of Abacus machine. If no instruction is feteched,
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	69	configuration does not change.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	70	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	71	fun abc_step_l :: "abc_conf \<Rightarrow> abc_inst option \<Rightarrow> abc_conf"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	72	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	73	"abc_step_l (s, lm) a = (case a of
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	74	None \<Rightarrow> (s, lm) \|
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	75	Some (Inc n) \<Rightarrow> (let nv = abc_lm_v lm n in
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	76	(s + 1, abc_lm_s lm n (nv + 1))) \|
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	77	Some (Dec n e) \<Rightarrow> (let nv = abc_lm_v lm n in
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	78	if (nv = 0) then (e, abc_lm_s lm n 0)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	79	else (s + 1, abc_lm_s lm n (nv - 1))) \|
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	80	Some (Goto n) \<Rightarrow> (n, lm)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	81	)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	82
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	83	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	84	Multi-step execution of Abacus machine.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	85	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	86	fun abc_steps_l :: "abc_conf \<Rightarrow> abc_prog \<Rightarrow> nat \<Rightarrow> abc_conf"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	87	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	88	"abc_steps_l (s, lm) p 0 = (s, lm)" \|
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	89	"abc_steps_l (s, lm) p (Suc n) =
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	90	abc_steps_l (abc_step_l (s, lm) (abc_fetch s p)) p n"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	91
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	92	section {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	93	Compiling Abacus machines into Truing machines
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	94	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	95
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	96	subsection {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	97	Compiling functions
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	98	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	99
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	100	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	101	@{text "findnth n"} returns the TM which locates the represention of
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	102	memory cell @{text "n"} on the tape and changes representation of zero
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	103	on the way.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	104	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	105
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	106	fun findnth :: "nat \<Rightarrow> instr list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	107	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	108	"findnth 0 = []" \|
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	109	"findnth (Suc n) = (findnth n @ [(W1, 2 * n + 1),
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	110	(R, 2 * n + 2), (R, 2 * n + 3), (R, 2 * n + 2)])"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	111
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	112	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	113	@{text "tinc_b"} returns the TM which increments the representation
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	114	of the memory cell under rw-head by one and move the representation
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	115	of cells afterwards to the right accordingly.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	116	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	117
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	118	definition tinc_b :: "instr list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	119	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	120	"tinc_b \<equiv> [(W1, 1), (R, 2), (W1, 3), (R, 2), (W1, 3), (R, 4),
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	121	(L, 7), (W0, 5), (R, 6), (W0, 5), (W1, 3), (R, 6),
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	122	(L, 8), (L, 7), (R, 9), (L, 7), (R, 10), (W0, 9)]"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	123
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	124	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	125	@{text "tinc ss n"} returns the TM which simulates the execution of
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	126	Abacus instruction @{text "Inc n"}, assuming that TM is located at
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	127	location @{text "ss"} in the final TM complied from the whole
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	128	Abacus program.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	129	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	130
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	131	fun tinc :: "nat \<Rightarrow> nat \<Rightarrow> instr list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	132	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	133	"tinc ss n = shift (findnth n @ shift tinc_b (2 * n)) (ss - 1)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	134
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	135	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	136	@{text "tinc_b"} returns the TM which decrements the representation
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	137	of the memory cell under rw-head by one and move the representation
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	138	of cells afterwards to the left accordingly.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	139	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	140
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	141	definition tdec_b :: "instr list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	142	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	143	"tdec_b \<equiv> [(W1, 1), (R, 2), (L, 14), (R, 3), (L, 4), (R, 3),
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	144	(R, 5), (W0, 4), (R, 6), (W0, 5), (L, 7), (L, 8),
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	145	(L, 11), (W0, 7), (W1, 8), (R, 9), (L, 10), (R, 9),
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	146	(R, 5), (W0, 10), (L, 12), (L, 11), (R, 13), (L, 11),
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	147	(R, 17), (W0, 13), (L, 15), (L, 14), (R, 16), (L, 14),
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	148	(R, 0), (W0, 16)]"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	149
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	150
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	151	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	152	@{text "tdec ss n label"} returns the TM which simulates the execution of
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	153	Abacus instruction @{text "Dec n label"}, assuming that TM is located at
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	154	location @{text "ss"} in the final TM complied from the whole
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	155	Abacus program.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	156	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	157
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	158	fun tdec :: "nat \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> instr list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	159	where
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	160	"tdec ss n e = shift (findnth n) (ss - 1) @ adjust (shift (shift tdec_b (2 * n)) (ss - 1)) e"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	161
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	162	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	163	@{text "tgoto f(label)"} returns the TM simulating the execution of Abacus instruction
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	164	@{text "Goto label"}, where @{text "f(label)"} is the corresponding location of
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	165	@{text "label"} in the final TM compiled from the overall Abacus program.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	166	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	167
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	168	fun tgoto :: "nat \<Rightarrow> instr list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	169	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	170	"tgoto n = [(Nop, n), (Nop, n)]"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	171
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	172	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	173	The layout of the final TM compiled from an Abacus program is represented
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	174	as a list of natural numbers, where the list element at index @{text "n"} represents the
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	175	starting state of the TM simulating the execution of @{text "n"}-th instruction
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	176	in the Abacus program.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	177	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	178
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	179	type_synonym layout = "nat list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	180
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	181	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	182	@{text "length_of i"} is the length of the
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	183	TM simulating the Abacus instruction @{text "i"}.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	184	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	185	fun length_of :: "abc_inst \<Rightarrow> nat"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	186	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	187	"length_of i = (case i of
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	188	Inc n \<Rightarrow> 2 * n + 9 \|
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	189	Dec n e \<Rightarrow> 2 * n + 16 \|
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	190	Goto n \<Rightarrow> 1)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	191
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	192	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	193	@{text "layout_of ap"} returns the layout of Abacus program @{text "ap"}.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	194	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	195	fun layout_of :: "abc_prog \<Rightarrow> layout"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	196	where "layout_of ap = map length_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	197
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	198
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	199	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	200	@{text "start_of layout n"} looks out the starting state of @{text "n"}-th
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	201	TM in the finall TM.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	202	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	203
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	204	fun start_of :: "nat list \<Rightarrow> nat \<Rightarrow> nat"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	205	where
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	206	"start_of ly x = (Suc (sum_list (take x ly))) "
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	207
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	208	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	209	@{text "ci lo ss i"} complies Abacus instruction @{text "i"}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	210	assuming the TM of @{text "i"} starts from state @{text "ss"}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	211	within the overal layout @{text "lo"}.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	212	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	213
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	214	fun ci :: "layout \<Rightarrow> nat \<Rightarrow> abc_inst \<Rightarrow> instr list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	215	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	216	"ci ly ss (Inc n) = tinc ss n"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	217	\| "ci ly ss (Dec n e) = tdec ss n (start_of ly e)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	218	\| "ci ly ss (Goto n) = tgoto (start_of ly n)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	219
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	220	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	221	@{text "tpairs_of ap"} transfroms Abacus program @{text "ap"} pairing
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	222	every instruction with its starting state.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	223	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	224
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	225	fun tpairs_of :: "abc_prog \<Rightarrow> (nat \<times> abc_inst) list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	226	where "tpairs_of ap = (zip (map (start_of (layout_of ap))
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	227	[0..<(length ap)]) ap)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	228
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	229	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	230	@{text "tms_of ap"} returns the list of TMs, where every one of them simulates
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	231	the corresponding Abacus intruction in @{text "ap"}.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	232	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	233
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	234	fun tms_of :: "abc_prog \<Rightarrow> (instr list) list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	235	where "tms_of ap = map (\<lambda> (n, tm). ci (layout_of ap) n tm)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	236	(tpairs_of ap)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	237
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	238	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	239	@{text "tm_of ap"} returns the final TM machine compiled from Abacus program @{text "ap"}.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	240	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	241	fun tm_of :: "abc_prog \<Rightarrow> instr list"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	242	where "tm_of ap = concat (tms_of ap)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	243
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	244	lemma length_findnth:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	245	"length (findnth n) = 4 * n"
165 582916f289ea took out all deadcode from abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 163 diff changeset	246	by (induct n, auto)
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	247
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	248	lemma ci_length : "length (ci ns n ai) div 2 = length_of ai"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	249	apply(auto simp: ci.simps tinc_b_def tdec_b_def length_findnth
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	250	split: abc_inst.splits simp del: adjust.simps)
f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	251
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	252	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	253
165 582916f289ea took out all deadcode from abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 163 diff changeset	254	subsection {* Representation of Abacus memory by TM tapes *}
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	255
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	256	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	257	@{text "crsp acf tcf"} meams the abacus configuration @{text "acf"}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	258	is corretly represented by the TM configuration @{text "tcf"}.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	259	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	260
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	261	fun crsp :: "layout \<Rightarrow> abc_conf \<Rightarrow> config \<Rightarrow> cell list \<Rightarrow> bool"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	262	where
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	263	"crsp ly (as, lm) (s, l, r) inres =
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	264	(s = start_of ly as \<and> (\<exists> x. r = <lm> @ Bk\<up>x) \<and>
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	265	l = Bk # Bk # inres)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	266
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	267	declare crsp.simps[simp del]
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	268
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	269	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	270	The type of invarints expressing correspondence between
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	271	Abacus configuration and TM configuration.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	272	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	273
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	274	type_synonym inc_inv_t = "abc_conf \<Rightarrow> config \<Rightarrow> cell list \<Rightarrow> bool"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	275
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	276	declare tms_of.simps[simp del] tm_of.simps[simp del]
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	277	layout_of.simps[simp del] abc_fetch.simps [simp del]
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	278	tpairs_of.simps[simp del] start_of.simps[simp del]
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	279	ci.simps [simp del] length_of.simps[simp del]
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	280	layout_of.simps[simp del]
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	281
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	282	text {*
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	283	The lemmas in this section lead to the correctness of
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	284	the compilation of @{text "Inc n"} instruction.
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	285	*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	286
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	287	declare abc_step_l.simps[simp del] abc_steps_l.simps[simp del]
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	288	lemma [simp]: "start_of ly as > 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	289	apply(simp add: start_of.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	290	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	291
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	292	lemma abc_steps_l_0: "abc_steps_l ac ap 0 = ac"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	293	by(case_tac ac, simp add: abc_steps_l.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	294
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	295	lemma abc_step_red:
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	296	"abc_steps_l (as, am) ap stp = (bs, bm) \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	297	abc_steps_l (as, am) ap (Suc stp) = abc_step_l (bs, bm) (abc_fetch bs ap) "
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	298	proof(induct stp arbitrary: as am bs bm)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	299	case 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	300	thus "?case"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	301	by(simp add: abc_steps_l.simps abc_steps_l_0)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	302	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	303	case (Suc stp as am bs bm)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	304	have ind: "\<And>as am bs bm. abc_steps_l (as, am) ap stp = (bs, bm) \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	305	abc_steps_l (as, am) ap (Suc stp) = abc_step_l (bs, bm) (abc_fetch bs ap)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	306	by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	307	have h:" abc_steps_l (as, am) ap (Suc stp) = (bs, bm)" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	308	obtain as' am' where g: "abc_step_l (as, am) (abc_fetch as ap) = (as', am')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	309	by(case_tac "abc_step_l (as, am) (abc_fetch as ap)", auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	310	then have "abc_steps_l (as', am') ap (Suc stp) = abc_step_l (bs, bm) (abc_fetch bs ap)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	311	using h
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	312	by(rule_tac ind, simp add: abc_steps_l.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	313	thus "?case"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	314	using g
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	315	by(simp add: abc_steps_l.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	316	qed
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	317
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	318	lemma tm_shift_fetch:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	319	"\<lbrakk>fetch A s b = (ac, ns); ns \<noteq> 0 \<rbrakk>
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	320	\<Longrightarrow> fetch (shift A off) s b = (ac, ns + off)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	321	apply(case_tac b)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	322	apply(case_tac [!] s, auto simp: fetch.simps shift.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	323	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	324
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	325	lemma tm_shift_eq_step:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	326	assumes exec: "step (s, l, r) (A, 0) = (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	327	and notfinal: "s' \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	328	shows "step (s + off, l, r) (shift A off, off) = (s' + off, l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	329	using assms
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	330	apply(simp add: step.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	331	apply(case_tac "fetch A s (read r)", auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	332	apply(drule_tac [!] off = off in tm_shift_fetch, simp_all)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	333	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	334
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	335	declare step.simps[simp del] steps.simps[simp del] shift.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	336
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	337	lemma tm_shift_eq_steps:
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	338	assumes exec: "steps (s, l, r) (A, 0) stp = (s', l', r')"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	339	and notfinal: "s' \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	340	shows "steps (s + off, l, r) (shift A off, off) stp = (s' + off, l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	341	using exec notfinal
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	342	proof(induct stp arbitrary: s' l' r', simp add: steps.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	343	fix stp s' l' r'
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	344	assume ind: "\<And>s' l' r'. \<lbrakk>steps (s, l, r) (A, 0) stp = (s', l', r'); s' \<noteq> 0\<rbrakk>
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	345	\<Longrightarrow> steps (s + off, l, r) (shift A off, off) stp = (s' + off, l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	346	and h: " steps (s, l, r) (A, 0) (Suc stp) = (s', l', r')" "s' \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	347	obtain s1 l1 r1 where g: "steps (s, l, r) (A, 0) stp = (s1, l1, r1)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	348	apply(case_tac "steps (s, l, r) (A, 0) stp") by blast
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	349	moreover then have "s1 \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	350	using h
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	351	apply(simp add: step_red)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	352	apply(case_tac "0 < s1", auto)
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	353	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	354	ultimately have "steps (s + off, l, r) (shift A off, off) stp =
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	355	(s1 + off, l1, r1)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	356	apply(rule_tac ind, simp_all)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	357	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	358	thus "steps (s + off, l, r) (shift A off, off) (Suc stp) = (s' + off, l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	359	using h g assms
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	360	apply(simp add: step_red)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	361	apply(rule_tac tm_shift_eq_step, auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	362	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	363	qed
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	364
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	365	lemma startof_not0[simp]: "0 < start_of ly as"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	366	apply(simp add: start_of.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	367	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	368
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	369	lemma startof_ge1[simp]: "Suc 0 \<le> start_of ly as"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	370	apply(simp add: start_of.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	371	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	372
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	373	lemma start_of_Suc1: "\<lbrakk>ly = layout_of ap;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	374	abc_fetch as ap = Some (Inc n)\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	375	\<Longrightarrow> start_of ly (Suc as) = start_of ly as + 2 * n + 9"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	376	apply(auto simp: start_of.simps layout_of.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	377	length_of.simps abc_fetch.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	378	take_Suc_conv_app_nth split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	379	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	380
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	381	lemma start_of_Suc2:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	382	"\<lbrakk>ly = layout_of ap;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	383	abc_fetch as ap = Some (Dec n e)\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	384	start_of ly (Suc as) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	385	start_of ly as + 2 * n + 16"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	386	apply(auto simp: start_of.simps layout_of.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	387	length_of.simps abc_fetch.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	388	take_Suc_conv_app_nth split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	389	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	390
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	391	lemma start_of_Suc3:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	392	"\<lbrakk>ly = layout_of ap;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	393	abc_fetch as ap = Some (Goto n)\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	394	start_of ly (Suc as) = start_of ly as + 1"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	395	apply(auto simp: start_of.simps layout_of.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	396	length_of.simps abc_fetch.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	397	take_Suc_conv_app_nth split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	398	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	399
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	400	lemma length_ci_inc:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	401	"length (ci ly ss (Inc n)) = 4*n + 18"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	402	apply(auto simp: ci.simps length_findnth tinc_b_def)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	403	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	404
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	405	lemma length_ci_dec:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	406	"length (ci ly ss (Dec n e)) = 4*n + 32"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	407	apply(auto simp: ci.simps length_findnth tdec_b_def)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	408	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	409
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	410	lemma length_ci_goto:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	411	"length (ci ly ss (Goto n )) = 2"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	412	apply(auto simp: ci.simps length_findnth tdec_b_def)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	413	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	414
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	415	lemma take_Suc_last[elim]: "Suc as \<le> length xs \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	416	take (Suc as) xs = take as xs @ [xs ! as]"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	417	apply(induct xs arbitrary: as, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	418	apply(case_tac as, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	419	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	420
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	421	lemma concat_suc: "Suc as \<le> length xs \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	422	concat (take (Suc as) xs) = concat (take as xs) @ xs! as"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	423	apply(subgoal_tac "take (Suc as) xs = take as xs @ [xs ! as]", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	424	by auto
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	425
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	426	lemma concat_take_suc_iff: "Suc n \<le> length tps \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	427	concat (take n tps) @ (tps ! n) = concat (take (Suc n) tps)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	428	apply(drule_tac concat_suc, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	429	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	430
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	431	lemma concat_drop_suc_iff:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	432	"Suc n < length tps \<Longrightarrow> concat (drop (Suc n) tps) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	433	tps ! Suc n @ concat (drop (Suc (Suc n)) tps)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	434	apply(induct tps arbitrary: n, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	435	apply(case_tac tps, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	436	apply(case_tac n, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	437	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	438
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	439	declare append_assoc[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	440
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	441	lemma tm_append:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	442	"\<lbrakk>n < length tps; tp = tps ! n\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	443	\<exists> tp1 tp2. concat tps = tp1 @ tp @ tp2 \<and> tp1 =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	444	concat (take n tps) \<and> tp2 = concat (drop (Suc n) tps)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	445	apply(rule_tac x = "concat (take n tps)" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	446	apply(rule_tac x = "concat (drop (Suc n) tps)" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	447	apply(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	448	apply(induct n, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	449	apply(case_tac tps, simp, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	450	apply(subgoal_tac "concat (take n tps) @ (tps ! n) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	451	concat (take (Suc n) tps)")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	452	apply(simp only: append_assoc[THEN sym], simp only: append_assoc)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	453	apply(subgoal_tac " concat (drop (Suc n) tps) = tps ! Suc n @
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	454	concat (drop (Suc (Suc n)) tps)")
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	455	apply (metis append_take_drop_id concat_append)
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	456	apply(rule concat_drop_suc_iff,force)
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	457	by (simp add: concat_suc)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	458
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	459	declare append_assoc[simp]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	460
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	461	lemma map_of: "n < length xs \<Longrightarrow> (map f xs) ! n = f (xs ! n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	462	by(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	463
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	464	lemma [simp]: "length (tms_of aprog) = length aprog"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	465	apply(auto simp: tms_of.simps tpairs_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	466	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	467
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	468	lemma ci_nth:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	469	"\<lbrakk>ly = layout_of aprog;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	470	abc_fetch as aprog = Some ins\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	471	\<Longrightarrow> ci ly (start_of ly as) ins = tms_of aprog ! as"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	472	apply(simp add: tms_of.simps tpairs_of.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	473	abc_fetch.simps map_of del: map_append split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	474	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	475
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	476	lemma t_split:"\<lbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	477	ly = layout_of aprog;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	478	abc_fetch as aprog = Some ins\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	479	\<Longrightarrow> \<exists> tp1 tp2. concat (tms_of aprog) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	480	tp1 @ (ci ly (start_of ly as) ins) @ tp2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	481	\<and> tp1 = concat (take as (tms_of aprog)) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	482	tp2 = concat (drop (Suc as) (tms_of aprog))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	483	apply(insert tm_append[of "as" "tms_of aprog"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	484	"ci ly (start_of ly as) ins"], simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	485	apply(subgoal_tac "ci ly (start_of ly as) ins = (tms_of aprog) ! as")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	486	apply(subgoal_tac "length (tms_of aprog) = length aprog")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	487	apply(simp add: abc_fetch.simps split: if_splits, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	488	apply(rule_tac ci_nth, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	489	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	490
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	491	lemma math_sub: "\<lbrakk>x >= Suc 0; x - 1 = z\<rbrakk> \<Longrightarrow> x + y - Suc 0 = z + y"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	492	by auto
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	493
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	494	lemma start_more_one: "as \<noteq> 0 \<Longrightarrow> start_of ly as >= Suc 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	495	apply(induct as, simp add: start_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	496	apply(case_tac as, auto simp: start_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	497	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	498
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	499	lemma div_apart: "\<lbrakk>x mod (2::nat) = 0; y mod 2 = 0\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	500	\<Longrightarrow> (x + y) div 2 = x div 2 + y div 2"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	501	by(auto)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	502
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	503	lemma div_apart_iff: "\<lbrakk>x mod (2::nat) = 0; y mod 2 = 0\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	504	(x + y) mod 2 = 0"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	505	by(auto)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	506
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	507	lemma [simp]: "length (layout_of aprog) = length aprog"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	508	by(auto simp: layout_of.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	509
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	510	lemma start_of_ind: "\<lbrakk>as < length aprog; ly = layout_of aprog\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	511	start_of ly (Suc as) = start_of ly as +
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	512	length ((tms_of aprog) ! as) div 2"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	513	by (auto simp: start_of.simps tms_of.simps layout_of.simps
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	514	tpairs_of.simps ci_length take_Suc take_Suc_conv_app_nth)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	515
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	516	lemma concat_take_suc: "Suc n \<le> length xs \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	517	concat (take (Suc n) xs) = concat (take n xs) @ (xs ! n)"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	518	using concat_suc.
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	519
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	520	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	521	"\<lbrakk>as < length aprog; (abc_fetch as aprog) = Some ins\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	522	\<Longrightarrow> ci (layout_of aprog)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	523	(start_of (layout_of aprog) as) (ins) \<in> set (tms_of aprog)"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	524	by(insert ci_nth[of "layout_of aprog" aprog as], simp)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	525
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	526	lemma [simp]: "length (tms_of ap) = length ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	527	by(auto simp: tms_of.simps tpairs_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	528
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	529	lemma [intro]: "n < length ap \<Longrightarrow> length (tms_of ap ! n) mod 2 = 0"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	530	apply(cases "ap ! n")
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	531	by (auto simp: tms_of.simps tpairs_of.simps ci.simps length_findnth tinc_b_def tdec_b_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	532
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	533	lemma compile_mod2: "length (concat (take n (tms_of ap))) mod 2 = 0"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	534	proof(induct n)
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	535	case 0
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	536	then show ?case by (auto simp add: take_Suc_conv_app_nth)
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	537	next
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	538	case (Suc n)
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	539	hence "n < length (tms_of ap) \<Longrightarrow> is_even (length (concat (take (Suc n) (tms_of ap))))"
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	540	unfolding take_Suc_conv_app_nth by fastforce
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	541	with Suc show ?case by(cases "n < length (tms_of ap)", auto)
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	542	qed
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	543
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	544	lemma tpa_states:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	545	"\<lbrakk>tp = concat (take as (tms_of ap));
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	546	as \<le> length ap\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	547	start_of (layout_of ap) as = Suc (length tp div 2)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	548	proof(induct as arbitrary: tp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	549	case 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	550	thus "?case"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	551	by(simp add: start_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	552	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	553	case (Suc as tp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	554	have ind: "\<And>tp. \<lbrakk>tp = concat (take as (tms_of ap)); as \<le> length ap\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	555	start_of (layout_of ap) as = Suc (length tp div 2)" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	556	have tp: "tp = concat (take (Suc as) (tms_of ap))" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	557	have le: "Suc as \<le> length ap" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	558	have a: "start_of (layout_of ap) as = Suc (length (concat (take as (tms_of ap))) div 2)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	559	using le
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	560	by(rule_tac ind, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	561	from a tp le show "?case"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	562	apply(simp add: start_of.simps take_Suc_conv_app_nth)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	563	apply(subgoal_tac "length (concat (take as (tms_of ap))) mod 2= 0")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	564	apply(subgoal_tac " length (tms_of ap ! as) mod 2 = 0")
163 67063c5365e1 changed theory names to uppercase Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 115 diff changeset	565	apply(simp add: Abacus.div_apart)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	566	apply(simp add: layout_of.simps ci_length tms_of.simps tpairs_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	567	apply(auto intro: compile_mod2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	568	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	569	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	570
173 b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	571	declare fetch.simps[simp]
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	572	lemma append_append_fetch:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	573	"\<lbrakk>length tp1 mod 2 = 0; length tp mod 2 = 0;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	574	length tp1 div 2 < a \<and> a \<le> length tp1 div 2 + length tp div 2\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	575	\<Longrightarrow>fetch (tp1 @ tp @ tp2) a b = fetch tp (a - length tp1 div 2) b "
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	576	apply(subgoal_tac "\<exists> x. a = length tp1 div 2 + x", erule exE, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	577	apply(case_tac x, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	578	apply(subgoal_tac "length tp1 div 2 + Suc nat =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	579	Suc (length tp1 div 2 + nat)")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	580	apply(simp only: fetch.simps nth_of.simps, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	581	apply(case_tac b, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	582	apply(subgoal_tac "2 * (length tp1 div 2) = length tp1", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	583	apply(subgoal_tac "2 * nat < length tp", simp add: nth_append, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	584	apply(subgoal_tac "2 * (length tp1 div 2) = length tp1", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	585	apply(subgoal_tac "2 * nat < length tp", simp add: nth_append, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	586	apply(auto simp: nth_append)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	587	apply(rule_tac x = "a - length tp1 div 2" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	588	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	589
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	590	lemma step_eq_fetch':
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	591	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	592	and compile: "tp = tm_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	593	and fetch: "abc_fetch as ap = Some ins"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	594	and range1: "s \<ge> start_of ly as"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	595	and range2: "s < start_of ly (Suc as)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	596	shows "fetch tp s b = fetch (ci ly (start_of ly as) ins)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	597	(Suc s - start_of ly as) b "
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	598	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	599	have "\<exists>tp1 tp2. concat (tms_of ap) = tp1 @ ci ly (start_of ly as) ins @ tp2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	600	tp1 = concat (take as (tms_of ap)) \<and> tp2 = concat (drop (Suc as) (tms_of ap))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	601	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	602	by(rule_tac t_split, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	603	then obtain tp1 tp2 where a: "concat (tms_of ap) = tp1 @ ci ly (start_of ly as) ins @ tp2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	604	tp1 = concat (take as (tms_of ap)) \<and> tp2 = concat (drop (Suc as) (tms_of ap))" by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	605	then have b: "start_of (layout_of ap) as = Suc (length tp1 div 2)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	606	using fetch
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	607	by(rule_tac tpa_states, simp, simp add: abc_fetch.simps split: if_splits)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	608	have "fetch (tp1 @ (ci ly (start_of ly as) ins) @ tp2) s b =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	609	fetch (ci ly (start_of ly as) ins) (s - length tp1 div 2) b"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	610	proof(rule_tac append_append_fetch)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	611	show "length tp1 mod 2 = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	612	using a
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	613	by(auto, rule_tac compile_mod2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	614	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	615	show "length (ci ly (start_of ly as) ins) mod 2 = 0"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	616	by(case_tac ins, auto simp: ci.simps length_findnth tinc_b_def tdec_b_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	617	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	618	show "length tp1 div 2 < s \<and> s \<le>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	619	length tp1 div 2 + length (ci ly (start_of ly as) ins) div 2"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	620	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	621	have "length (ci ly (start_of ly as) ins) div 2 = length_of ins"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	622	using ci_length by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	623	moreover have "start_of ly (Suc as) = start_of ly as + length_of ins"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	624	using fetch layout
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	625	apply(simp add: start_of.simps abc_fetch.simps List.take_Suc_conv_app_nth
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	626	split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	627	apply(simp add: layout_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	628	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	629	ultimately show "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	630	using b layout range1 range2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	631	apply(simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	632	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	633	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	634	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	635	thus "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	636	using b layout a compile
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	637	apply(simp add: tm_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	638	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	639	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	640
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	641	lemma step_eq_fetch:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	642	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	643	and compile: "tp = tm_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	644	and abc_fetch: "abc_fetch as ap = Some ins"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	645	and fetch: "fetch (ci ly (start_of ly as) ins)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	646	(Suc s - start_of ly as) b = (ac, ns)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	647	and notfinal: "ns \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	648	shows "fetch tp s b = (ac, ns)"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	649	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	650	have "s \<ge> start_of ly as"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	651	proof(cases "s \<ge> start_of ly as")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	652	case True thus "?thesis" by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	653	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	654	case False
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	655	have "\<not> start_of ly as \<le> s" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	656	then have "Suc s - start_of ly as = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	657	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	658	then have "fetch (ci ly (start_of ly as) ins)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	659	(Suc s - start_of ly as) b = (Nop, 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	660	by(simp add: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	661	with notfinal fetch show "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	662	by(simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	663	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	664	moreover have "s < start_of ly (Suc as)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	665	proof(cases "s < start_of ly (Suc as)")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	666	case True thus "?thesis" by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	667	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	668	case False
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	669	have h: "\<not> s < start_of ly (Suc as)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	670	by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	671	then have "s > start_of ly as"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	672	using abc_fetch layout
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	673	apply(simp add: start_of.simps abc_fetch.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	674	apply(simp add: List.take_Suc_conv_app_nth, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	675	apply(subgoal_tac "layout_of ap ! as > 0")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	676	apply arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	677	apply(simp add: layout_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	678	apply(case_tac "ap!as", auto simp: length_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	679	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	680	from this and h have "fetch (ci ly (start_of ly as) ins) (Suc s - start_of ly as) b = (Nop, 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	681	using abc_fetch layout
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	682	apply(case_tac b, simp_all add: Suc_diff_le)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	683	apply(case_tac [!] ins, simp_all add: start_of_Suc2 start_of_Suc1 start_of_Suc3)
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	684	by (simp_all only: length_ci_inc length_ci_dec length_ci_goto, auto)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	685	from fetch and notfinal this show "?thesis"by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	686	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	687	ultimately show "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	688	using assms
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	689	by(drule_tac b= b and ins = ins in step_eq_fetch', auto)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	690	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	691
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	692
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	693	lemma step_eq_in:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	694	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	695	and compile: "tp = tm_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	696	and fetch: "abc_fetch as ap = Some ins"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	697	and exec: "step (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	698	= (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	699	and notfinal: "s' \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	700	shows "step (s, l, r) (tp, 0) = (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	701	using assms
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	702	apply(simp add: step.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	703	apply(case_tac "fetch (ci (layout_of ap) (start_of (layout_of ap) as) ins)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	704	(Suc s - start_of (layout_of ap) as) (read r)", simp)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	705	using layout
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	706	apply(drule_tac s = s and b = "read r" and ac = a in step_eq_fetch, auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	707	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	708
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	709	lemma steps_eq_in:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	710	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	711	and compile: "tp = tm_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	712	and crsp: "crsp ly (as, lm) (s, l, r) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	713	and fetch: "abc_fetch as ap = Some ins"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	714	and exec: "steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) stp
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	715	= (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	716	and notfinal: "s' \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	717	shows "steps (s, l, r) (tp, 0) stp = (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	718	using exec notfinal
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	719	proof(induct stp arbitrary: s' l' r', simp add: steps.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	720	fix stp s' l' r'
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	721	assume ind:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	722	"\<And>s' l' r'. \<lbrakk>steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) stp = (s', l', r'); s' \<noteq> 0\<rbrakk>
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	723	\<Longrightarrow> steps (s, l, r) (tp, 0) stp = (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	724	and h: "steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) (Suc stp) = (s', l', r')" "s' \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	725	obtain s1 l1 r1 where g: "steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) stp =
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	726	(s1, l1, r1)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	727	apply(case_tac "steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) stp") by blast
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	728	moreover hence "s1 \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	729	using h
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	730	apply(simp add: step_red)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	731	apply(case_tac "0 < s1", simp_all)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	732	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	733	ultimately have "steps (s, l, r) (tp, 0) stp = (s1, l1, r1)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	734	apply(rule_tac ind, auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	735	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	736	thus "steps (s, l, r) (tp, 0) (Suc stp) = (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	737	using h g assms
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	738	apply(simp add: step_red)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	739	apply(rule_tac step_eq_in, auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	740	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	741	qed
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	742
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	743	lemma tm_append_fetch_first:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	744	"\<lbrakk>fetch A s b = (ac, ns); ns \<noteq> 0\<rbrakk> \<Longrightarrow>
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	745	fetch (A @ B) s b = (ac, ns)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	746	apply(case_tac b)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	747	apply(case_tac [!] s, auto simp: fetch.simps nth_append split: if_splits)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	748	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	749
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	750	lemma tm_append_first_step_eq:
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	751	assumes "step (s, l, r) (A, off) = (s', l', r')"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	752	and "s' \<noteq> 0"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	753	shows "step (s, l, r) (A @ B, off) = (s', l', r')"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	754	using assms
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	755	apply(simp add: step.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	756	apply(case_tac "fetch A (s - off) (read r)")
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	757	apply(frule_tac B = B and b = "read r" in tm_append_fetch_first, auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	758	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	759
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	760	lemma tm_append_first_steps_eq:
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	761	assumes "steps (s, l, r) (A, off) stp = (s', l', r')"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	762	and "s' \<noteq> 0"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	763	shows "steps (s, l, r) (A @ B, off) stp = (s', l', r')"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	764	using assms
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	765	proof(induct stp arbitrary: s' l' r', simp add: steps.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	766	fix stp s' l' r'
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	767	assume ind: "\<And>s' l' r'. \<lbrakk>steps (s, l, r) (A, off) stp = (s', l', r'); s' \<noteq> 0\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	768	\<Longrightarrow> steps (s, l, r) (A @ B, off) stp = (s', l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	769	and h: "steps (s, l, r) (A, off) (Suc stp) = (s', l', r')" "s' \<noteq> 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	770	obtain sa la ra where a: "steps (s, l, r) (A, off) stp = (sa, la, ra)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	771	apply(case_tac "steps (s, l, r) (A, off) stp") by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	772	hence "steps (s, l, r) (A @ B, off) stp = (sa, la, ra) \<and> sa \<noteq> 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	773	using h ind[of sa la ra]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	774	apply(case_tac sa, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	775	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	776	thus "steps (s, l, r) (A @ B, off) (Suc stp) = (s', l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	777	using h a
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	778	apply(simp add: step_red)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	779	apply(rule_tac tm_append_first_step_eq, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	780	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	781	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	782
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	783	lemma tm_append_second_fetch_eq:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	784	assumes
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	785	even: "length A mod 2 = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	786	and off: "off = length A div 2"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	787	and fetch: "fetch B s b = (ac, ns)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	788	and notfinal: "ns \<noteq> 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	789	shows "fetch (A @ shift B off) (s + off) b = (ac, ns + off)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	790	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	791	apply(case_tac b)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	792	apply(case_tac [!] s, auto simp: fetch.simps nth_append shift.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	793	split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	794	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	795
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	796
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	797	lemma tm_append_second_step_eq:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	798	assumes
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	799	exec: "step0 (s, l, r) B = (s', l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	800	and notfinal: "s' \<noteq> 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	801	and off: "off = length A div 2"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	802	and even: "length A mod 2 = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	803	shows "step0 (s + off, l, r) (A @ shift B off) = (s' + off, l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	804	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	805	apply(simp add: step.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	806	apply(case_tac "fetch B s (read r)")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	807	apply(frule_tac tm_append_second_fetch_eq, simp_all, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	808	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	809
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	810
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	811	lemma tm_append_second_steps_eq:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	812	assumes
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	813	exec: "steps (s, l, r) (B, 0) stp = (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	814	and notfinal: "s' \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	815	and off: "off = length A div 2"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	816	and even: "length A mod 2 = 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	817	shows "steps (s + off, l, r) (A @ shift B off, 0) stp = (s' + off, l', r')"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	818	using exec notfinal
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	819	proof(induct stp arbitrary: s' l' r')
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	820	case 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	821	thus "steps0 (s + off, l, r) (A @ shift B off) 0 = (s' + off, l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	822	by(simp add: steps.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	823	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	824	case (Suc stp s' l' r')
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	825	have ind: "\<And>s' l' r'. \<lbrakk>steps0 (s, l, r) B stp = (s', l', r'); s' \<noteq> 0\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	826	steps0 (s + off, l, r) (A @ shift B off) stp = (s' + off, l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	827	by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	828	have h: "steps0 (s, l, r) B (Suc stp) = (s', l', r')" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	829	have k: "s' \<noteq> 0" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	830	obtain s'' l'' r'' where a: "steps0 (s, l, r) B stp = (s'', l'', r'')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	831	by (metis prod_cases3)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	832	then have b: "s'' \<noteq> 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	833	using h k
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	834	by(rule_tac notI, auto simp: step_red)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	835	from a b have c: "steps0 (s + off, l, r) (A @ shift B off) stp = (s'' + off, l'', r'')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	836	by(erule_tac ind, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	837	from c b h a k assms show "?case"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	838	apply(simp add: step_red) by(rule tm_append_second_step_eq, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	839	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	840
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	841	lemma tm_append_second_fetch0_eq:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	842	assumes
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	843	even: "length A mod 2 = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	844	and off: "off = length A div 2"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	845	and fetch: "fetch B s b = (ac, 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	846	and notfinal: "s \<noteq> 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	847	shows "fetch (A @ shift B off) (s + off) b = (ac, 0)"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	848	using assms
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	849	apply(case_tac b)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	850	apply(case_tac [!] s, auto simp: fetch.simps nth_append shift.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	851	split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	852	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	853
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	854	lemma tm_append_second_halt_eq:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	855	assumes
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	856	exec: "steps (Suc 0, l, r) (B, 0) stp = (0, l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	857	and wf_B: "tm_wf (B, 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	858	and off: "off = length A div 2"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	859	and even: "length A mod 2 = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	860	shows "steps (Suc off, l, r) (A @ shift B off, 0) stp = (0, l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	861	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	862	have "\<exists>n. \<not> is_final (steps0 (1, l, r) B n) \<and> steps0 (1, l, r) B (Suc n) = (0, l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	863	using exec by(rule_tac before_final, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	864	then obtain n where a:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	865	"\<not> is_final (steps0 (1, l, r) B n) \<and> steps0 (1, l, r) B (Suc n) = (0, l', r')" ..
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	866	obtain s'' l'' r'' where b: "steps0 (1, l, r) B n = (s'', l'', r'') \<and> s'' >0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	867	using a
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	868	by(case_tac "steps0 (1, l, r) B n", auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	869	have c: "steps (Suc 0 + off, l, r) (A @ shift B off, 0) n = (s'' + off, l'', r'')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	870	using a b assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	871	by(rule_tac tm_append_second_steps_eq, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	872	obtain ac where d: "fetch B s'' (read r'') = (ac, 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	873	using b a
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	874	by(case_tac "fetch B s'' (read r'')", auto simp: step_red step.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	875	then have "fetch (A @ shift B off) (s'' + off) (read r'') = (ac, 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	876	using assms b
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	877	by(rule_tac tm_append_second_fetch0_eq, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	878	then have e: "steps (Suc 0 + off, l, r) (A @ shift B off, 0) (Suc n) = (0, l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	879	using a b assms c d
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	880	by(simp add: step_red step.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	881	from a have "n < stp"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	882	using exec
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	883	proof(cases "n < stp")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	884	case True thus "?thesis" by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	885	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	886	case False
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	887	have "\<not> n < stp" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	888	then obtain d where "n = stp + d"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	889	by (metis add.comm_neutral less_imp_add_positive nat_neq_iff)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	890	thus "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	891	using a e exec
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	892	by(simp add: steps_add)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	893	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	894	then obtain d where "stp = Suc n + d"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	895	by(metis add_Suc less_iff_Suc_add)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	896	thus "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	897	using e
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	898	by(simp only: steps_add, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	899	qed
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	900
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	901	lemma tm_append_steps:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	902	assumes
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	903	aexec: "steps (s, l, r) (A, 0) stpa = (Suc (length A div 2), la, ra)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	904	and bexec: "steps (Suc 0, la, ra) (B, 0) stpb = (sb, lb, rb)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	905	and notfinal: "sb \<noteq> 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	906	and off: "off = length A div 2"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	907	and even: "length A mod 2 = 0"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	908	shows "steps (s, l, r) (A @ shift B off, 0) (stpa + stpb) = (sb + off, lb, rb)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	909	proof -
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	910	have "steps (s, l, r) (A@shift B off, 0) stpa = (Suc (length A div 2), la, ra)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	911	apply(rule_tac tm_append_first_steps_eq)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	912	apply(auto simp: assms)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	913	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	914	moreover have "steps (1 + off, la, ra) (A @ shift B off, 0) stpb = (sb + off, lb, rb)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	915	apply(rule_tac tm_append_second_steps_eq)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	916	apply(auto simp: assms bexec)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	917	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	918	ultimately show "steps (s, l, r) (A @ shift B off, 0) (stpa + stpb) = (sb + off, lb, rb)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	919	apply(simp add: steps_add off)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	920	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	921	qed
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	922
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	923	subsection {* Crsp of Inc*}
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	924
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	925	fun at_begin_fst_bwtn :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	926	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	927	"at_begin_fst_bwtn (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	928	(\<exists> lm1 tn rn. lm1 = (lm @ 0\<up>tn) \<and> length lm1 = s \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	929	(if lm1 = [] then l = Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	930	else l = [Bk]@<rev lm1>@Bk#Bk#ires) \<and> r = Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	931
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	932
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	933	fun at_begin_fst_awtn :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	934	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	935	"at_begin_fst_awtn (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	936	(\<exists> lm1 tn rn. lm1 = (lm @ 0\<up>tn) \<and> length lm1 = s \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	937	(if lm1 = [] then l = Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	938	else l = [Bk]@<rev lm1>@Bk#Bk#ires) \<and> r = [Oc]@Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	939
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	940	fun at_begin_norm :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	941	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	942	"at_begin_norm (as, lm) (s, l, r) ires=
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	943	(\<exists> lm1 lm2 rn. lm = lm1 @ lm2 \<and> length lm1 = s \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	944	(if lm1 = [] then l = Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	945	else l = Bk # <rev lm1> @ Bk # Bk # ires ) \<and> r = <lm2>@Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	946
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	947	fun in_middle :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	948	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	949	"in_middle (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	950	(\<exists> lm1 lm2 tn m ml mr rn. lm @ 0\<up>tn = lm1 @ [m] @ lm2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	951	\<and> length lm1 = s \<and> m + 1 = ml + mr \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	952	ml \<noteq> 0 \<and> tn = s + 1 - length lm \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	953	(if lm1 = [] then l = Oc\<up>ml @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	954	else l = Oc\<up>ml@[Bk]@<rev lm1>@
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	955	Bk # Bk # ires) \<and> (r = Oc\<up>mr @ [Bk] @ <lm2>@ Bk\<up>rn \<or>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	956	(lm2 = [] \<and> r = Oc\<up>mr))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	957	)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	958
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	959	fun inv_locate_a :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	960	where "inv_locate_a (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	961	(at_begin_norm (as, lm) (s, l, r) ires \<or>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	962	at_begin_fst_bwtn (as, lm) (s, l, r) ires \<or>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	963	at_begin_fst_awtn (as, lm) (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	964	)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	965
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	966	fun inv_locate_b :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	967	where "inv_locate_b (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	968	(in_middle (as, lm) (s, l, r)) ires "
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	969
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	970	fun inv_after_write :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	971	where "inv_after_write (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	972	(\<exists> rn m lm1 lm2. lm = lm1 @ m # lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	973	(if lm1 = [] then l = Oc\<up>m @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	974	else Oc # l = Oc\<up>Suc m@ Bk # <rev lm1> @
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	975	Bk # Bk # ires) \<and> r = [Oc] @ <lm2> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	976
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	977	fun inv_after_move :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	978	where "inv_after_move (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	979	(\<exists> rn m lm1 lm2. lm = lm1 @ m # lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	980	(if lm1 = [] then l = Oc\<up>Suc m @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	981	else l = Oc\<up>Suc m@ Bk # <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	982	r = <lm2> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	983
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	984	fun inv_after_clear :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	985	where "inv_after_clear (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	986	(\<exists> rn m lm1 lm2 r'. lm = lm1 @ m # lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	987	(if lm1 = [] then l = Oc\<up>Suc m @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	988	else l = Oc\<up>Suc m @ Bk # <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	989	r = Bk # r' \<and> Oc # r' = <lm2> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	990
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	991	fun inv_on_right_moving :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	992	where "inv_on_right_moving (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	993	(\<exists> lm1 lm2 m ml mr rn. lm = lm1 @ [m] @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	994	ml + mr = m \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	995	(if lm1 = [] then l = Oc\<up>ml @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	996	else l = Oc\<up>ml @ [Bk] @ <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	997	((r = Oc\<up>mr @ [Bk] @ <lm2> @ Bk\<up>rn) \<or>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	998	(r = Oc\<up>mr \<and> lm2 = [])))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	999
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1000	fun inv_on_left_moving_norm :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1001	where "inv_on_left_moving_norm (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1002	(\<exists> lm1 lm2 m ml mr rn. lm = lm1 @ [m] @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1003	ml + mr = Suc m \<and> mr > 0 \<and> (if lm1 = [] then l = Oc\<up>ml @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1004	else l = Oc\<up>ml @ Bk # <rev lm1> @ Bk # Bk # ires)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1005	\<and> (r = Oc\<up>mr @ Bk # <lm2> @ Bk\<up>rn \<or>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1006	(lm2 = [] \<and> r = Oc\<up>mr)))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1007
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1008	fun inv_on_left_moving_in_middle_B:: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1009	where "inv_on_left_moving_in_middle_B (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1010	(\<exists> lm1 lm2 rn. lm = lm1 @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1011	(if lm1 = [] then l = Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1012	else l = <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1013	r = Bk # <lm2> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1014
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1015	fun inv_on_left_moving :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1016	where "inv_on_left_moving (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1017	(inv_on_left_moving_norm (as, lm) (s, l, r) ires \<or>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1018	inv_on_left_moving_in_middle_B (as, lm) (s, l, r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1019
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1020
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1021	fun inv_check_left_moving_on_leftmost :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1022	where "inv_check_left_moving_on_leftmost (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1023	(\<exists> rn. l = ires \<and> r = [Bk, Bk] @ <lm> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1024
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1025	fun inv_check_left_moving_in_middle :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1026	where "inv_check_left_moving_in_middle (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1027	(\<exists> lm1 lm2 r' rn. lm = lm1 @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1028	(Oc # l = <rev lm1> @ Bk # Bk # ires) \<and> r = Oc # Bk # r' \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1029	r' = <lm2> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1030
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1031	fun inv_check_left_moving :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1032	where "inv_check_left_moving (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1033	(inv_check_left_moving_on_leftmost (as, lm) (s, l, r) ires \<or>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1034	inv_check_left_moving_in_middle (as, lm) (s, l, r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1035
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1036	fun inv_after_left_moving :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1037	where "inv_after_left_moving (as, lm) (s, l, r) ires=
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1038	(\<exists> rn. l = Bk # ires \<and> r = Bk # <lm> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1039
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1040	fun inv_stop :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1041	where "inv_stop (as, lm) (s, l, r) ires=
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1042	(\<exists> rn. l = Bk # Bk # ires \<and> r = <lm> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1043
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1044	lemma halt_lemma2':
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1045	"\<lbrakk>wf LE; \<forall> n. ((\<not> P (f n) \<and> Q (f n)) \<longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1046	(Q (f (Suc n)) \<and> (f (Suc n), (f n)) \<in> LE)); Q (f 0)\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1047	\<Longrightarrow> \<exists> n. P (f n)"
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	1048
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1049	apply(intro exCI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1050	apply(subgoal_tac "\<forall> n. Q (f n)", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1051	apply(drule_tac f = f in wf_inv_image)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1052	apply(simp add: inv_image_def)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1053	apply(erule wf_induct, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1054	apply(erule_tac x = x in allE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1055	apply(erule_tac x = n in allE, erule_tac x = n in allE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1056	apply(erule_tac x = "Suc x" in allE, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1057	apply(rule_tac allI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1058	apply(induct_tac n, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1059	apply(erule_tac x = na in allE, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1060	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1061
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1062	lemma halt_lemma2'':
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1063	"\<lbrakk>P (f n); \<not> P (f (0::nat))\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1064	\<exists> n. (P (f n) \<and> (\<forall> i < n. \<not> P (f i)))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1065	apply(induct n rule: nat_less_induct, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1066	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1067
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1068	lemma halt_lemma2''':
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1069	"\<lbrakk>\<forall>n. \<not> P (f n) \<and> Q (f n) \<longrightarrow> Q (f (Suc n)) \<and> (f (Suc n), f n) \<in> LE;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1070	Q (f 0); \<forall>i<na. \<not> P (f i)\<rbrakk> \<Longrightarrow> Q (f na)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1071	apply(induct na, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1072	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1073
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1074	lemma halt_lemma2:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1075	"\<lbrakk>wf LE;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1076	Q (f 0); \<not> P (f 0);
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1077	\<forall> n. ((\<not> P (f n) \<and> Q (f n)) \<longrightarrow> (Q (f (Suc n)) \<and> (f (Suc n), (f n)) \<in> LE))\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1078	\<Longrightarrow> \<exists> n. P (f n) \<and> Q (f n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1079	apply(insert halt_lemma2' [of LE P f Q], simp, erule_tac exE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1080	apply(subgoal_tac "\<exists> n. (P (f n) \<and> (\<forall> i < n. \<not> P (f i)))")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1081	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1082	apply(rule_tac x = na in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1083	apply(rule halt_lemma2''', simp, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1084	apply(erule_tac halt_lemma2'', simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1085	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1086
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1087
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1088	fun findnth_inv :: "layout \<Rightarrow> nat \<Rightarrow> inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1089	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1090	"findnth_inv ly n (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1091	(if s = 0 then False
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1092	else if s \<le> Suc (2*n) then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1093	if s mod 2 = 1 then inv_locate_a (as, lm) ((s - 1) div 2, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1094	else inv_locate_b (as, lm) ((s - 1) div 2, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1095	else False)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1096
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1097
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1098	fun findnth_state :: "config \<Rightarrow> nat \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1099	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1100	"findnth_state (s, l, r) n = (Suc (2*n) - s)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1101
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1102	fun findnth_step :: "config \<Rightarrow> nat \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1103	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1104	"findnth_step (s, l, r) n =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1105	(if s mod 2 = 1 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1106	(if (r \<noteq> [] \<and> hd r = Oc) then 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1107	else 1)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1108	else length r)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1109
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1110	fun findnth_measure :: "config \<times> nat \<Rightarrow> nat \<times> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1111	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1112	"findnth_measure (c, n) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1113	(findnth_state c n, findnth_step c n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1114
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1115	definition lex_pair :: "((nat \<times> nat) \<times> nat \<times> nat) set"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1116	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1117	"lex_pair \<equiv> less_than <lex> less_than"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1118
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1119	definition findnth_LE :: "((config \<times> nat) \<times> (config \<times> nat)) set"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1120	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1121	"findnth_LE \<equiv> (inv_image lex_pair findnth_measure)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1122
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1123	lemma wf_findnth_LE: "wf findnth_LE"
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	1124	by(auto simp: findnth_LE_def lex_pair_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1125
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1126	declare findnth_inv.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1127
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1128	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1129	"\<lbrakk>x < Suc (Suc (2 * n)); Suc x mod 2 = Suc 0; \<not> x < 2 * n\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1130	\<Longrightarrow> x = 2*n"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1131	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1132
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1133	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1134	"\<lbrakk>0 < a; a < Suc (2 * n); a mod 2 = Suc 0\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1135	\<Longrightarrow> fetch (findnth n) a Bk = (W1, a)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1136	apply(case_tac a, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1137	apply(induct n, auto simp: findnth.simps length_findnth nth_append)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1138	apply arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1139	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1140
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1141	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1142	"\<lbrakk>0 < a; a < Suc (2 * n); a mod 2 = Suc 0\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1143	\<Longrightarrow> fetch (findnth n) a Oc = (R, Suc a)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1144	apply(case_tac a, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1145	apply(induct n, auto simp: findnth.simps length_findnth nth_append)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1146	apply(subgoal_tac "nat = 2 * n", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1147	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1148
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1149	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1150	"\<lbrakk>0 < a; a < Suc (2*n); a mod 2 \<noteq> Suc 0\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1151	\<Longrightarrow> fetch (findnth n) a Oc = (R, a)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1152	apply(case_tac a, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1153	apply(induct n, auto simp: findnth.simps length_findnth nth_append)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1154	apply(subgoal_tac "nat = Suc (2 * n)", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1155	apply arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1156	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1157
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1158	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1159	"\<lbrakk>0 < a; a < Suc (2*n); a mod 2 \<noteq> Suc 0\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1160	\<Longrightarrow> fetch (findnth n) a Bk = (R, Suc a)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1161	apply(case_tac a, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1162	apply(induct n, auto simp: findnth.simps length_findnth nth_append)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1163	apply(subgoal_tac "nat = Suc (2 * n)", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1164	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1165
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1166	declare at_begin_norm.simps[simp del] at_begin_fst_bwtn.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1167	at_begin_fst_awtn.simps[simp del] in_middle.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1168	abc_lm_s.simps[simp del] abc_lm_v.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1169	ci.simps[simp del] inv_after_move.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1170	inv_on_left_moving_norm.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1171	inv_on_left_moving_in_middle_B.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1172	inv_after_clear.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1173	inv_after_write.simps[simp del] inv_on_left_moving.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1174	inv_on_right_moving.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1175	inv_check_left_moving.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1176	inv_check_left_moving_in_middle.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1177	inv_check_left_moving_on_leftmost.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1178	inv_after_left_moving.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1179	inv_stop.simps[simp del] inv_locate_a.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1180	inv_locate_b.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1181
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1182	lemma [intro]: "\<exists>rn. [Bk] = Bk \<up> rn"
111 dfc629cd11de made uncomputable compatible with abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 101 diff changeset	1183	by (metis replicate_0 replicate_Suc)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1184
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1185	lemma [intro]: "at_begin_norm (as, am) (q, aaa, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1186	\<Longrightarrow> at_begin_norm (as, am) (q, aaa, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1187	apply(simp add: at_begin_norm.simps, erule_tac exE, erule_tac exE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1188	apply(rule_tac x = lm1 in exI, simp, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1189	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1190
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1191	lemma [intro]: "at_begin_fst_bwtn (as, am) (q, aaa, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1192	\<Longrightarrow> at_begin_fst_bwtn (as, am) (q, aaa, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1193	apply(simp only: at_begin_fst_bwtn.simps, erule_tac exE, erule_tac exE, erule_tac exE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1194	apply(rule_tac x = "am @ 0\<up>tn" in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1195	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1196
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1197	lemma [intro]: "at_begin_fst_awtn (as, am) (q, aaa, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1198	\<Longrightarrow> at_begin_fst_awtn (as, am) (q, aaa, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1199	apply(auto simp: at_begin_fst_awtn.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1200	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1201
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1202	lemma [intro]: "inv_locate_a (as, am) (q, aaa, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1203	\<Longrightarrow> inv_locate_a (as, am) (q, aaa, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1204	apply(simp only: inv_locate_a.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1205	apply(erule disj_forward)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1206	defer
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1207	apply(erule disj_forward, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1208	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1209
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1210	lemma locate_a_2_locate_a[simp]: "inv_locate_a (as, am) (q, aaa, Bk # xs) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1211	\<Longrightarrow> inv_locate_a (as, am) (q, aaa, Oc # xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1212	apply(simp only: inv_locate_a.simps at_begin_norm.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1213	at_begin_fst_bwtn.simps at_begin_fst_awtn.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1214	apply(erule_tac disjE, erule exE, erule exE, erule exE,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1215	rule disjI2, rule disjI2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1216	defer
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1217	apply(erule_tac disjE, erule exE, erule exE,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1218	erule exE, rule disjI2, rule disjI2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1219	prefer 2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1220	apply(simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1221	proof-
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1222	fix lm1 tn rn
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1223	assume k: "lm1 = am @ 0\<up>tn \<and> length lm1 = q \<and> (if lm1 = [] then aaa = Bk # Bk #
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1224	ires else aaa = [Bk] @ <rev lm1> @ Bk # Bk # ires) \<and> Bk # xs = Bk\<up>rn"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1225	thus "\<exists>lm1 tn rn. lm1 = am @ 0 \<up> tn \<and> length lm1 = q \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1226	(if lm1 = [] then aaa = Bk # Bk # ires else aaa = [Bk] @ <rev lm1> @ Bk # Bk # ires) \<and> Oc # xs = [Oc] @ Bk \<up> rn"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1227	(is "\<exists>lm1 tn rn. ?P lm1 tn rn")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1228	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1229	from k have "?P lm1 tn (rn - 1)"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1230	by (auto simp: Cons_replicate_eq)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1231	thus ?thesis by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1232	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1233	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1234	fix lm1 lm2 rn
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1235	assume h1: "am = lm1 @ lm2 \<and> length lm1 = q \<and> (if lm1 = []
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1236	then aaa = Bk # Bk # ires else aaa = Bk # <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1237	Bk # xs = <lm2> @ Bk\<up>rn"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1238	from h1 have h2: "lm2 = []"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1239	apply(auto split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1240	apply(case_tac [!] lm2, simp_all add: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1241	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1242	from h1 and h2 show "\<exists>lm1 tn rn. lm1 = am @ 0\<up>tn \<and> length lm1 = q \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1243	(if lm1 = [] then aaa = Bk # Bk # ires else aaa = [Bk] @ <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1244	Oc # xs = [Oc] @ Bk\<up>rn"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1245	(is "\<exists>lm1 tn rn. ?P lm1 tn rn")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1246	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1247	from h1 and h2 have "?P lm1 0 (rn - 1)"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1248	apply(auto simp:tape_of_nat_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1249	by(case_tac "rn::nat", simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1250	thus ?thesis by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1251	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1252	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1253
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1254	lemma inv_locate_a[simp]: "inv_locate_a (as, am) (q, aaa, []) ires \<Longrightarrow>
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1255	inv_locate_a (as, am) (q, aaa, [Oc]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1256	apply(insert locate_a_2_locate_a [of as am q aaa "[]"])
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1257	apply(subgoal_tac "inv_locate_a (as, am) (q, aaa, [Bk]) ires", auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1258	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1259
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1260	(inv: from locate_b to locate_b)
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1261	lemma inv_locate_b[simp]: "inv_locate_b (as, am) (q, aaa, Oc # xs) ires
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1262	\<Longrightarrow> inv_locate_b (as, am) (q, Oc # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1263	apply(simp only: inv_locate_b.simps in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1264	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1265	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1266	rule_tac x = tn in exI, rule_tac x = m in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1267	apply(rule_tac x = "Suc ml" in exI, rule_tac x = "mr - 1" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1268	rule_tac x = rn in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1269	apply(case_tac mr, simp_all, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1270	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1271
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1272	lemma tape_nat[simp]: "<[x::nat]> = Oc\<up>(Suc x)"
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1273	apply(simp add: tape_of_nat_def tape_of_list_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1274	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1275
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1276	lemma tape_empty_list[simp]: " <([]::nat list)> = []"
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1277	apply(simp add: tape_of_list_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1278	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1279
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1280	lemma inv_locate[simp]: "\<lbrakk>inv_locate_b (as, am) (q, aaa, Bk # xs) ires; \<exists>n. xs = Bk\<up>n\<rbrakk>
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1281	\<Longrightarrow> inv_locate_a (as, am) (Suc q, Bk # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1282	apply(simp add: inv_locate_b.simps inv_locate_a.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1283	apply(rule_tac disjI2, rule_tac disjI1)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1284	apply(simp only: in_middle.simps at_begin_fst_bwtn.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1285	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1286	apply(rule_tac x = "lm1 @ [m]" in exI, rule_tac x = tn in exI, simp split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1287	apply(case_tac mr, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1288	apply(case_tac "length am", simp_all, case_tac tn, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1289	apply(case_tac lm2, simp_all add: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1290	apply(case_tac am, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1291	apply(case_tac n, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1292	apply(case_tac n, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1293	apply(case_tac mr, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1294	apply(case_tac lm2, simp_all add: tape_of_nl_cons split: if_splits, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1295	apply(case_tac [!] n, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1296	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1297
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1298	lemma [simp]: "(Oc # r = Bk \<up> rn) = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1299	apply(case_tac rn, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1300	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1301
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1302	lemma [simp]: "(\<exists>rna. Bk \<up> rn = Bk # Bk \<up> rna) \<or> rn = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1303	apply(case_tac rn, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1304	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1305
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1306	lemma [simp]: "(\<forall> x. a \<noteq> x) = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1307	by auto
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1308
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1309	lemma exp_ind: "a\<up>(Suc x) = a\<up>x @ [a]"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1310	apply(induct x, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1311	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1312
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1313	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1314	"inv_locate_a (as, lm) (q, l, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1315	\<Longrightarrow> inv_locate_b (as, lm) (q, Oc # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1316	apply(simp only: inv_locate_a.simps inv_locate_b.simps in_middle.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1317	at_begin_norm.simps at_begin_fst_bwtn.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1318	at_begin_fst_awtn.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1319	apply(erule disjE, erule exE, erule exE, erule exE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1320	apply(rule_tac x = lm1 in exI, rule_tac x = "tl lm2" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1321	apply(rule_tac x = 0 in exI, rule_tac x = "hd lm2" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1322	apply(case_tac lm2, auto simp: tape_of_nl_cons )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1323	apply(rule_tac x = 1 in exI, rule_tac x = a in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1324	apply(case_tac list, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1325	apply(case_tac rn, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1326	apply(rule_tac x = "lm @ replicate tn 0" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1327	rule_tac x = "[]" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1328	rule_tac x = "Suc tn" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1329	rule_tac x = 0 in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1330	apply(simp only: replicate_Suc[THEN sym] exp_ind)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1331	apply(rule_tac x = "Suc 0" in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1332	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1333
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1334	lemma length_equal: "xs = ys \<Longrightarrow> length xs = length ys"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1335	by auto
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1336
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1337	lemma [simp]: "\<lbrakk>inv_locate_b (as, am) (q, aaa, Bk # xs) ires;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1338	\<not> (\<exists>n. xs = Bk\<up>n)\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1339	\<Longrightarrow> inv_locate_a (as, am) (Suc q, Bk # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1340	apply(simp add: inv_locate_b.simps inv_locate_a.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1341	apply(rule_tac disjI1)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1342	apply(simp only: in_middle.simps at_begin_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1343	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1344	apply(rule_tac x = "lm1 @ [m]" in exI, rule_tac x = lm2 in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1345	apply(subgoal_tac "tn = 0", simp , auto split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1346	apply(case_tac [!] mr, simp_all, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1347	apply(simp add: tape_of_nl_cons)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1348	apply(drule_tac length_equal, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1349	apply(case_tac "length am", simp_all, erule_tac x = rn in allE, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1350	apply(drule_tac length_equal, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1351	apply(case_tac "(Suc (length lm1) - length am)", simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1352	apply(case_tac lm2, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1353	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1354
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1355	lemma locate_b_2_a[intro]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1356	"inv_locate_b (as, am) (q, aaa, Bk # xs) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1357	\<Longrightarrow> inv_locate_a (as, am) (Suc q, Bk # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1358	apply(case_tac "\<exists> n. xs = Bk\<up>n", simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1359	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1360
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1361
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1362	lemma [simp]: "inv_locate_b (as, am) (q, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1363	\<Longrightarrow> inv_locate_b (as, am) (q, l, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1364	apply(simp only: inv_locate_b.simps in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1365	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1366	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1367	rule_tac x = tn in exI, rule_tac x = m in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1368	rule_tac x = ml in exI, rule_tac x = mr in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1369	apply(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1370	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1371
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1372	(inv: from locate_b to after_write)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1373
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1374	lemma [simp]: "(a mod 2 \<noteq> Suc 0) = (a mod 2 = 0) "
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1375	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1376
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1377	lemma [simp]: "(a mod 2 \<noteq> 0) = (a mod 2 = Suc 0) "
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1378	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1379
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1380	lemma mod_ex1: "(a mod 2 = Suc 0) = (\<exists> q. a = Suc (2 * q))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1381	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1382
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1383	lemma mod_ex2: "(a mod (2::nat) = 0) = (\<exists> q. a = 2 * q)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1384	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1385
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1386	lemma [simp]: "(2*q - Suc 0) div 2 = (q - 1)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1387	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1388
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1389	lemma [simp]: "(Suc (2*q)) div 2 = q"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1390	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1391
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1392	lemma mod_2: "x mod 2 = 0 \<or> x mod 2 = Suc 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1393	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1394
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1395	lemma [simp]: "x mod 2 = 0 \<Longrightarrow> Suc x mod 2 = Suc 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1396	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1397
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1398	lemma [simp]: "x mod 2 = Suc 0 \<Longrightarrow> Suc x mod 2 = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1399	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1400
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1401	lemma [simp]: "inv_locate_b (as, am) (q, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1402	\<Longrightarrow> inv_locate_b (as, am) (q, l, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1403	apply(simp only: inv_locate_b.simps in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1404	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1405	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1406	rule_tac x = tn in exI, rule_tac x = m in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1407	rule_tac x = ml in exI, rule_tac x = mr in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1408	apply(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1409	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1410
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1411	lemma locate_b_2_locate_a[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1412	"\<lbrakk>q > 0; inv_locate_b (as, am) (q - Suc 0, aaa, Bk # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1413	\<Longrightarrow> inv_locate_a (as, am) (q, Bk # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1414	apply(insert locate_b_2_a [of as am "q - 1" aaa xs ires], simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1415	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1416
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1417
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1418	lemma [simp]: "inv_locate_b (as, am) (q, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1419	\<Longrightarrow> inv_locate_b (as, am) (q, l, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1420	apply(simp only: inv_locate_b.simps in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1421	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1422	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1423	rule_tac x = tn in exI, rule_tac x = m in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1424	rule_tac x = ml in exI, rule_tac x = mr in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1425	apply(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1426	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1427
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1428	(inv: from locate_b to after_write)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1429
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1430	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1431	"crsp (layout_of ap) (as, lm) (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1432	\<Longrightarrow> findnth_inv (layout_of ap) n (as, lm) (Suc 0, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1433	apply(auto simp: crsp.simps findnth_inv.simps inv_locate_a.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1434	at_begin_norm.simps at_begin_fst_awtn.simps at_begin_fst_bwtn.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1435	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1436
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1437	lemma findnth_correct_pre:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1438	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1439	and crsp: "crsp ly (as, lm) (s, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1440	and not0: "n > 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1441	and f: "f = (\<lambda> stp. (steps (Suc 0, l, r) (findnth n, 0) stp, n))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1442	and P: "P = (\<lambda> ((s, l, r), n). s = Suc (2 * n))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1443	and Q: "Q = (\<lambda> ((s, l, r), n). findnth_inv ly n (as, lm) (s, l, r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1444	shows "\<exists> stp. P (f stp) \<and> Q (f stp)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1445	proof(rule_tac LE = findnth_LE in halt_lemma2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1446	show "wf findnth_LE" by(intro wf_findnth_LE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1447	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1448	show "Q (f 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1449	using crsp layout
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1450	apply(simp add: f P Q steps.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1451	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1452	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1453	show "\<not> P (f 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1454	using not0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1455	apply(simp add: f P steps.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1456	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1457	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1458	show "\<forall>n. \<not> P (f n) \<and> Q (f n) \<longrightarrow> Q (f (Suc n)) \<and> (f (Suc n), f n)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1459	\<in> findnth_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1460	proof(rule_tac allI, rule_tac impI, simp add: f,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1461	case_tac "steps (Suc 0, l, r) (findnth n, 0) na", simp add: P)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1462	fix na a b c
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1463	assume "a \<noteq> Suc (2 * n) \<and> Q ((a, b, c), n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1464	thus "Q (step (a, b, c) (findnth n, 0), n) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1465	((step (a, b, c) (findnth n, 0), n), (a, b, c), n) \<in> findnth_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1466	apply(case_tac c, case_tac [2] aa)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1467	apply(simp_all add: step.simps findnth_LE_def Q findnth_inv.simps mod_2 lex_pair_def split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1468	apply(auto simp: mod_ex1 mod_ex2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1469	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1470	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1471	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1472
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1473	lemma [intro]: "inv_locate_a (as, lm) (0, Bk # Bk # ires, <lm> @ Bk \<up> x) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1474	apply(auto simp: crsp.simps inv_locate_a.simps at_begin_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1475	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1476	lemma [simp]: "crsp ly (as, lm) (s, l, r) ires \<Longrightarrow> inv_locate_a (as, lm) (0, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1477	apply(auto simp: crsp.simps inv_locate_a.simps at_begin_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1478	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1479
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1480	lemma findnth_correct:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1481	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1482	and crsp: "crsp ly (as, lm) (s, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1483	shows "\<exists> stp l' r'. steps (Suc 0, l, r) (findnth n, 0) stp = (Suc (2 * n), l', r')
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1484	\<and> inv_locate_a (as, lm) (n, l', r') ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1485	using crsp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1486	apply(case_tac "n = 0")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1487	apply(rule_tac x = 0 in exI, auto simp: steps.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1488	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1489	apply(drule_tac findnth_correct_pre, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1490	apply(rule_tac x = stp in exI, simp add: findnth_inv.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1491	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1492
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1493
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1494	fun inc_inv :: "nat \<Rightarrow> inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1495	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1496	"inc_inv n (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1497	(let lm' = abc_lm_s lm n (Suc (abc_lm_v lm n)) in
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1498	if s = 0 then False
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1499	else if s = 1 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1500	inv_locate_a (as, lm) (n, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1501	else if s = 2 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1502	inv_locate_b (as, lm) (n, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1503	else if s = 3 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1504	inv_after_write (as, lm') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1505	else if s = Suc 3 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1506	inv_after_move (as, lm') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1507	else if s = Suc 4 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1508	inv_after_clear (as, lm') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1509	else if s = Suc (Suc 4) then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1510	inv_on_right_moving (as, lm') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1511	else if s = Suc (Suc 5) then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1512	inv_on_left_moving (as, lm') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1513	else if s = Suc (Suc (Suc 5)) then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1514	inv_check_left_moving (as, lm') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1515	else if s = Suc (Suc (Suc (Suc 5))) then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1516	inv_after_left_moving (as, lm') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1517	else if s = Suc (Suc (Suc (Suc (Suc 5)))) then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1518	inv_stop (as, lm') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1519	else False)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1520
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1521
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1522	fun abc_inc_stage1 :: "config \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1523	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1524	"abc_inc_stage1 (s, l, r) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1525	(if s = 0 then 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1526	else if s \<le> 2 then 5
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1527	else if s \<le> 6 then 4
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1528	else if s \<le> 8 then 3
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1529	else if s = 9 then 2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1530	else 1)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1531
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1532	fun abc_inc_stage2 :: "config \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1533	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1534	"abc_inc_stage2 (s, l, r) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1535	(if s = 1 then 2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1536	else if s = 2 then 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1537	else if s = 3 then length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1538	else if s = 4 then length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1539	else if s = 5 then length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1540	else if s = 6 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1541	if r \<noteq> [] then length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1542	else 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1543	else if s = 7 then length l
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1544	else if s = 8 then length l
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1545	else 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1546
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1547	fun abc_inc_stage3 :: "config \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1548	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1549	"abc_inc_stage3 (s, l, r) = (
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1550	if s = 4 then 4
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1551	else if s = 5 then 3
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1552	else if s = 6 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1553	if r \<noteq> [] \<and> hd r = Oc then 2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1554	else 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1555	else if s = 3 then 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1556	else if s = 2 then length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1557	else if s = 1 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1558	if (r \<noteq> [] \<and> hd r = Oc) then 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1559	else 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1560	else 10 - s)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1561
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1562
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1563	definition inc_measure :: "config \<Rightarrow> nat \<times> nat \<times> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1564	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1565	"inc_measure c =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1566	(abc_inc_stage1 c, abc_inc_stage2 c, abc_inc_stage3 c)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1567
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1568	definition lex_triple ::
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1569	"((nat \<times> (nat \<times> nat)) \<times> (nat \<times> (nat \<times> nat))) set"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1570	where "lex_triple \<equiv> less_than <lex> lex_pair"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1571
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1572	definition inc_LE :: "(config \<times> config) set"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1573	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1574	"inc_LE \<equiv> (inv_image lex_triple inc_measure)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1575
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1576	declare inc_inv.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1577
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1578	lemma wf_inc_le[intro]: "wf inc_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1579	by(auto intro:wf_inv_image simp: inc_LE_def lex_triple_def lex_pair_def)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1580
115 653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1581	lemma numeral_5_eq_5: "5 = Suc (Suc (Suc (Suc (Suc 0))))"
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1582	by arith
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1583
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1584	lemma numeral_6_eq_6: "6 = Suc (Suc (Suc (Suc (Suc 1))))"
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1585	by arith
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1586
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1587	lemma numeral_7_eq_7: "7 = Suc (Suc (Suc (Suc (Suc 2))))"
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1588	by arith
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1589
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1590	lemma numeral_8_eq_8: "8 = Suc (Suc (Suc (Suc (Suc 3))))"
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1591	by arith
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1592
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1593	lemma numeral_9_eq_9: "9 = Suc (Suc (Suc (Suc (Suc (Suc 3)))))"
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1594	by arith
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1595
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1596	lemma numeral_10_eq_10: "10 = Suc (Suc (Suc (Suc (Suc (Suc (Suc 3))))))"
653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	1597	by arith
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1598
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1599	lemma inv_locate_b_2_after_write[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1600	"inv_locate_b (as, am) (n, aaa, Bk # xs) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1601	\<Longrightarrow> inv_after_write (as, abc_lm_s am n (Suc (abc_lm_v am n)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1602	(s, aaa, Oc # xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1603	apply(auto simp: in_middle.simps inv_after_write.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1604	abc_lm_v.simps abc_lm_s.simps inv_locate_b.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1605	apply(case_tac [!] mr, auto split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1606	apply(rule_tac x = rn in exI, rule_tac x = "Suc m" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1607	rule_tac x = "lm1" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1608	apply(rule_tac x = "lm2" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1609	apply(simp only: Suc_diff_le exp_ind)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1610	apply(subgoal_tac "lm2 = []", simp)
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1611	apply(drule_tac length_equal, simp)
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1612	by (metis (no_types, lifting) add_diff_inverse_nat append.assoc append_eq_append_conv length_append length_replicate list.inject)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1613
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1614	lemma [simp]: "inv_locate_b (as, am) (n, aaa, []) ires \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1615	inv_after_write (as, abc_lm_s am n (Suc (abc_lm_v am n)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1616	(s, aaa, [Oc]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1617	apply(insert inv_locate_b_2_after_write [of as am n aaa "[]"])
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1618	by(simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1619
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1620
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1621
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1622	(inv: from after_write to after_move)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1623	lemma [simp]: "inv_after_write (as, lm) (x, l, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1624	\<Longrightarrow> inv_after_move (as, lm) (y, Oc # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1625	apply(auto simp:inv_after_move.simps inv_after_write.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1626	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1627
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1628	lemma [simp]: "inv_after_write (as, abc_lm_s am n (Suc (abc_lm_v am n)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1629	)) (x, aaa, Bk # xs) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1630	apply(simp add: inv_after_write.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1631	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1632
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1633	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1634	"inv_after_write (as, abc_lm_s am n (Suc (abc_lm_v am n)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1635	(x, aaa, []) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1636	apply(simp add: inv_after_write.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1637	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1638
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1639	(inv: from after_move to after_clear)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1640	lemma [simp]: "inv_after_move (as, lm) (s, l, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1641	\<Longrightarrow> inv_after_clear (as, lm) (s', l, Bk # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1642	apply(auto simp: inv_after_move.simps inv_after_clear.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1643	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1644
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1645	(inv: from after_move to on_leftmoving)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1646	lemma [intro]: "Bk \<up> rn = Bk # Bk \<up> (rn - Suc 0) \<or> rn = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1647	apply(case_tac rn, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1648	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1649
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1650	lemma inv_after_move_2_inv_on_left_moving[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1651	"inv_after_move (as, lm) (s, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1652	\<Longrightarrow> (l = [] \<longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1653	inv_on_left_moving (as, lm) (s', [], Bk # Bk # r) ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1654	(l \<noteq> [] \<longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1655	inv_on_left_moving (as, lm) (s', tl l, hd l # Bk # r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1656	apply(simp only: inv_after_move.simps inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1657	apply(subgoal_tac "l \<noteq> []", rule conjI, simp, rule impI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1658	rule disjI1, simp only: inv_on_left_moving_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1659	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1660	apply(subgoal_tac "lm2 = []")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1661	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1662	rule_tac x = m in exI, rule_tac x = m in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1663	rule_tac x = 1 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1664	rule_tac x = "rn - 1" in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1665	apply(auto split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1666	apply(case_tac [1-2] rn, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1667	apply(case_tac [!] lm2, simp_all add: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1668	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1669
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1670
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1671	lemma inv_after_move_2_inv_on_left_moving_B[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1672	"inv_after_move (as, lm) (s, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1673	\<Longrightarrow> (l = [] \<longrightarrow> inv_on_left_moving (as, lm) (s', [], [Bk]) ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1674	(l \<noteq> [] \<longrightarrow> inv_on_left_moving (as, lm) (s', tl l, [hd l]) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1675	apply(simp only: inv_after_move.simps inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1676	apply(subgoal_tac "l \<noteq> []", rule conjI, simp, rule impI, rule disjI1,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1677	simp only: inv_on_left_moving_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1678	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1679	apply(subgoal_tac "lm2 = []")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1680	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1681	rule_tac x = m in exI, rule_tac x = m in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1682	rule_tac x = 1 in exI, rule_tac x = "rn - 1" in exI, simp, case_tac rn)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1683	apply(auto split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1684	apply(case_tac [!] lm2, auto simp: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1685	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1686
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1687	(inv: from after_clear to on_right_moving)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1688	lemma [simp]: "Oc # r = replicate rn Bk = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1689	apply(case_tac rn, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1690	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1691
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1692	lemma inv_after_clear_2_inv_on_right_moving[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1693	"inv_after_clear (as, lm) (x, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1694	\<Longrightarrow> inv_on_right_moving (as, lm) (y, Bk # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1695	apply(auto simp: inv_after_clear.simps inv_on_right_moving.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1696	apply(subgoal_tac "lm2 \<noteq> []")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1697	apply(rule_tac x = "lm1 @ [m]" in exI, rule_tac x = "tl lm2" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1698	rule_tac x = "hd lm2" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1699	apply(rule_tac x = 0 in exI, rule_tac x = "hd lm2" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1700	apply(simp, rule conjI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1701	apply(case_tac [!] "lm2::nat list", auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1702	apply(case_tac rn, auto split: if_splits simp: tape_of_nl_cons)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1703	apply(case_tac [!] rn, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1704	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1705
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1706	lemma [simp]: "inv_after_clear (as, lm) (x, l, []) ires\<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1707	inv_after_clear (as, lm) (y, l, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1708	by(auto simp: inv_after_clear.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1709
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1710	lemma [simp]: "inv_after_clear (as, lm) (x, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1711	\<Longrightarrow> inv_on_right_moving (as, lm) (y, Bk # l, []) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1712	by(insert
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1713	inv_after_clear_2_inv_on_right_moving[of as lm n l "[]"], simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1714
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1715	(inv: from on_right_moving to on_right_movign)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1716	lemma [simp]: "inv_on_right_moving (as, lm) (x, l, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1717	\<Longrightarrow> inv_on_right_moving (as, lm) (y, Oc # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1718	apply(auto simp: inv_on_right_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1719	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1720	rule_tac x = "ml + mr" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1721	apply(rule_tac x = "Suc ml" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1722	rule_tac x = "mr - 1" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1723	apply(case_tac mr, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1724	apply(rule_tac x = lm1 in exI, rule_tac x = "[]" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1725	rule_tac x = "ml + mr" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1726	apply(rule_tac x = "Suc ml" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1727	rule_tac x = "mr - 1" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1728	apply(case_tac mr, auto split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1729	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1730
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1731	lemma inv_on_right_moving_2_inv_on_right_moving[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1732	"inv_on_right_moving (as, lm) (x, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1733	\<Longrightarrow> inv_after_write (as, lm) (y, l, Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1734	apply(auto simp: inv_on_right_moving.simps inv_after_write.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1735	apply(case_tac mr, auto simp: split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1736	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1737
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1738	lemma [simp]: "inv_on_right_moving (as, lm) (x, l, []) ires\<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1739	inv_on_right_moving (as, lm) (y, l, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1740	apply(auto simp: inv_on_right_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1741	apply(rule_tac x = lm1 in exI, rule_tac x = "[]" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1742	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1743
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1744	(inv: from on_right_moving to after_write)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1745	lemma [simp]: "inv_on_right_moving (as, lm) (x, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1746	\<Longrightarrow> inv_after_write (as, lm) (y, l, [Oc]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1747	apply(rule_tac inv_on_right_moving_2_inv_on_right_moving, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1748	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1749
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1750	(inv: from on_left_moving to on_left_moving)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1751	lemma [simp]: "inv_on_left_moving_in_middle_B (as, lm)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1752	(s, l, Oc # r) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1753	apply(auto simp: inv_on_left_moving_in_middle_B.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1754	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1755
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1756	lemma [simp]: "inv_on_left_moving_norm (as, lm) (s, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1757	= False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1758	apply(auto simp: inv_on_left_moving_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1759	apply(case_tac [!] mr, auto simp: )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1760	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1761
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1762	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1763	"\<lbrakk>inv_on_left_moving_norm (as, lm) (s, l, Oc # r) ires;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1764	hd l = Bk; l \<noteq> []\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1765	inv_on_left_moving_in_middle_B (as, lm) (s, tl l, Bk # Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1766	apply(case_tac l, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1767	apply(simp only: inv_on_left_moving_norm.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1768	inv_on_left_moving_in_middle_B.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1769	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1770	apply(rule_tac x = lm1 in exI, rule_tac x = "m # lm2" in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1771	apply(case_tac [!] ml, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1772	apply(auto simp: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1773	apply(rule_tac [!] x = "Suc rn" in exI, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1774	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1775
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1776	lemma [simp]: "\<lbrakk>inv_on_left_moving_norm (as, lm) (s, l, Oc # r) ires;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1777	hd l = Oc; l \<noteq> []\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1778	\<Longrightarrow> inv_on_left_moving_norm (as, lm)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1779	(s, tl l, Oc # Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1780	apply(simp only: inv_on_left_moving_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1781	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1782	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1783	rule_tac x = m in exI, rule_tac x = "ml - 1" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1784	rule_tac x = "Suc mr" in exI, rule_tac x = rn in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1785	apply(case_tac ml, auto simp: split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1786	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1787
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1788	lemma [simp]: "inv_on_left_moving_norm (as, lm) (s, [], Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1789	\<Longrightarrow> inv_on_left_moving_in_middle_B (as, lm) (s, [], Bk # Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1790	apply(auto simp: inv_on_left_moving_norm.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1791	inv_on_left_moving_in_middle_B.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1792	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1793
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1794	lemma [simp]:"inv_on_left_moving (as, lm) (s, l, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1795	\<Longrightarrow> (l = [] \<longrightarrow> inv_on_left_moving (as, lm) (s, [], Bk # Oc # r) ires)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1796	\<and> (l \<noteq> [] \<longrightarrow> inv_on_left_moving (as, lm) (s, tl l, hd l # Oc # r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1797	apply(simp add: inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1798	apply(case_tac "l \<noteq> []", rule conjI, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1799	apply(case_tac "hd l", simp, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1800	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1801
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1802	lemma from_on_left_moving_to_check_left_moving[simp]: "inv_on_left_moving_in_middle_B (as, lm)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1803	(s, Bk # list, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1804	\<Longrightarrow> inv_check_left_moving_on_leftmost (as, lm)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1805	(s', list, Bk # Bk # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1806	apply(auto simp: inv_on_left_moving_in_middle_B.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1807	inv_check_left_moving_on_leftmost.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1808	apply(case_tac [!] "rev lm1", simp_all)
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1809	apply(case_tac [!] lista, simp_all add: tape_of_nat_def tape_of_list_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1810	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1811
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1812	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1813	"inv_check_left_moving_in_middle (as, lm) (s, l, Bk # r) ires= False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1814	by(auto simp: inv_check_left_moving_in_middle.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1815
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1816	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1817	"inv_on_left_moving_in_middle_B (as, lm) (s, [], Bk # r) ires\<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1818	inv_check_left_moving_on_leftmost (as, lm) (s', [], Bk # Bk # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1819	apply(auto simp: inv_on_left_moving_in_middle_B.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1820	inv_check_left_moving_on_leftmost.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1821	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1822
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1823	lemma [simp]: "inv_check_left_moving_on_leftmost (as, lm)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1824	(s, list, Oc # r) ires= False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1825	by(auto simp: inv_check_left_moving_on_leftmost.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1826
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1827	lemma [simp]: "inv_on_left_moving_in_middle_B (as, lm)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1828	(s, Oc # list, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1829	\<Longrightarrow> inv_check_left_moving_in_middle (as, lm) (s', list, Oc # Bk # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1830	apply(auto simp: inv_on_left_moving_in_middle_B.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1831	inv_check_left_moving_in_middle.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1832	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1833
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1834	lemma inv_on_left_moving_2_check_left_moving[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1835	"inv_on_left_moving (as, lm) (s, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1836	\<Longrightarrow> (l = [] \<longrightarrow> inv_check_left_moving (as, lm) (s', [], Bk # Bk # r) ires)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1837	\<and> (l \<noteq> [] \<longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1838	inv_check_left_moving (as, lm) (s', tl l, hd l # Bk # r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1839	apply(simp add: inv_on_left_moving.simps inv_check_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1840	apply(case_tac l, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1841	apply(case_tac a, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1842	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1843
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1844	lemma [simp]: "inv_on_left_moving_norm (as, lm) (s, l, []) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1845	apply(auto simp: inv_on_left_moving_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1846	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1847
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1848	lemma [simp]: "inv_on_left_moving (as, lm) (s, l, []) ires\<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1849	inv_on_left_moving (as, lm) (6 + 2 * n, l, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1850	apply(simp add: inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1851	apply(auto simp: inv_on_left_moving_in_middle_B.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1852	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1853
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1854	lemma [simp]: "inv_on_left_moving (as, lm) (s, l, []) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1855	apply(simp add: inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1856	apply(simp add: inv_on_left_moving_in_middle_B.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1857	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1858
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1859	lemma [simp]: "inv_on_left_moving (as, lm) (s, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1860	\<Longrightarrow> (l = [] \<longrightarrow> inv_check_left_moving (as, lm) (s', [], [Bk]) ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1861	(l \<noteq> [] \<longrightarrow> inv_check_left_moving (as, lm) (s', tl l, [hd l]) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1862	by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1863
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1864	lemma [intro]: "\<exists>rna. Bk # Bk \<up> rn = Bk \<up> rna"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1865	apply(rule_tac x = "Suc rn" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1866	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1867
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1868	lemma
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1869	inv_check_left_moving_in_middle_2_on_left_moving_in_middle_B[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1870	"inv_check_left_moving_in_middle (as, lm) (s, Bk # list, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1871	\<Longrightarrow> inv_on_left_moving_in_middle_B (as, lm) (s', list, Bk # Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1872	apply(simp only: inv_check_left_moving_in_middle.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1873	inv_on_left_moving_in_middle_B.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1874	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1875	apply(rule_tac x = "rev (tl (rev lm1))" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1876	rule_tac x = "[hd (rev lm1)] @ lm2" in exI, auto)
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1877	apply(case_tac [!] "rev lm1",simp_all add: tape_of_nat_def tape_of_list_def tape_of_nat_list.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1878	apply(case_tac [!] a, simp_all)
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1879	apply(case_tac [1] lm2, auto simp:tape_of_nat_def)
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1880	apply(case_tac [3] lm2, auto simp:tape_of_nat_def)
a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	1881	apply(case_tac [!] lista, simp_all add: tape_of_nat_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1882	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1883
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1884	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1885	"inv_check_left_moving_in_middle (as, lm) (s, [], Oc # r) ires\<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1886	inv_check_left_moving_in_middle (as, lm) (s', [Bk], Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1887	apply(auto simp: inv_check_left_moving_in_middle.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1888	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1889
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1890	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1891	"inv_check_left_moving_in_middle (as, lm) (s, [], Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1892	\<Longrightarrow> inv_on_left_moving_in_middle_B (as, lm) (s', [], Bk # Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1893	apply(insert
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1894	inv_check_left_moving_in_middle_2_on_left_moving_in_middle_B[of
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1895	as lm n "[]" r], simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1896	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1897
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1898	lemma [simp]: "inv_check_left_moving_in_middle (as, lm)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1899	(s, Oc # list, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1900	\<Longrightarrow> inv_on_left_moving_norm (as, lm) (s', list, Oc # Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1901	apply(auto simp: inv_check_left_moving_in_middle.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1902	inv_on_left_moving_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1903	apply(rule_tac x = "rev (tl (rev lm1))" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1904	rule_tac x = lm2 in exI, rule_tac x = "hd (rev lm1)" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1905	apply(rule_tac conjI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1906	apply(case_tac "rev lm1", simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1907	apply(rule_tac x = "hd (rev lm1) - 1" in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1908	apply(rule_tac [!] x = "Suc (Suc 0)" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1909	apply(case_tac [!] "rev lm1", simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1910	apply(case_tac [!] a, simp_all add: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1911	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1912
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1913	lemma [simp]: "inv_check_left_moving (as, lm) (s, l, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1914	\<Longrightarrow> (l = [] \<longrightarrow> inv_on_left_moving (as, lm) (s', [], Bk # Oc # r) ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1915	(l \<noteq> [] \<longrightarrow> inv_on_left_moving (as, lm) (s', tl l, hd l # Oc # r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1916	apply(case_tac l,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1917	auto simp: inv_check_left_moving.simps inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1918	apply(case_tac a, simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1919	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1920
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1921	(inv: check_left_moving to after_left_moving)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1922	lemma [simp]: "inv_check_left_moving (as, lm) (s, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1923	\<Longrightarrow> inv_after_left_moving (as, lm) (s', Bk # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1924	apply(auto simp: inv_check_left_moving.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1925	inv_check_left_moving_on_leftmost.simps inv_after_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1926	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1927
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1928
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1929	lemma [simp]:"inv_check_left_moving (as, lm) (s, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1930	\<Longrightarrow> inv_after_left_moving (as, lm) (s', Bk # l, []) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1931	by(simp add: inv_check_left_moving.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1932	inv_check_left_moving_in_middle.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1933	inv_check_left_moving_on_leftmost.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1934
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1935	(inv: after_left_moving to inv_stop)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1936	lemma [simp]: "inv_after_left_moving (as, lm) (s, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1937	\<Longrightarrow> inv_stop (as, lm) (s', Bk # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1938	apply(auto simp: inv_after_left_moving.simps inv_stop.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1939	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1940
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1941	lemma [simp]: "inv_after_left_moving (as, lm) (s, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1942	\<Longrightarrow> inv_stop (as, lm) (s', Bk # l, []) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1943	by(auto simp: inv_after_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1944
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1945	(inv: stop to stop)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1946	lemma [simp]: "inv_stop (as, lm) (x, l, r) ires \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1947	inv_stop (as, lm) (y, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1948	apply(simp add: inv_stop.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1949	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1950
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1951	lemma [simp]: "inv_after_clear (as, lm) (s, aaa, Oc # xs) ires= False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1952	apply(auto simp: inv_after_clear.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1953	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1954
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1955	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1956	"inv_after_left_moving (as, lm) (s, aaa, Oc # xs) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1957	by(auto simp: inv_after_left_moving.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1958
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1959	lemma [simp]: "inv_after_clear (as, abc_lm_s lm n (Suc (abc_lm_v lm n))) (s, b, []) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1960	apply(auto simp: inv_after_clear.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1961	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1962
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1963	lemma [simp]: "inv_on_left_moving (as, abc_lm_s lm n (Suc (abc_lm_v lm n)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1964	(s, b, Oc # list) ires \<Longrightarrow> b \<noteq> []"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1965	apply(auto simp: inv_on_left_moving.simps inv_on_left_moving_norm.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1966	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1967
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1968	lemma [simp]: "inv_check_left_moving (as, abc_lm_s lm n (Suc (abc_lm_v lm n))) (s, b, Oc # list) ires \<Longrightarrow> b \<noteq> []"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1969	apply(auto simp: inv_check_left_moving.simps inv_check_left_moving_in_middle.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1970	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1971
173 b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	1972	lemma numeral_4_eq_4: "4 = Suc (Suc (Suc (Suc 0)))"
b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	1973	by arith
b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	1974
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1975	lemma tinc_correct_pre:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1976	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1977	and inv_start: "inv_locate_a (as, lm) (n, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1978	and lm': "lm' = abc_lm_s lm n (Suc (abc_lm_v lm n))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1979	and f: "f = steps (Suc 0, l, r) (tinc_b, 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1980	and P: "P = (\<lambda> (s, l, r). s = 10)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1981	and Q: "Q = (\<lambda> (s, l, r). inc_inv n (as, lm) (s, l, r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1982	shows "\<exists> stp. P (f stp) \<and> Q (f stp)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1983	proof(rule_tac LE = inc_LE in halt_lemma2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1984	show "wf inc_LE" by(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1985	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1986	show "Q (f 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1987	using inv_start
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1988	apply(simp add: f P Q steps.simps inc_inv.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1989	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1990	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1991	show "\<not> P (f 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1992	apply(simp add: f P steps.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1993	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1994	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1995	show "\<forall>n. \<not> P (f n) \<and> Q (f n) \<longrightarrow> Q (f (Suc n)) \<and> (f (Suc n), f n)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1996	\<in> inc_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1997	proof(rule_tac allI, rule_tac impI, simp add: f,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1998	case_tac "steps (Suc 0, l, r) (tinc_b, 0) n", simp add: P)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	1999	fix n a b c
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2000	assume "a \<noteq> 10 \<and> Q (a, b, c)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2001	thus "Q (step (a, b, c) (tinc_b, 0)) \<and> (step (a, b, c) (tinc_b, 0), a, b, c) \<in> inc_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2002	apply(simp add:Q)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2003	apply(simp add: inc_inv.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2004	apply(case_tac c, case_tac [2] aa)
173 b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	2005	apply(auto simp: Let_def step.simps tinc_b_def split: if_splits)
b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	2006	apply(simp_all add: inc_inv.simps inc_LE_def lex_triple_def lex_pair_def inc_measure_def numeral_5_eq_5 numeral_2_eq_2 numeral_3_eq_3
b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	2007	numeral_4_eq_4 numeral_6_eq_6 numeral_7_eq_7 numeral_8_eq_8 numeral_9_eq_9)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2008	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2009	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2010	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2011
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2012	lemma tinc_correct:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2013	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2014	and inv_start: "inv_locate_a (as, lm) (n, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2015	and lm': "lm' = abc_lm_s lm n (Suc (abc_lm_v lm n))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2016	shows "\<exists> stp l' r'. steps (Suc 0, l, r) (tinc_b, 0) stp = (10, l', r')
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2017	\<and> inv_stop (as, lm') (10, l', r') ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2018	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2019	apply(drule_tac tinc_correct_pre, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2020	apply(rule_tac x = stp in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2021	apply(simp add: inc_inv.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2022	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2023
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2024	declare inv_locate_a.simps[simp del] abc_lm_s.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2025	abc_lm_v.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2026
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2027	lemma [simp]: "(4::nat) * n mod 2 = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2028	apply(arith)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2029	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2030
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2031	lemma crsp_step_inc_pre:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2032	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2033	and crsp: "crsp ly (as, lm) (s, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2034	and aexec: "abc_step_l (as, lm) (Some (Inc n)) = (asa, lma)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2035	shows "\<exists> stp k. steps (Suc 0, l, r) (findnth n @ shift tinc_b (2 * n), 0) stp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2036	= (2*n + 10, Bk # Bk # ires, <lma> @ Bk\<up>k) \<and> stp > 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2037	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2038	have "\<exists> stp l' r'. steps (Suc 0, l, r) (findnth n, 0) stp = (Suc (2 * n), l', r')
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2039	\<and> inv_locate_a (as, lm) (n, l', r') ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2040	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2041	apply(rule_tac findnth_correct, simp_all add: crsp layout)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2042	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2043	from this obtain stp l' r' where a:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2044	"steps (Suc 0, l, r) (findnth n, 0) stp = (Suc (2 * n), l', r')
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2045	\<and> inv_locate_a (as, lm) (n, l', r') ires" by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2046	moreover have
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2047	"\<exists> stp la ra. steps (Suc 0, l', r') (tinc_b, 0) stp = (10, la, ra)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2048	\<and> inv_stop (as, lma) (10, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2049	using assms a
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2050	proof(rule_tac lm' = lma and n = n and lm = lm and ly = ly and ap = ap in tinc_correct,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2051	simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2052	show "lma = abc_lm_s lm n (Suc (abc_lm_v lm n))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2053	using aexec
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2054	apply(simp add: abc_step_l.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2055	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2056	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2057	from this obtain stpa la ra where b:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2058	"steps (Suc 0, l', r') (tinc_b, 0) stpa = (10, la, ra)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2059	\<and> inv_stop (as, lma) (10, la, ra) ires" by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2060	from a b show "\<exists>stp k. steps (Suc 0, l, r) (findnth n @ shift tinc_b (2 * n), 0) stp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2061	= (2 * n + 10, Bk # Bk # ires, <lma> @ Bk \<up> k) \<and> stp > 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2062	apply(rule_tac x = "stp + stpa" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2063	using tm_append_steps[of "Suc 0" l r "findnth n" stp l' r' tinc_b stpa 10 la ra "length (findnth n) div 2"]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2064	apply(simp add: length_findnth inv_stop.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2065	apply(case_tac stpa, simp_all add: steps.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2066	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2067	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2068
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	2069	lemma crsp_step_inc:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	2070	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	2071	and crsp: "crsp ly (as, lm) (s, l, r) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	2072	and fetch: "abc_fetch as ap = Some (Inc n)"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2073	shows "\<exists>stp > 0. crsp ly (abc_step_l (as, lm) (Some (Inc n)))
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	2074	(steps (s, l, r) (ci ly (start_of ly as) (Inc n), start_of ly as - Suc 0) stp) ires"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2075	proof(case_tac "(abc_step_l (as, lm) (Some (Inc n)))")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2076	fix a b
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2077	assume aexec: "abc_step_l (as, lm) (Some (Inc n)) = (a, b)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2078	then have "\<exists> stp k. steps (Suc 0, l, r) (findnth n @ shift tinc_b (2 * n), 0) stp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2079	= (2*n + 10, Bk # Bk # ires, <b> @ Bk\<up>k) \<and> stp > 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2080	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2081	apply(rule_tac crsp_step_inc_pre, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2082	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2083	thus "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2084	using assms aexec
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2085	apply(erule_tac exE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2086	apply(erule_tac exE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2087	apply(erule_tac conjE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2088	apply(rule_tac x = stp in exI, simp add: ci.simps tm_shift_eq_steps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2089	apply(drule_tac off = "(start_of (layout_of ap) as - Suc 0)" in tm_shift_eq_steps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2090	apply(auto simp: crsp.simps abc_step_l.simps fetch start_of_Suc1)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2091	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2092	qed
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	2093
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	2094	subsection{* Crsp of Dec n e*}
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2095	declare adjust.simps[simp del]
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2096
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2097	type_synonym dec_inv_t = "(nat * nat list) \<Rightarrow> config \<Rightarrow> cell list \<Rightarrow> bool"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2098
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2099	fun dec_first_on_right_moving :: "nat \<Rightarrow> dec_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2100	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2101	"dec_first_on_right_moving n (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2102	(\<exists> lm1 lm2 m ml mr rn. lm = lm1 @ [m] @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2103	ml + mr = Suc m \<and> length lm1 = n \<and> ml > 0 \<and> m > 0 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2104	(if lm1 = [] then l = Oc\<up>ml @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2105	else l = Oc\<up>ml @ [Bk] @ <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2106	((r = Oc\<up>mr @ [Bk] @ <lm2> @ Bk\<up>rn) \<or> (r = Oc\<up>mr \<and> lm2 = [])))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2107
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2108	fun dec_on_right_moving :: "dec_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2109	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2110	"dec_on_right_moving (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2111	(\<exists> lm1 lm2 m ml mr rn. lm = lm1 @ [m] @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2112	ml + mr = Suc (Suc m) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2113	(if lm1 = [] then l = Oc\<up>ml@ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2114	else l = Oc\<up>ml @ [Bk] @ <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2115	((r = Oc\<up>mr @ [Bk] @ <lm2> @ Bk\<up>rn) \<or> (r = Oc\<up>mr \<and> lm2 = [])))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2116
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2117	fun dec_after_clear :: "dec_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2118	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2119	"dec_after_clear (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2120	(\<exists> lm1 lm2 m ml mr rn. lm = lm1 @ [m] @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2121	ml + mr = Suc m \<and> ml = Suc m \<and> r \<noteq> [] \<and> r \<noteq> [] \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2122	(if lm1 = [] then l = Oc\<up>ml@ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2123	else l = Oc\<up>ml @ [Bk] @ <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2124	(tl r = Bk # <lm2> @ Bk\<up>rn \<or> tl r = [] \<and> lm2 = []))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2125
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2126	fun dec_after_write :: "dec_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2127	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2128	"dec_after_write (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2129	(\<exists> lm1 lm2 m ml mr rn. lm = lm1 @ [m] @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2130	ml + mr = Suc m \<and> ml = Suc m \<and> lm2 \<noteq> [] \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2131	(if lm1 = [] then l = Bk # Oc\<up>ml @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2132	else l = Bk # Oc\<up>ml @ [Bk] @ <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2133	tl r = <lm2> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2134
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2135	fun dec_right_move :: "dec_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2136	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2137	"dec_right_move (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2138	(\<exists> lm1 lm2 m ml mr rn. lm = lm1 @ [m] @ lm2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2139	\<and> ml = Suc m \<and> mr = (0::nat) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2140	(if lm1 = [] then l = Bk # Oc\<up>ml @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2141	else l = Bk # Oc\<up>ml @ [Bk] @ <rev lm1> @ Bk # Bk # ires)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2142	\<and> (r = Bk # <lm2> @ Bk\<up>rn \<or> r = [] \<and> lm2 = []))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2143
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2144	fun dec_check_right_move :: "dec_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2145	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2146	"dec_check_right_move (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2147	(\<exists> lm1 lm2 m ml mr rn. lm = lm1 @ [m] @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2148	ml = Suc m \<and> mr = (0::nat) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2149	(if lm1 = [] then l = Bk # Bk # Oc\<up>ml @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2150	else l = Bk # Bk # Oc\<up>ml @ [Bk] @ <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2151	r = <lm2> @ Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2152
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2153	fun dec_left_move :: "dec_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2154	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2155	"dec_left_move (as, lm) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2156	(\<exists> lm1 m rn. (lm::nat list) = lm1 @ [m::nat] \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2157	rn > 0 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2158	(if lm1 = [] then l = Bk # Oc\<up>Suc m @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2159	else l = Bk # Oc\<up>Suc m @ Bk # <rev lm1> @ Bk # Bk # ires) \<and> r = Bk\<up>rn)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2160
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2161	declare
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2162	dec_on_right_moving.simps[simp del] dec_after_clear.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2163	dec_after_write.simps[simp del] dec_left_move.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2164	dec_check_right_move.simps[simp del] dec_right_move.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2165	dec_first_on_right_moving.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2166
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2167	fun inv_locate_n_b :: "inc_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2168	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2169	"inv_locate_n_b (as, lm) (s, l, r) ires=
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2170	(\<exists> lm1 lm2 tn m ml mr rn. lm @ 0\<up>tn = lm1 @ [m] @ lm2 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2171	length lm1 = s \<and> m + 1 = ml + mr \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2172	ml = 1 \<and> tn = s + 1 - length lm \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2173	(if lm1 = [] then l = Oc\<up>ml @ Bk # Bk # ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2174	else l = Oc\<up>ml @ Bk # <rev lm1> @ Bk # Bk # ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2175	(r = Oc\<up>mr @ [Bk] @ <lm2>@ Bk\<up>rn \<or> (lm2 = [] \<and> r = Oc\<up>mr))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2176	)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2177
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2178	fun dec_inv_1 :: "layout \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> dec_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2179	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2180	"dec_inv_1 ly n e (as, am) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2181	(let ss = start_of ly as in
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2182	let am' = abc_lm_s am n (abc_lm_v am n - Suc 0) in
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2183	let am'' = abc_lm_s am n (abc_lm_v am n) in
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2184	if s = start_of ly e then inv_stop (as, am'') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2185	else if s = ss then False
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2186	else if s = ss + 2 * n + 1 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2187	inv_locate_b (as, am) (n, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2188	else if s = ss + 2 * n + 13 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2189	inv_on_left_moving (as, am'') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2190	else if s = ss + 2 * n + 14 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2191	inv_check_left_moving (as, am'') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2192	else if s = ss + 2 * n + 15 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2193	inv_after_left_moving (as, am'') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2194	else False)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2195
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2196	declare fetch.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2197	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2198	"fetch (ci ly (start_of ly as) (Dec n e)) (Suc (2 * n)) Bk = (W1, start_of ly as + 2 *n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2199	apply(auto simp: fetch.simps length_ci_dec)
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2200	apply(auto simp: ci.simps nth_append length_findnth adjust.simps shift.simps tdec_b_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2201	using startof_not0[of ly as] by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2202
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2203	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2204	"fetch (ci ly (start_of ly as) (Dec n e)) (Suc (2 * n)) Oc = (R, Suc (start_of ly as) + 2 *n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2205	apply(auto simp: fetch.simps length_ci_dec)
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2206	apply(auto simp: ci.simps nth_append length_findnth adjust.simps shift.simps tdec_b_def)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2207	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2208
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2209	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2210	"\<lbrakk>r = [] \<or> hd r = Bk; inv_locate_a (as, lm) (n, l, r) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2211	\<Longrightarrow> \<exists>stp la ra.
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2212	steps (start_of ly as + 2 * n, l, r) (ci ly (start_of ly as) (Dec n e),
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2213	start_of ly as - Suc 0) stp = (Suc (start_of ly as + 2 * n), la, ra) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2214	inv_locate_b (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2215	apply(rule_tac x = "Suc (Suc 0)" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2216	apply(auto simp: steps.simps step.simps length_ci_dec)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2217	apply(case_tac r, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2218	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2219
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2220	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2221	"\<lbrakk>inv_locate_a (as, lm) (n, l, r) ires; r \<noteq> [] \<and> hd r \<noteq> Bk\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2222	\<Longrightarrow> \<exists>stp la ra.
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2223	steps (start_of ly as + 2 * n, l, r) (ci ly (start_of ly as) (Dec n e),
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2224	start_of ly as - Suc 0) stp = (Suc (start_of ly as + 2 * n), la, ra) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2225	inv_locate_b (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2226	apply(rule_tac x = "(Suc 0)" in exI, case_tac "hd r", simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2227	apply(auto simp: steps.simps step.simps length_ci_dec)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2228	apply(case_tac r, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2229	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2230
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2231	fun abc_dec_1_stage1:: "config \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2232	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2233	"abc_dec_1_stage1 (s, l, r) ss n =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2234	(if s > ss \<and> s \<le> ss + 2*n + 1 then 4
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2235	else if s = ss + 2 * n + 13 \<or> s = ss + 2*n + 14 then 3
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2236	else if s = ss + 2*n + 15 then 2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2237	else 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2238
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2239	fun abc_dec_1_stage2:: "config \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2240	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2241	"abc_dec_1_stage2 (s, l, r) ss n =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2242	(if s \<le> ss + 2 * n + 1 then (ss + 2 * n + 16 - s)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2243	else if s = ss + 2*n + 13 then length l
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2244	else if s = ss + 2*n + 14 then length l
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2245	else 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2246
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2247	fun abc_dec_1_stage3 :: "config \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2248	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2249	"abc_dec_1_stage3 (s, l, r) ss n =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2250	(if s \<le> ss + 2*n + 1 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2251	if (s - ss) mod 2 = 0 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2252	if r \<noteq> [] \<and> hd r = Oc then 0 else 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2253	else length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2254	else if s = ss + 2 * n + 13 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2255	if r \<noteq> [] \<and> hd r = Oc then 2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2256	else 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2257	else if s = ss + 2 * n + 14 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2258	if r \<noteq> [] \<and> hd r = Oc then 3 else 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2259	else 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2260
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2261	fun abc_dec_1_measure :: "(config \<times> nat \<times> nat) \<Rightarrow> (nat \<times> nat \<times> nat)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2262	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2263	"abc_dec_1_measure (c, ss, n) = (abc_dec_1_stage1 c ss n,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2264	abc_dec_1_stage2 c ss n, abc_dec_1_stage3 c ss n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2265
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2266	definition abc_dec_1_LE ::
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2267	"((config \<times> nat \<times>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2268	nat) \<times> (config \<times> nat \<times> nat)) set"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2269	where "abc_dec_1_LE \<equiv> (inv_image lex_triple abc_dec_1_measure)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2270
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2271	lemma wf_dec_le: "wf abc_dec_1_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2272	by(auto intro:wf_inv_image simp:abc_dec_1_LE_def lex_triple_def lex_pair_def)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2273
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2274	lemma startof_Suc2:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2275	"abc_fetch as ap = Some (Dec n e) \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2276	start_of (layout_of ap) (Suc as) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2277	start_of (layout_of ap) as + 2 * n + 16"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2278	apply(auto simp: start_of.simps layout_of.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2279	length_of.simps abc_fetch.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2280	take_Suc_conv_app_nth split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2281	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2282
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2283	lemma start_of_less_2:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2284	"start_of ly e \<le> start_of ly (Suc e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2285	apply(case_tac "e < length ly")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2286	apply(auto simp: start_of.simps take_Suc take_Suc_conv_app_nth)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2287	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2288
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2289	lemma start_of_less_1: "start_of ly e \<le> start_of ly (e + d)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2290	proof(induct d)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2291	case 0 thus "?case" by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2292	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2293	case (Suc d)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2294	have "start_of ly e \<le> start_of ly (e + d)" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2295	moreover have "start_of ly (e + d) \<le> start_of ly (Suc (e + d))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2296	by(rule_tac start_of_less_2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2297	ultimately show"?case"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2298	by(simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2299	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2300
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2301	lemma start_of_less:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2302	assumes "e < as"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2303	shows "start_of ly e \<le> start_of ly as"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2304	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2305	obtain d where " as = e + d"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2306	using assms by (metis less_imp_add_positive)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2307	thus "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2308	by(simp add: start_of_less_1)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2309	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2310
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2311	lemma start_of_ge:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2312	assumes fetch: "abc_fetch as ap = Some (Dec n e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2313	and layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2314	and great: "e > as"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2315	shows "start_of ly e \<ge> start_of ly as + 2*n + 16"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2316	proof(cases "e = Suc as")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2317	case True
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2318	have "e = Suc as" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2319	moreover hence "start_of ly (Suc as) = start_of ly as + 2*n + 16"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2320	using layout fetch
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2321	by(simp add: startof_Suc2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2322	ultimately show "?thesis" by (simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2323	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2324	case False
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2325	have "e \<noteq> Suc as" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2326	then have "e > Suc as" using great by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2327	then have "start_of ly (Suc as) \<le> start_of ly e"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2328	by(simp add: start_of_less)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2329	moreover have "start_of ly (Suc as) = start_of ly as + 2*n + 16"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2330	using layout fetch
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2331	by(simp add: startof_Suc2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2332	ultimately show "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2333	by arith
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2334	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2335
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2336	lemma [elim]: "\<lbrakk>abc_fetch as ap = Some (Dec n e); as < e;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2337	Suc (start_of (layout_of ap) as + 2 * n) = start_of (layout_of ap) e\<rbrakk> \<Longrightarrow> RR"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2338	apply(drule_tac start_of_ge, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2339	apply(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2340	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2341
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2342	lemma [elim]: "\<lbrakk>abc_fetch as ap = Some (Dec n e); as > e;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2343	Suc (start_of (layout_of ap) as + 2 * n) = start_of (layout_of ap) e\<rbrakk> \<Longrightarrow> RR"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2344	apply(drule_tac ly = "layout_of ap" in start_of_less[of])
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2345	apply(arith)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2346	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2347
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2348	lemma [elim]: "\<lbrakk>abc_fetch as ap = Some (Dec n e);
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2349	Suc (start_of (layout_of ap) as + 2 * n) = start_of (layout_of ap) e\<rbrakk> \<Longrightarrow> RR"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2350	apply(subgoal_tac "as = e \<or> as < e \<or> as > e", auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2351	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2352
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2353	lemma [simp]:"fetch (ci (ly) (start_of ly as) (Dec n e)) (Suc (2 * n)) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2354	= (R, start_of ly as + 2*n + 1)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2355	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2356	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2357	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2358
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2359	lemma [simp]: "(start_of ly as = 0) = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2360	apply(simp add: start_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2361	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2362
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2363	lemma [simp]: "fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2364	(start_of ly as) (Dec n e)) (Suc (2 * n)) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2365	= (W1, start_of ly as + 2*n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2366	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2367	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2368	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2369
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2370	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2371	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2372	(start_of ly as) (Dec n e)) (Suc (Suc (2 * n))) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2373	= (R, start_of ly as + 2*n + 2)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2374	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2375	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2376	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2377
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2378
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2379	lemma [simp]: "fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2380	(start_of ly as) (Dec n e)) (Suc (Suc (2 * n))) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2381	= (L, start_of ly as + 2*n + 13)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2382	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2383	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2384	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2385
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2386
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2387	lemma [simp]: "fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2388	(start_of ly as) (Dec n e)) (Suc (Suc (Suc (2 * n)))) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2389	= (R, start_of ly as + 2*n + 2)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2390	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2391	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2392	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2393
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2394
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2395	lemma [simp]: "fetch (ci (ly) (start_of ly as) (Dec n e))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2396	(Suc (Suc (Suc (2 * n)))) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2397	= (L, start_of ly as + 2*n + 3)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2398	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2399	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2400	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2401
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2402	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2403	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2404	(start_of ly as) (Dec n e)) (2 * n + 4) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2405	= (W0, start_of ly as + 2*n + 3)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2406	apply(subgoal_tac "2n + 4 = Suc (2n + 3)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2407	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2408	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2409	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2410
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2411	lemma [simp]: "fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2412	(start_of ly as) (Dec n e)) (2 * n + 4) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2413	= (R, start_of ly as + 2*n + 4)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2414	apply(subgoal_tac "2n + 4 = Suc (2n + 3)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2415	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2416	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2417	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2418
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2419	lemma [simp]:"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2420	(start_of ly as) (Dec n e)) (2 * n + 5) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2421	= (R, start_of ly as + 2*n + 5)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2422	apply(subgoal_tac "2n + 5 = Suc (2n + 4)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2423	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2424	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2425	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2426
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2427
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2428	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2429	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2430	(start_of ly as) (Dec n e)) (2 * n + 6) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2431	= (L, start_of ly as + 2*n + 6)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2432	apply(subgoal_tac "2n + 6 = Suc (2n + 5)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2433	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2434	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2435	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2436
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2437	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2438	"fetch (ci (ly) (start_of ly as)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2439	(Dec n e)) (2 * n + 6) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2440	= (L, start_of ly as + 2*n + 7)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2441	apply(subgoal_tac "2n + 6 = Suc (2n + 5)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2442	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2443	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2444	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2445
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2446	lemma [simp]:"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2447	(start_of ly as) (Dec n e)) (2 * n + 7) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2448	= (L, start_of ly as + 2*n + 10)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2449	apply(subgoal_tac "2n + 7 = Suc (2n + 6)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2450	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2451	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2452	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2453
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2454	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2455	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2456	(start_of ly as) (Dec n e)) (2 * n + 8) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2457	= (W1, start_of ly as + 2*n + 7)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2458	apply(subgoal_tac "2n + 8 = Suc (2n + 7)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2459	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2460	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2461	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2462
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2463
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2464	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2465	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2466	(start_of ly as) (Dec n e)) (2 * n + 8) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2467	= (R, start_of ly as + 2*n + 8)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2468	apply(subgoal_tac "2n + 8 = Suc (2n + 7)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2469	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2470	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2471	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2472
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2473	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2474	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2475	(start_of ly as) (Dec n e)) (2 * n + 9) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2476	= (L, start_of ly as + 2*n + 9)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2477	apply(subgoal_tac "2n + 9 = Suc (2n + 8)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2478	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2479	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2480	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2481
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2482	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2483	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2484	(start_of ly as) (Dec n e)) (2 * n + 9) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2485	= (R, start_of ly as + 2*n + 8)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2486	apply(subgoal_tac "2n + 9 = Suc (2n + 8)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2487	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2488	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2489	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2490
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2491
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2492	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2493	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2494	(start_of ly as) (Dec n e)) (2 * n + 10) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2495	= (R, start_of ly as + 2*n + 4)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2496	apply(subgoal_tac "2n + 10 = Suc (2n + 9)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2497	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2498	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2499	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2500
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2501	lemma [simp]: "fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2502	(start_of ly as) (Dec n e)) (2 * n + 10) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2503	= (W0, start_of ly as + 2*n + 9)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2504	apply(subgoal_tac "2n + 10 = Suc (2n + 9)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2505	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2506	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2507	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2508
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2509
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2510	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2511	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2512	(start_of ly as) (Dec n e)) (2 * n + 11) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2513	= (L, start_of ly as + 2*n + 10)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2514	apply(subgoal_tac "2n + 11 = Suc (2n + 10)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2515	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2516	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2517	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2518
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2519
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2520	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2521	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2522	(start_of ly as) (Dec n e)) (2 * n + 11) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2523	= (L, start_of ly as + 2*n + 11)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2524	apply(subgoal_tac "2n + 11 = Suc (2n + 10)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2525	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2526	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2527	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2528
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2529	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2530	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2531	(start_of ly as) (Dec n e)) (2 * n + 12) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2532	= (L, start_of ly as + 2*n + 10)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2533	apply(subgoal_tac "2n + 12 = Suc (2n + 11)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2534	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2535	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2536	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2537
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2538
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2539	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2540	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2541	(start_of ly as) (Dec n e)) (2 * n + 12) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2542	= (R, start_of ly as + 2*n + 12)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2543	apply(subgoal_tac "2n + 12 = Suc (2n + 11)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2544	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2545	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2546	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2547
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2548	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2549	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2550	(start_of ly as) (Dec n e)) (2 * n + 13) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2551	= (R, start_of ly as + 2*n + 16)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2552	apply(subgoal_tac "2n + 13 = Suc (2n + 12)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2553	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2554	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2555	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2556
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2557
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2558	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2559	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2560	(start_of ly as) (Dec n e)) (14 + 2 * n) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2561	= (L, start_of ly as + 2*n + 13)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2562	apply(subgoal_tac "14 + 2n = Suc (2n + 13)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2563	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2564	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2565	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2566
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2567	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2568	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2569	(start_of ly as) (Dec n e)) (14 + 2 * n) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2570	= (L, start_of ly as + 2*n + 14)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2571	apply(subgoal_tac "14 + 2n = Suc (2n + 13)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2572	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2573	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2574	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2575
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2576	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2577	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2578	(start_of ly as) (Dec n e)) (15 + 2 * n) Oc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2579	= (L, start_of ly as + 2*n + 13)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2580	apply(subgoal_tac "15 + 2n = Suc (2n + 14)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2581	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2582	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2583	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2584
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2585	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2586	"fetch (ci (ly)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2587	(start_of ly as) (Dec n e)) (15 + 2 * n) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2588	= (R, start_of ly as + 2*n + 15)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2589	apply(subgoal_tac "15 + 2n = Suc (2n + 14)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2590	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2591	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2592	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2593
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2594	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2595	"abc_fetch as aprog = Some (Dec n e) \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2596	fetch (ci (ly) (start_of (ly) as)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2597	(Dec n e)) (16 + 2 * n) Bk
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2598	= (R, start_of (ly) e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2599	apply(subgoal_tac "16 + 2n = Suc (2n + 15)", simp only: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2600	apply(auto simp: ci.simps findnth.simps fetch.simps
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	2601	nth_of.simps shift.simps nth_append tdec_b_def length_findnth adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2602	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2603
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2604	declare dec_inv_1.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2605
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2606
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2607	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2608	"\<lbrakk>abc_fetch as aprog = Some (Dec n e); ly = layout_of aprog\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2609	\<Longrightarrow> (start_of ly e \<noteq> Suc (start_of ly as + 2 * n) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2610	start_of ly e \<noteq> Suc (Suc (start_of ly as + 2 * n)) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2611	start_of ly e \<noteq> start_of ly as + 2 * n + 3 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2612	start_of ly e \<noteq> start_of ly as + 2 * n + 4 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2613	start_of ly e \<noteq> start_of ly as + 2 * n + 5 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2614	start_of ly e \<noteq> start_of ly as + 2 * n + 6 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2615	start_of ly e \<noteq> start_of ly as + 2 * n + 7 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2616	start_of ly e \<noteq> start_of ly as + 2 * n + 8 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2617	start_of ly e \<noteq> start_of ly as + 2 * n + 9 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2618	start_of ly e \<noteq> start_of ly as + 2 * n + 10 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2619	start_of ly e \<noteq> start_of ly as + 2 * n + 11 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2620	start_of ly e \<noteq> start_of ly as + 2 * n + 12 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2621	start_of ly e \<noteq> start_of ly as + 2 * n + 13 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2622	start_of ly e \<noteq> start_of ly as + 2 * n + 14 \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2623	start_of ly e \<noteq> start_of ly as + 2 * n + 15)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2624	using start_of_ge[of as aprog n e ly] start_of_less[of e as ly]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2625	apply(case_tac "e < as", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2626	apply(case_tac "e = as", simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2627	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2628
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2629	lemma [simp]: "\<lbrakk>abc_fetch as aprog = Some (Dec n e); ly = layout_of aprog\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2630	\<Longrightarrow> (Suc (start_of ly as + 2 * n) \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2631	Suc (Suc (start_of ly as + 2 * n)) \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2632	start_of ly as + 2 * n + 3 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2633	start_of ly as + 2 * n + 4 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2634	start_of ly as + 2 * n + 5 \<noteq>start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2635	start_of ly as + 2 * n + 6 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2636	start_of ly as + 2 * n + 7 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2637	start_of ly as + 2 * n + 8 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2638	start_of ly as + 2 * n + 9 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2639	start_of ly as + 2 * n + 10 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2640	start_of ly as + 2 * n + 11 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2641	start_of ly as + 2 * n + 12 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2642	start_of ly as + 2 * n + 13 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2643	start_of ly as + 2 * n + 14 \<noteq> start_of ly e \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2644	start_of ly as + 2 * n + 15 \<noteq> start_of ly e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2645	using start_of_ge[of as aprog n e ly] start_of_less[of e as ly]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2646	apply(case_tac "e < as", simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2647	apply(case_tac "e = as", simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2648	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2649
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2650	lemma [simp]: "inv_locate_b (as, lm) (n, [], []) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2651	apply(auto simp: inv_locate_b.simps in_middle.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2652	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2653
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2654	lemma [simp]: "inv_locate_b (as, lm) (n, [], Bk # list) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2655	apply(auto simp: inv_locate_b.simps in_middle.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2656	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2657
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2658	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2659	"\<lbrakk>dec_first_on_right_moving n (as, am) (s, aaa, Oc # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2660	\<Longrightarrow> dec_first_on_right_moving n (as, am) (s', Oc # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2661	apply(simp only: dec_first_on_right_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2662	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2663	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2664	rule_tac x = m in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2665	apply(rule_tac x = "Suc ml" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2666	rule_tac x = "mr - 1" in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2667	apply(case_tac [!] mr, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2668	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2669
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2670	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2671	"dec_first_on_right_moving n (as, am) (s, l, Bk # xs) ires \<Longrightarrow> l \<noteq> []"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2672	apply(auto simp: dec_first_on_right_moving.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2673	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2674
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2675	lemma [elim]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2676	"\<lbrakk>\<not> length lm1 < length am;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2677	am @ replicate (length lm1 - length am) 0 @ [0::nat] =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2678	lm1 @ m # lm2;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2679	0 < m\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2680	\<Longrightarrow> RR"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2681	apply(subgoal_tac "lm2 = []", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2682	apply(drule_tac length_equal, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2683	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2684
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2685	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2686	"\<lbrakk>dec_first_on_right_moving n (as,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2687	abc_lm_s am n (abc_lm_v am n)) (s, l, Bk # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2688	\<Longrightarrow> dec_after_clear (as, abc_lm_s am n
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2689	(abc_lm_v am n - Suc 0)) (s', tl l, hd l # Bk # xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2690	apply(simp only: dec_first_on_right_moving.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2691	dec_after_clear.simps abc_lm_s.simps abc_lm_v.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2692	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2693	apply(case_tac "n < length am")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2694	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2695	rule_tac x = "m - 1" in exI, auto simp: )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2696	apply(case_tac [!] mr, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2697	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2698
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2699	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2700	"\<lbrakk>dec_first_on_right_moving n (as,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2701	abc_lm_s am n (abc_lm_v am n)) (s, l, []) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2702	\<Longrightarrow> (l = [] \<longrightarrow> dec_after_clear (as,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2703	abc_lm_s am n (abc_lm_v am n - Suc 0)) (s', [], [Bk]) ires) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2704	(l \<noteq> [] \<longrightarrow> dec_after_clear (as, abc_lm_s am n
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2705	(abc_lm_v am n - Suc 0)) (s', tl l, [hd l]) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2706	apply(subgoal_tac "l \<noteq> []",
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2707	simp only: dec_first_on_right_moving.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2708	dec_after_clear.simps abc_lm_s.simps abc_lm_v.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2709	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2710	apply(case_tac "n < length am", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2711	apply(rule_tac x = lm1 in exI, rule_tac x = "m - 1" in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2712	apply(case_tac [1-2] m, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2713	apply(auto simp: dec_first_on_right_moving.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2714	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2715
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2716	lemma [simp]: "\<lbrakk>dec_after_clear (as, am) (s, l, Oc # r) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2717	\<Longrightarrow> dec_after_clear (as, am) (s', l, Bk # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2718	apply(auto simp: dec_after_clear.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2719	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2720
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2721	lemma [simp]: "\<lbrakk>dec_after_clear (as, am) (s, l, Bk # r) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2722	\<Longrightarrow> dec_right_move (as, am) (s', Bk # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2723	apply(auto simp: dec_after_clear.simps dec_right_move.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2724	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2725
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2726	lemma [simp]: "\<lbrakk>dec_after_clear (as, am) (s, l, []) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2727	\<Longrightarrow> dec_right_move (as, am) (s', Bk # l, []) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2728	apply(auto simp: dec_after_clear.simps dec_right_move.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2729	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2730
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2731	lemma [simp]: "\<lbrakk>dec_after_clear (as, am) (s, l, []) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2732	\<Longrightarrow> dec_right_move (as, am) (s', Bk # l, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2733	apply(auto simp: dec_after_clear.simps dec_right_move.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2734	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2735
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2736	lemma [simp]:"dec_right_move (as, am) (s, l, Oc # r) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2737	apply(auto simp: dec_right_move.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2738	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2739
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2740	lemma dec_right_move_2_check_right_move[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2741	"\<lbrakk>dec_right_move (as, am) (s, l, Bk # r) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2742	\<Longrightarrow> dec_check_right_move (as, am) (s', Bk # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2743	apply(auto simp: dec_right_move.simps dec_check_right_move.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2744	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2745
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2746	lemma [simp]: "(<lm::nat list> = []) = (lm = [])"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2747	apply(case_tac lm, simp_all add: tape_of_nl_cons)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2748	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2749
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2750	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2751	"dec_right_move (as, am) (s, l, []) ires=
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2752	dec_right_move (as, am) (s, l, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2753	apply(simp add: dec_right_move.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2754	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2755
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2756	lemma [simp]: "\<lbrakk>dec_right_move (as, am) (s, l, []) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2757	\<Longrightarrow> dec_check_right_move (as, am) (s, Bk # l, []) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2758	apply(insert dec_right_move_2_check_right_move[of as am s l "[]" s'],
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2759	simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2760	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2761
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2762	lemma [simp]: "dec_check_right_move (as, am) (s, l, r) ires\<Longrightarrow> l \<noteq> []"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2763	apply(auto simp: dec_check_right_move.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2764	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2765
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2766	lemma [simp]: "\<lbrakk>dec_check_right_move (as, am) (s, l, Oc # r) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2767	\<Longrightarrow> dec_after_write (as, am) (s', tl l, hd l # Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2768	apply(auto simp: dec_check_right_move.simps dec_after_write.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2769	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2770	rule_tac x = m in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2771	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2772
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2773
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2774
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2775	lemma [simp]: "\<lbrakk>dec_check_right_move (as, am) (s, l, Bk # r) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2776	\<Longrightarrow> dec_left_move (as, am) (s', tl l, hd l # Bk # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2777	apply(auto simp: dec_check_right_move.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2778	dec_left_move.simps inv_after_move.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2779	apply(rule_tac x = lm1 in exI, rule_tac x = m in exI, auto split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2780	apply(case_tac [!] lm2, simp_all add: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2781	apply(rule_tac [!] x = "(Suc rn)" in exI, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2782	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2783
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2784	lemma [simp]: "\<lbrakk>dec_check_right_move (as, am) (s, l, []) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2785	\<Longrightarrow> dec_left_move (as, am) (s', tl l, [hd l]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2786	apply(auto simp: dec_check_right_move.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2787	dec_left_move.simps inv_after_move.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2788	apply(rule_tac x = lm1 in exI, rule_tac x = m in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2789	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2790
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2791	lemma [simp]: "dec_left_move (as, am) (s, aaa, Oc # xs) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2792	apply(auto simp: dec_left_move.simps inv_after_move.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2793	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2794
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2795	lemma [simp]: "dec_left_move (as, am) (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2796	\<Longrightarrow> l \<noteq> []"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2797	apply(auto simp: dec_left_move.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2798	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2799
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2800	lemma [simp]: "inv_on_left_moving_in_middle_B (as, [m])
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2801	(s', Oc # Oc\<up>m @ Bk # Bk # ires, Bk # Bk\<up>rn) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2802	apply(simp add: inv_on_left_moving_in_middle_B.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2803	apply(rule_tac x = "[m]" in exI, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2804	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2805
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2806	lemma [simp]: "inv_on_left_moving_in_middle_B (as, [m])
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2807	(s', Oc # Oc\<up>m @ Bk # Bk # ires, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2808	apply(simp add: inv_on_left_moving_in_middle_B.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2809	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2810
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2811
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2812	lemma [simp]: "lm1 \<noteq> [] \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2813	inv_on_left_moving_in_middle_B (as, lm1 @ [m]) (s',
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2814	Oc # Oc\<up>m @ Bk # <rev lm1> @ Bk # Bk # ires, Bk # Bk\<up>rn) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2815	apply(simp only: inv_on_left_moving_in_middle_B.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2816	apply(rule_tac x = "lm1 @ [m ]" in exI, rule_tac x = "[]" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2817	apply(simp add: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2818	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2819
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2820	lemma [simp]: "lm1 \<noteq> [] \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2821	inv_on_left_moving_in_middle_B (as, lm1 @ [m]) (s',
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2822	Oc # Oc\<up> m @ Bk # <rev lm1> @ Bk # Bk # ires, [Bk]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2823	apply(simp only: inv_on_left_moving_in_middle_B.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2824	apply(rule_tac x = "lm1 @ [m ]" in exI, rule_tac x = "[]" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2825	apply(simp add: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2826	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2827
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2828	lemma [simp]: "dec_left_move (as, am) (s, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2829	\<Longrightarrow> inv_on_left_moving (as, am) (s', tl l, hd l # Bk # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2830	apply(auto simp: dec_left_move.simps inv_on_left_moving.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2831	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2832
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2833	lemma [simp]: "dec_left_move (as, am) (s, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2834	\<Longrightarrow> inv_on_left_moving (as, am) (s', tl l, [hd l]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2835	apply(auto simp: dec_left_move.simps inv_on_left_moving.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2836	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2837
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2838	lemma [simp]: "dec_after_write (as, am) (s, l, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2839	\<Longrightarrow> dec_on_right_moving (as, am) (s', Oc # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2840	apply(auto simp: dec_after_write.simps dec_on_right_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2841	apply(rule_tac x = "lm1 @ [m]" in exI, rule_tac x = "tl lm2" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2842	rule_tac x = "hd lm2" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2843	apply(rule_tac x = "Suc 0" in exI,rule_tac x = "Suc (hd lm2)" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2844	apply(case_tac lm2, auto split: if_splits simp: tape_of_nl_cons)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2845	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2846
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2847	lemma [simp]: "dec_after_write (as, am) (s, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2848	\<Longrightarrow> dec_after_write (as, am) (s', l, Oc # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2849	apply(auto simp: dec_after_write.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2850	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2851
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2852	lemma [simp]: "dec_after_write (as, am) (s, aaa, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2853	\<Longrightarrow> dec_after_write (as, am) (s', aaa, [Oc]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2854	apply(auto simp: dec_after_write.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2855	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2856
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2857	lemma [simp]: "dec_on_right_moving (as, am) (s, l, Oc # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2858	\<Longrightarrow> dec_on_right_moving (as, am) (s', Oc # l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2859	apply(simp only: dec_on_right_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2860	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2861	apply(erule conjE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2862	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2863	rule_tac x = "m" in exI, rule_tac x = "Suc ml" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2864	rule_tac x = "mr - 1" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2865	apply(case_tac mr, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2866	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2867
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2868	lemma [simp]: "dec_on_right_moving (as, am) (s, l, r) ires\<Longrightarrow> l \<noteq> []"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2869	apply(auto simp: dec_on_right_moving.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2870	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2871
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2872	lemma [simp]: "dec_on_right_moving (as, am) (s, l, Bk # r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2873	\<Longrightarrow> dec_after_clear (as, am) (s', tl l, hd l # Bk # r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2874	apply(auto simp: dec_on_right_moving.simps dec_after_clear.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2875	apply(case_tac [!] mr, auto split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2876	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2877
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2878	lemma [simp]: "dec_on_right_moving (as, am) (s, l, []) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2879	\<Longrightarrow> dec_after_clear (as, am) (s', tl l, [hd l]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2880	apply(auto simp: dec_on_right_moving.simps dec_after_clear.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2881	apply(simp_all split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2882	apply(rule_tac x = lm1 in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2883	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2884
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2885	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2886	"inv_stop (as, abc_lm_s am n (abc_lm_v am n)) (s, l, r) ires \<Longrightarrow> l \<noteq> []"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2887	apply(auto simp: inv_stop.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2888	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2889
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2890	lemma dec_false_1[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2891	"\<lbrakk>abc_lm_v am n = 0; inv_locate_b (as, am) (n, aaa, Oc # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2892	\<Longrightarrow> False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2893	apply(auto simp: inv_locate_b.simps in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2894	apply(case_tac "length lm1 \<ge> length am", auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2895	apply(subgoal_tac "lm2 = []", simp, subgoal_tac "m = 0", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2896	apply(case_tac mr, auto simp: )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2897	apply(subgoal_tac "Suc (length lm1) - length am =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2898	Suc (length lm1 - length am)",
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2899	simp add: exp_ind del: replicate.simps, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2900	apply(drule_tac xs = "am @ replicate (Suc (length lm1) - length am) 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2901	and ys = "lm1 @ m # lm2" in length_equal, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2902	apply(case_tac mr, auto simp: abc_lm_v.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2903	apply(case_tac "mr = 0", simp_all split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2904	apply(subgoal_tac "Suc (length lm1) - length am =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2905	Suc (length lm1 - length am)",
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2906	simp add: exp_ind del: replicate.simps, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2907	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2908
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2909	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2910	"\<lbrakk>inv_locate_b (as, am) (n, aaa, Bk # xs) ires;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2911	abc_lm_v am n = 0\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2912	\<Longrightarrow> inv_on_left_moving (as, abc_lm_s am n 0)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2913	(s, tl aaa, hd aaa # Bk # xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2914	apply(simp add: inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2915	apply(simp only: inv_locate_b.simps in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2916	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2917	apply(simp add: inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2918	apply(subgoal_tac "\<not> inv_on_left_moving_in_middle_B
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2919	(as, abc_lm_s am n 0) (s, tl aaa, hd aaa # Bk # xs) ires", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2920	apply(simp only: inv_on_left_moving_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2921	apply(erule_tac conjE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2922	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2923	rule_tac x = m in exI, rule_tac x = m in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2924	rule_tac x = "Suc 0" in exI, simp add: abc_lm_s.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2925	apply(case_tac mr, simp_all, auto simp: abc_lm_v.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2926	apply(simp only: exp_ind[THEN sym] replicate_Suc Nat.Suc_diff_le)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2927	apply(auto simp: inv_on_left_moving_in_middle_B.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2928	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2929
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2930
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2931	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2932	"\<lbrakk>abc_lm_v am n = 0; inv_locate_b (as, am) (n, aaa, []) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2933	\<Longrightarrow> inv_on_left_moving (as, abc_lm_s am n 0) (s, tl aaa, [hd aaa]) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2934	apply(simp add: inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2935	apply(simp only: inv_locate_b.simps in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2936	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2937	apply(simp add: inv_on_left_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2938	apply(subgoal_tac "\<not> inv_on_left_moving_in_middle_B
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2939	(as, abc_lm_s am n 0) (s, tl aaa, [hd aaa]) ires", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2940	apply(simp only: inv_on_left_moving_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2941	apply(erule_tac conjE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2942	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2943	rule_tac x = m in exI, rule_tac x = m in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2944	rule_tac x = "Suc 0" in exI, simp add: abc_lm_s.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2945	apply(case_tac mr, simp_all, auto simp: abc_lm_v.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2946	apply(simp_all only: exp_ind Nat.Suc_diff_le del: replicate_Suc, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2947	apply(auto simp: inv_on_left_moving_in_middle_B.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2948	apply(case_tac [!] m, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2949	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2950
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2951	lemma [simp]: "\<lbrakk>am ! n = (0::nat); n < length am\<rbrakk> \<Longrightarrow> am[n := 0] = am"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2952	apply(simp add: list_update_same_conv)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2953	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2954
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2955	lemma [intro]: "\<lbrakk>abc_lm_v (a # list) 0 = 0\<rbrakk> \<Longrightarrow> a = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2956	apply(simp add: abc_lm_v.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2957	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2958
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2959	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2960	"inv_stop (as, abc_lm_s am n 0)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2961	(start_of (layout_of aprog) e, aaa, Oc # xs) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2962	\<Longrightarrow> inv_locate_a (as, abc_lm_s am n 0) (0, aaa, Oc # xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2963	apply(simp add: inv_locate_a.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2964	apply(rule disjI1)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2965	apply(auto simp: inv_stop.simps at_begin_norm.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2966	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2967
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2968	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2969	"\<lbrakk>inv_stop (as, abc_lm_s am n 0)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2970	(start_of (layout_of aprog) e, aaa, Oc # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2971	\<Longrightarrow> inv_locate_b (as, am) (0, Oc # aaa, xs) ires \<or>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2972	inv_locate_b (as, abc_lm_s am n 0) (0, Oc # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2973	apply(simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2974	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2975
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2976	lemma dec_false2:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2977	"inv_stop (as, abc_lm_s am n 0)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2978	(start_of (layout_of aprog) e, aaa, Bk # xs) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2979	apply(auto simp: inv_stop.simps abc_lm_s.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2980	apply(case_tac [!] am, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2981	apply(case_tac [!] n, auto simp: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2982	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2983
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2984	lemma dec_false3:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2985	"inv_stop (as, abc_lm_s am n 0)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2986	(start_of (layout_of aprog) e, aaa, []) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2987	apply(auto simp: inv_stop.simps abc_lm_s.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2988	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2989
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2990	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2991	"fetch (ci (layout_of aprog)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2992	(start_of (layout_of aprog) as) (Dec n e)) 0 b = (Nop, 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2993	by(simp add: fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2994
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2995	declare dec_inv_1.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2996
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2997	declare inv_locate_n_b.simps [simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2998
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	2999	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3000	"\<lbrakk>0 < abc_lm_v am n; 0 < n;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3001	at_begin_fst_bwtn (as, am) (n, aaa, Oc # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3002	\<Longrightarrow> inv_locate_n_b (as, am) (n, Oc # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3003	apply(simp add: at_begin_fst_bwtn.simps inv_locate_n_b.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3004	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3005
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3006	lemma Suc_minus:"length am + tn = n
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3007	\<Longrightarrow> Suc tn = Suc n - length am "
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3008	apply(arith)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3009	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3010
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3011	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3012	"\<lbrakk>0 < abc_lm_v am n; 0 < n;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3013	at_begin_fst_awtn (as, am) (n, aaa, Oc # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3014	\<Longrightarrow> inv_locate_n_b (as, am) (n, Oc # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3015	apply(simp only: at_begin_fst_awtn.simps inv_locate_n_b.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3016	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3017	apply(erule conjE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3018	apply(rule_tac x = lm1 in exI, rule_tac x = "[]" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3019	rule_tac x = "Suc tn" in exI, rule_tac x = 0 in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3020	apply(simp add: exp_ind del: replicate.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3021	apply(rule conjI)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3022	apply(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3023	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3024
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3025	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3026	"\<lbrakk>inv_locate_n_b (as, am) (n, aaa, Oc # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3027	\<Longrightarrow> dec_first_on_right_moving n (as, abc_lm_s am n (abc_lm_v am n))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3028	(s, Oc # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3029	apply(auto simp: inv_locate_n_b.simps dec_first_on_right_moving.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3030	abc_lm_s.simps abc_lm_v.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3031	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3032	rule_tac x = m in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3033	apply(rule_tac x = "Suc (Suc 0)" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3034	rule_tac x = "m - 1" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3035	apply(case_tac m, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3036	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3037	rule_tac x = m in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3038	simp add: Suc_diff_le exp_ind del: replicate.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3039	apply(rule_tac x = "Suc (Suc 0)" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3040	rule_tac x = "m - 1" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3041	apply(case_tac m, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3042	apply(rule_tac x = lm1 in exI, rule_tac x = "[]" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3043	rule_tac x = m in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3044	apply(rule_tac x = "Suc (Suc 0)" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3045	rule_tac x = "m - 1" in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3046	apply(case_tac m, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3047	apply(rule_tac x = lm1 in exI, rule_tac x = lm2 in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3048	rule_tac x = m in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3049	simp add: Suc_diff_le exp_ind del: replicate.simps, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3050	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3051
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3052	lemma [simp]: "inv_on_left_moving (as, am) (s, [], r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3053	= False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3054	apply(simp add: inv_on_left_moving.simps inv_on_left_moving_norm.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3055	inv_on_left_moving_in_middle_B.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3056	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3057
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3058	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3059	"inv_check_left_moving (as, abc_lm_s am n 0)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3060	(start_of (layout_of aprog) as + 2 * n + 14, [], Oc # xs) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3061	= False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3062	apply(simp add: inv_check_left_moving.simps inv_check_left_moving_in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3063	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3064
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3065	lemma [simp]: "inv_check_left_moving (as, abc_lm_s lm n (abc_lm_v lm n)) (s, [], Oc # list) ires = False"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3066	apply(simp add: inv_check_left_moving.simps inv_check_left_moving_in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3067	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3068
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3069	lemma [elim]: "\<lbrakk>abc_fetch as ap = Some (Dec n e);
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3070	start_of (layout_of ap) as < start_of (layout_of ap) e;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3071	start_of (layout_of ap) e \<le> Suc (start_of (layout_of ap) as + 2 * n)\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3072	\<Longrightarrow> RR"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3073	using start_of_less[of e as "layout_of ap"] start_of_ge[of as ap n e "layout_of ap"]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3074	apply(case_tac "as < e", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3075	apply(case_tac "as = e", simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3076	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3077
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3078	lemma crsp_step_dec_b_e_pre':
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3079	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3080	and inv_start: "inv_locate_b (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3081	and fetch: "abc_fetch as ap = Some (Dec n e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3082	and dec_0: "abc_lm_v lm n = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3083	and f: "f = (\<lambda> stp. (steps (Suc (start_of ly as) + 2 * n, la, ra) (ci ly (start_of ly as) (Dec n e),
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3084	start_of ly as - Suc 0) stp, start_of ly as, n))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3085	and P: "P = (\<lambda> ((s, l, r), ss, x). s = start_of ly e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3086	and Q: "Q = (\<lambda> ((s, l, r), ss, x). dec_inv_1 ly x e (as, lm) (s, l, r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3087	shows "\<exists> stp. P (f stp) \<and> Q (f stp)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3088	proof(rule_tac LE = abc_dec_1_LE in halt_lemma2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3089	show "wf abc_dec_1_LE" by(intro wf_dec_le)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3090	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3091	show "Q (f 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3092	using layout fetch
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3093	apply(simp add: f steps.simps Q dec_inv_1.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3094	apply(subgoal_tac "e > as \<or> e = as \<or> e < as")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3095	apply(auto simp: Let_def start_of_ge start_of_less inv_start)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3096	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3097	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3098	show "\<not> P (f 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3099	using layout fetch
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3100	apply(simp add: f steps.simps P)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3101	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3102	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3103	show "\<forall>n. \<not> P (f n) \<and> Q (f n) \<longrightarrow> Q (f (Suc n)) \<and> (f (Suc n), f n) \<in> abc_dec_1_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3104	using fetch
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3105	proof(rule_tac allI, rule_tac impI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3106	fix na
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3107	assume "\<not> P (f na) \<and> Q (f na)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3108	thus "Q (f (Suc na)) \<and> (f (Suc na), f na) \<in> abc_dec_1_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3109	apply(simp add: f)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3110	apply(case_tac "steps (Suc (start_of ly as + 2 * n), la, ra)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3111	(ci ly (start_of ly as) (Dec n e), start_of ly as - Suc 0) na", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3112	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3113	fix a b c
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3114	assume "\<not> P ((a, b, c), start_of ly as, n) \<and> Q ((a, b, c), start_of ly as, n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3115	thus "Q (step (a, b, c) (ci ly (start_of ly as) (Dec n e), start_of ly as - Suc 0), start_of ly as, n) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3116	((step (a, b, c) (ci ly (start_of ly as) (Dec n e), start_of ly as - Suc 0), start_of ly as, n),
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3117	(a, b, c), start_of ly as, n) \<in> abc_dec_1_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3118	apply(simp add: Q)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3119	apply(case_tac c, case_tac [2] aa)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3120	apply(simp_all add: dec_inv_1.simps Let_def split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3121	using fetch layout dec_0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3122	apply(auto simp: step.simps P dec_inv_1.simps Let_def abc_dec_1_LE_def lex_triple_def lex_pair_def)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3123	using dec_0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3124	apply(drule_tac dec_false_1, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3125	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3126	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3127	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3128	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3129
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3130	lemma crsp_step_dec_b_e_pre:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3131	assumes "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3132	and inv_start: "inv_locate_b (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3133	and dec_0: "abc_lm_v lm n = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3134	and fetch: "abc_fetch as ap = Some (Dec n e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3135	shows "\<exists>stp lb rb.
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3136	steps (Suc (start_of ly as) + 2 * n, la, ra) (ci ly (start_of ly as) (Dec n e),
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3137	start_of ly as - Suc 0) stp = (start_of ly e, lb, rb) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3138	dec_inv_1 ly n e (as, lm) (start_of ly e, lb, rb) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3139	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3140	apply(drule_tac crsp_step_dec_b_e_pre', auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3141	apply(rule_tac x = stp in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3142	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3143
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3144	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3145	"\<lbrakk>abc_lm_v lm n = 0;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3146	inv_stop (as, abc_lm_s lm n (abc_lm_v lm n)) (start_of ly e, lb, rb) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3147	\<Longrightarrow> crsp ly (abc_step_l (as, lm) (Some (Dec n e))) (start_of ly e, lb, rb) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3148	apply(auto simp: crsp.simps abc_step_l.simps inv_stop.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3149	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3150
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3151	lemma crsp_step_dec_b_e:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3152	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3153	and inv_start: "inv_locate_a (as, lm) (n, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3154	and dec_0: "abc_lm_v lm n = 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3155	and fetch: "abc_fetch as ap = Some (Dec n e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3156	shows "\<exists>stp > 0. crsp ly (abc_step_l (as, lm) (Some (Dec n e)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3157	(steps (start_of ly as + 2 * n, l, r) (ci ly (start_of ly as) (Dec n e), start_of ly as - Suc 0) stp) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3158	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3159	let ?P = "ci ly (start_of ly as) (Dec n e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3160	let ?off = "start_of ly as - Suc 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3161	have "\<exists> stp la ra. steps (start_of ly as + 2 * n, l, r) (?P, ?off) stp = (Suc (start_of ly as) + 2*n, la, ra)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3162	\<and> inv_locate_b (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3163	using inv_start
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3164	apply(case_tac "r = [] \<or> hd r = Bk", simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3165	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3166	from this obtain stpa la ra where a:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3167	"steps (start_of ly as + 2 * n, l, r) (?P, ?off) stpa = (Suc (start_of ly as) + 2*n, la, ra)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3168	\<and> inv_locate_b (as, lm) (n, la, ra) ires" by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3169	have "\<exists> stp lb rb. steps (Suc (start_of ly as) + 2 * n, la, ra) (?P, ?off) stp = (start_of ly e, lb, rb)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3170	\<and> dec_inv_1 ly n e (as, lm) (start_of ly e, lb, rb) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3171	using assms a
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3172	apply(rule_tac crsp_step_dec_b_e_pre, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3173	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3174	from this obtain stpb lb rb where b:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3175	"steps (Suc (start_of ly as) + 2 * n, la, ra) (?P, ?off) stpb = (start_of ly e, lb, rb)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3176	\<and> dec_inv_1 ly n e (as, lm) (start_of ly e, lb, rb) ires" by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3177	from a b show "\<exists>stp > 0. crsp ly (abc_step_l (as, lm) (Some (Dec n e)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3178	(steps (start_of ly as + 2 * n, l, r) (?P, ?off) stp) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3179	apply(rule_tac x = "stpa + stpb" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3180	apply(simp add: steps_add)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3181	using dec_0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3182	apply(simp add: dec_inv_1.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3183	apply(case_tac stpa, simp_all add: steps.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3184	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3185	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3186
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3187	fun dec_inv_2 :: "layout \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> dec_inv_t"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3188	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3189	"dec_inv_2 ly n e (as, am) (s, l, r) ires =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3190	(let ss = start_of ly as in
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3191	let am' = abc_lm_s am n (abc_lm_v am n - Suc 0) in
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3192	let am'' = abc_lm_s am n (abc_lm_v am n) in
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3193	if s = 0 then False
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3194	else if s = ss + 2 * n then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3195	inv_locate_a (as, am) (n, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3196	else if s = ss + 2 * n + 1 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3197	inv_locate_n_b (as, am) (n, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3198	else if s = ss + 2 * n + 2 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3199	dec_first_on_right_moving n (as, am'') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3200	else if s = ss + 2 * n + 3 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3201	dec_after_clear (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3202	else if s = ss + 2 * n + 4 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3203	dec_right_move (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3204	else if s = ss + 2 * n + 5 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3205	dec_check_right_move (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3206	else if s = ss + 2 * n + 6 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3207	dec_left_move (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3208	else if s = ss + 2 * n + 7 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3209	dec_after_write (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3210	else if s = ss + 2 * n + 8 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3211	dec_on_right_moving (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3212	else if s = ss + 2 * n + 9 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3213	dec_after_clear (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3214	else if s = ss + 2 * n + 10 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3215	inv_on_left_moving (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3216	else if s = ss + 2 * n + 11 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3217	inv_check_left_moving (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3218	else if s = ss + 2 * n + 12 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3219	inv_after_left_moving (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3220	else if s = ss + 2 * n + 16 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3221	inv_stop (as, am') (s, l, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3222	else False)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3223
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3224	declare dec_inv_2.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3225	fun abc_dec_2_stage1 :: "config \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3226	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3227	"abc_dec_2_stage1 (s, l, r) ss n =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3228	(if s \<le> ss + 2*n + 1 then 7
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3229	else if s = ss + 2*n + 2 then 6
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3230	else if s = ss + 2*n + 3 then 5
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3231	else if s \<ge> ss + 2n + 4 \<and> s \<le> ss + 2n + 9 then 4
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3232	else if s = ss + 2*n + 6 then 3
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3233	else if s = ss + 2n + 10 \<or> s = ss + 2n + 11 then 2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3234	else if s = ss + 2*n + 12 then 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3235	else 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3236
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3237	fun abc_dec_2_stage2 :: "config \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3238	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3239	"abc_dec_2_stage2 (s, l, r) ss n =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3240	(if s \<le> ss + 2 * n + 1 then (ss + 2 * n + 16 - s)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3241	else if s = ss + 2*n + 10 then length l
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3242	else if s = ss + 2*n + 11 then length l
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3243	else if s = ss + 2*n + 4 then length r - 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3244	else if s = ss + 2*n + 5 then length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3245	else if s = ss + 2*n + 7 then length r - 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3246	else if s = ss + 2*n + 8 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3247	length r + length (takeWhile (\<lambda> a. a = Oc) l) - 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3248	else if s = ss + 2*n + 9 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3249	length r + length (takeWhile (\<lambda> a. a = Oc) l) - 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3250	else 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3251
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3252	fun abc_dec_2_stage3 :: "config \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3253	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3254	"abc_dec_2_stage3 (s, l, r) ss n =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3255	(if s \<le> ss + 2*n + 1 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3256	if (s - ss) mod 2 = 0 then if r \<noteq> [] \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3257	hd r = Oc then 0 else 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3258	else length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3259	else if s = ss + 2 * n + 10 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3260	if r \<noteq> [] \<and> hd r = Oc then 2
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3261	else 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3262	else if s = ss + 2 * n + 11 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3263	if r \<noteq> [] \<and> hd r = Oc then 3
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3264	else 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3265	else (ss + 2 * n + 16 - s))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3266
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3267	fun abc_dec_2_stage4 :: "config \<Rightarrow> nat \<Rightarrow> nat \<Rightarrow> nat"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3268	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3269	"abc_dec_2_stage4 (s, l, r) ss n =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3270	(if s = ss + 2*n + 2 then length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3271	else if s = ss + 2*n + 8 then length r
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3272	else if s = ss + 2*n + 3 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3273	if r \<noteq> [] \<and> hd r = Oc then 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3274	else 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3275	else if s = ss + 2*n + 7 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3276	if r \<noteq> [] \<and> hd r = Oc then 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3277	else 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3278	else if s = ss + 2*n + 9 then
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3279	if r \<noteq> [] \<and> hd r = Oc then 1
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3280	else 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3281	else 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3282
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3283	fun abc_dec_2_measure :: "(config \<times> nat \<times> nat) \<Rightarrow> (nat \<times> nat \<times> nat \<times> nat)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3284	where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3285	"abc_dec_2_measure (c, ss, n) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3286	(abc_dec_2_stage1 c ss n,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3287	abc_dec_2_stage2 c ss n, abc_dec_2_stage3 c ss n, abc_dec_2_stage4 c ss n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3288
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3289	definition lex_square::
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3290	"((nat \<times> nat \<times> nat \<times> nat) \<times> (nat \<times> nat \<times> nat \<times> nat)) set"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3291	where "lex_square \<equiv> less_than <lex> lex_triple"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3292
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3293	definition abc_dec_2_LE ::
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3294	"((config \<times> nat \<times>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3295	nat) \<times> (config \<times> nat \<times> nat)) set"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3296	where "abc_dec_2_LE \<equiv> (inv_image lex_square abc_dec_2_measure)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3297
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3298	lemma wf_dec2_le: "wf abc_dec_2_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3299	by(auto intro:wf_inv_image simp:abc_dec_2_LE_def lex_square_def lex_triple_def lex_pair_def)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3300
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3301	lemma fix_add: "fetch ap ((x::nat) + 2n) b = fetch ap (2n + x) b"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	3302	using Suc_1 add.commute by metis
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3303
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3304	lemma [elim]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3305	"\<lbrakk>0 < abc_lm_v am n; inv_locate_n_b (as, am) (n, aaa, Bk # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3306	\<Longrightarrow> RR"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3307	apply(auto simp: inv_locate_n_b.simps abc_lm_v.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3308	apply(case_tac [!] m, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3309	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3310
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3311	lemma [elim]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3312	"\<lbrakk>0 < abc_lm_v am n; inv_locate_n_b (as, am)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3313	(n, aaa, []) ires\<rbrakk> \<Longrightarrow> RR"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3314	apply(auto simp: inv_locate_n_b.simps abc_lm_v.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3315	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3316
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3317	lemma [simp]: "dec_after_write (as, am) (s, aa, r) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3318	\<Longrightarrow> takeWhile (\<lambda>a. a = Oc) aa = []"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3319	apply(simp only : dec_after_write.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3320	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3321	apply(erule_tac conjE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3322	apply(case_tac aa, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3323	apply(case_tac a, simp only: takeWhile.simps , simp_all split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3324	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3325
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3326	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3327	"\<lbrakk>dec_on_right_moving (as, lm) (s, aa, []) ires;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3328	length (takeWhile (\<lambda>a. a = Oc) (tl aa))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3329	\<noteq> length (takeWhile (\<lambda>a. a = Oc) aa) - Suc 0\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3330	\<Longrightarrow> length (takeWhile (\<lambda>a. a = Oc) (tl aa)) <
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3331	length (takeWhile (\<lambda>a. a = Oc) aa) - Suc 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3332	apply(simp only: dec_on_right_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3333	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3334	apply(erule_tac conjE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3335	apply(case_tac mr, auto split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3336	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3337
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3338	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3339	"dec_after_clear (as, abc_lm_s am n (abc_lm_v am n - Suc 0))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3340	(start_of (layout_of aprog) as + 2 * n + 9, aa, Bk # xs) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3341	\<Longrightarrow> length xs - Suc 0 < length xs +
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3342	length (takeWhile (\<lambda>a. a = Oc) aa)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3343	apply(simp only: dec_after_clear.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3344	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3345	apply(erule conjE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3346	apply(simp split: if_splits )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3347	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3348
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3349	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3350	"\<lbrakk>dec_after_clear (as, abc_lm_s am n (abc_lm_v am n - Suc 0))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3351	(start_of (layout_of aprog) as + 2 * n + 9, aa, []) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3352	\<Longrightarrow> Suc 0 < length (takeWhile (\<lambda>a. a = Oc) aa)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3353	apply(simp add: dec_after_clear.simps split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3354	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3355
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3356	lemma [elim]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3357	"inv_check_left_moving (as, lm)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3358	(s, [], Oc # xs) ires
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3359	\<Longrightarrow> RR"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3360	apply(simp add: inv_check_left_moving.simps inv_check_left_moving_in_middle.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3361	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3362
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3363	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3364	"\<lbrakk>0 < abc_lm_v am n;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3365	at_begin_norm (as, am) (n, aaa, Oc # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3366	\<Longrightarrow> inv_locate_n_b (as, am) (n, Oc # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3367	apply(simp only: at_begin_norm.simps inv_locate_n_b.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3368	apply(erule_tac exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3369	apply(rule_tac x = lm1 in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3370	apply(case_tac "length lm2", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3371	apply(case_tac "lm2", simp, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3372	apply(case_tac "lm2", auto simp: tape_of_nl_cons split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3373	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3374
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3375	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3376	"\<lbrakk>0 < abc_lm_v am n;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3377	at_begin_fst_awtn (as, am) (n, aaa, Oc # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3378	\<Longrightarrow> inv_locate_n_b (as, am) (n, Oc # aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3379	apply(simp only: at_begin_fst_awtn.simps inv_locate_n_b.simps )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3380	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3381	apply(erule conjE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3382	apply(rule_tac x = lm1 in exI, rule_tac x = "[]" in exI,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3383	rule_tac x = "Suc tn" in exI, rule_tac x = 0 in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3384	apply(simp add: exp_ind del: replicate.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3385	apply(rule conjI)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3386	apply(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3387	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3388
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3389	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3390	"\<lbrakk>0 < abc_lm_v am n; inv_locate_a (as, am) (n, aaa, Oc # xs) ires\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3391	\<Longrightarrow> inv_locate_n_b (as, am) (n, Oc#aaa, xs) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3392	apply(auto simp: inv_locate_a.simps at_begin_fst_bwtn.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3393	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3394
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3395	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3396	"\<lbrakk>dec_on_right_moving (as, am) (s, aa, Bk # xs) ires;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3397	Suc (length (takeWhile (\<lambda>a. a = Oc) (tl aa)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3398	\<noteq> length (takeWhile (\<lambda>a. a = Oc) aa)\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3399	\<Longrightarrow> Suc (length (takeWhile (\<lambda>a. a = Oc) (tl aa)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3400	< length (takeWhile (\<lambda>a. a = Oc) aa)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3401	apply(simp only: dec_on_right_moving.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3402	apply(erule exE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3403	apply(erule conjE)+
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3404	apply(case_tac ml, auto split: if_splits )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3405	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3406
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3407	lemma crsp_step_dec_b_suc_pre:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3408	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3409	and crsp: "crsp ly (as, lm) (s, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3410	and inv_start: "inv_locate_a (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3411	and fetch: "abc_fetch as ap = Some (Dec n e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3412	and dec_suc: "0 < abc_lm_v lm n"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3413	and f: "f = (\<lambda> stp. (steps (start_of ly as + 2 * n, la, ra) (ci ly (start_of ly as) (Dec n e),
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3414	start_of ly as - Suc 0) stp, start_of ly as, n))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3415	and P: "P = (\<lambda> ((s, l, r), ss, x). s = start_of ly as + 2*n + 16)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3416	and Q: "Q = (\<lambda> ((s, l, r), ss, x). dec_inv_2 ly x e (as, lm) (s, l, r) ires)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3417	shows "\<exists> stp. P (f stp) \<and> Q(f stp)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3418	proof(rule_tac LE = abc_dec_2_LE in halt_lemma2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3419	show "wf abc_dec_2_LE" by(intro wf_dec2_le)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3420	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3421	show "Q (f 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3422	using layout fetch inv_start
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3423	apply(simp add: f steps.simps Q)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3424	apply(simp only: dec_inv_2.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3425	apply(auto simp: Let_def start_of_ge start_of_less inv_start dec_inv_2.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3426	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3427	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3428	show "\<not> P (f 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3429	using layout fetch
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3430	apply(simp add: f steps.simps P)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3431	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3432	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3433	show "\<forall>n. \<not> P (f n) \<and> Q (f n) \<longrightarrow> Q (f (Suc n)) \<and> (f (Suc n), f n) \<in> abc_dec_2_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3434	using fetch
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3435	proof(rule_tac allI, rule_tac impI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3436	fix na
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3437	assume "\<not> P (f na) \<and> Q (f na)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3438	thus "Q (f (Suc na)) \<and> (f (Suc na), f na) \<in> abc_dec_2_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3439	apply(simp add: f)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3440	apply(case_tac "steps ((start_of ly as + 2 * n), la, ra)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3441	(ci ly (start_of ly as) (Dec n e), start_of ly as - Suc 0) na", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3442	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3443	fix a b c
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3444	assume "\<not> P ((a, b, c), start_of ly as, n) \<and> Q ((a, b, c), start_of ly as, n)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3445	thus "Q (step (a, b, c) (ci ly (start_of ly as) (Dec n e), start_of ly as - Suc 0), start_of ly as, n) \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3446	((step (a, b, c) (ci ly (start_of ly as) (Dec n e), start_of ly as - Suc 0), start_of ly as, n),
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3447	(a, b, c), start_of ly as, n) \<in> abc_dec_2_LE"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3448	apply(simp add: Q)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3449	apply(erule_tac conjE)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3450	apply(case_tac c, case_tac [2] aa)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3451	apply(simp_all add: dec_inv_2.simps Let_def)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3452	apply(simp_all split: if_splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3453	using fetch layout dec_suc
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3454	apply(auto simp: step.simps P dec_inv_2.simps Let_def abc_dec_2_LE_def lex_triple_def lex_pair_def lex_square_def
115 653426ed4b38 started with abacus section Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 112 diff changeset	3455	fix_add numeral_3_eq_3)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3456	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3457	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3458	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3459	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3460
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3461	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3462	"\<lbrakk>inv_stop (as, abc_lm_s lm n (abc_lm_v lm n - Suc 0))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3463	(start_of (layout_of ap) as + 2 * n + 16, a, b) ires;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3464	abc_lm_v lm n > 0;
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3465	abc_fetch as ap = Some (Dec n e)\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3466	\<Longrightarrow> crsp (layout_of ap) (abc_step_l (as, lm) (Some (Dec n e)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3467	(start_of (layout_of ap) as + 2 * n + 16, a, b) ires"
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	3468	by(auto simp: inv_stop.simps crsp.simps abc_step_l.simps startof_Suc2)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3469
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3470	lemma crsp_step_dec_b_suc:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3471	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3472	and crsp: "crsp ly (as, lm) (s, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3473	and inv_start: "inv_locate_a (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3474	and fetch: "abc_fetch as ap = Some (Dec n e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3475	and dec_suc: "0 < abc_lm_v lm n"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3476	shows "\<exists>stp > 0. crsp ly (abc_step_l (as, lm) (Some (Dec n e)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3477	(steps (start_of ly as + 2 * n, la, ra) (ci (layout_of ap)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3478	(start_of ly as) (Dec n e), start_of ly as - Suc 0) stp) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3479	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3480	apply(drule_tac crsp_step_dec_b_suc_pre, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3481	apply(rule_tac x = stp in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3482	apply(simp add: dec_inv_2.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3483	apply(case_tac stp, simp_all add: steps.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3484	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3485
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3486	lemma crsp_step_dec_b:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3487	assumes layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3488	and crsp: "crsp ly (as, lm) (s, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3489	and inv_start: "inv_locate_a (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3490	and fetch: "abc_fetch as ap = Some (Dec n e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3491	shows "\<exists>stp > 0. crsp ly (abc_step_l (as, lm) (Some (Dec n e)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3492	(steps (start_of ly as + 2 * n, la, ra) (ci ly (start_of ly as) (Dec n e), start_of ly as - Suc 0) stp) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3493	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3494	apply(case_tac "abc_lm_v lm n = 0")
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3495	apply(rule_tac crsp_step_dec_b_e, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3496	apply(rule_tac crsp_step_dec_b_suc, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3497	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3498
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3499	lemma crsp_step_dec:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3500	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3501	and crsp: "crsp ly (as, lm) (s, l, r) ires"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3502	and fetch: "abc_fetch as ap = Some (Dec n e)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3503	shows "\<exists>stp > 0. crsp ly (abc_step_l (as, lm) (Some (Dec n e)))
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3504	(steps (s, l, r) (ci ly (start_of ly as) (Dec n e), start_of ly as - Suc 0) stp) ires"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3505	proof(simp add: ci.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3506	let ?off = "start_of ly as - Suc 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3507	let ?A = "findnth n"
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	3508	let ?B = "adjust (shift (shift tdec_b (2 * n)) ?off) (start_of ly e)"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3509	have "\<exists> stp la ra. steps (s, l, r) (shift ?A ?off @ ?B, ?off) stp = (start_of ly as + 2*n, la, ra)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3510	\<and> inv_locate_a (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3511	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3512	have "\<exists>stp l' r'. steps (Suc 0, l, r) (?A, 0) stp = (Suc (2 * n), l', r') \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3513	inv_locate_a (as, lm) (n, l', r') ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3514	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3515	apply(rule_tac findnth_correct, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3516	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3517	then obtain stp l' r' where a:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3518	"steps (Suc 0, l, r) (?A, 0) stp = (Suc (2 * n), l', r') \<and>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3519	inv_locate_a (as, lm) (n, l', r') ires" by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3520	then have "steps (Suc 0 + ?off, l, r) (shift ?A ?off, ?off) stp = (Suc (2 * n) + ?off, l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3521	apply(rule_tac tm_shift_eq_steps, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3522	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3523	moreover have "s = start_of ly as"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3524	using crsp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3525	apply(auto simp: crsp.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3526	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3527	ultimately show "\<exists> stp la ra. steps (s, l, r) (shift ?A ?off @ ?B, ?off) stp = (start_of ly as + 2*n, la, ra)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3528	\<and> inv_locate_a (as, lm) (n, la, ra) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3529	using a
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3530	apply(drule_tac B = ?B in tm_append_first_steps_eq, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3531	apply(rule_tac x = stp in exI, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3532	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3533	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3534	from this obtain stpa la ra where a:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3535	"steps (s, l, r) (shift ?A ?off @ ?B, ?off) stpa = (start_of ly as + 2*n, la, ra)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3536	\<and> inv_locate_a (as, lm) (n, la, ra) ires" by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3537	have "\<exists>stp. crsp ly (abc_step_l (as, lm) (Some (Dec n e)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3538	(steps (start_of ly as + 2*n, la, ra) (shift ?A ?off @ ?B, ?off) stp) ires \<and> stp > 0"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3539	using assms a
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3540	apply(drule_tac crsp_step_dec_b, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3541	apply(rule_tac x = stp in exI, simp add: ci.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3542	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3543	then obtain stpb where b:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3544	"crsp ly (abc_step_l (as, lm) (Some (Dec n e)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3545	(steps (start_of ly as + 2*n, la, ra) (shift ?A ?off @ ?B, ?off) stpb) ires \<and> stpb > 0" ..
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3546	from a b show "\<exists> stp>0. crsp ly (abc_step_l (as, lm) (Some (Dec n e)))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3547	(steps (s, l, r) (shift ?A ?off @ ?B, ?off) stp) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3548	apply(rule_tac x = "stpa + stpb" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3549	apply(simp add: steps_add)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3550	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3551	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3552
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3553	subsection{Crsp of Goto}
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3554
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3555	lemma crsp_step_goto:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3556	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3557	and crsp: "crsp ly (as, lm) (s, l, r) ires"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3558	shows "\<exists>stp>0. crsp ly (abc_step_l (as, lm) (Some (Goto n)))
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3559	(steps (s, l, r) (ci ly (start_of ly as) (Goto n),
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3560	start_of ly as - Suc 0) stp) ires"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3561	using crsp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3562	apply(rule_tac x = "Suc 0" in exI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3563	apply(case_tac r, case_tac [2] a)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3564	apply(simp_all add: ci.simps steps.simps step.simps crsp.simps fetch.simps
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3565	crsp.simps abc_step_l.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3566	done
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3567
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3568	lemma crsp_step_in:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3569	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3570	and compile: "tp = tm_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3571	and crsp: "crsp ly (as, lm) (s, l, r) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3572	and fetch: "abc_fetch as ap = Some ins"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3573	shows "\<exists> stp>0. crsp ly (abc_step_l (as, lm) (Some ins))
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3574	(steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) stp) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3575	using assms
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3576	apply(case_tac ins, simp_all)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3577	apply(rule crsp_step_inc, simp_all)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3578	apply(rule crsp_step_dec, simp_all)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3579	apply(rule_tac crsp_step_goto, simp_all)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3580	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3581
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3582	lemma crsp_step:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3583	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3584	and compile: "tp = tm_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3585	and crsp: "crsp ly (as, lm) (s, l, r) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3586	and fetch: "abc_fetch as ap = Some ins"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3587	shows "\<exists> stp>0. crsp ly (abc_step_l (as, lm) (Some ins))
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3588	(steps (s, l, r) (tp, 0) stp) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3589	proof -
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3590	have "\<exists> stp>0. crsp ly (abc_step_l (as, lm) (Some ins))
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3591	(steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) stp) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3592	using assms
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3593	apply(rule_tac crsp_step_in, simp_all)
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3594	done
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3595	from this obtain stp where d: "stp > 0 \<and> crsp ly (abc_step_l (as, lm) (Some ins))
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3596	(steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) stp) ires" ..
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3597	obtain s' l' r' where e:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3598	"(steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) stp) = (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3599	apply(case_tac "(steps (s, l, r) (ci ly (start_of ly as) ins, start_of ly as - 1) stp)")
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3600	by blast
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3601	then have "steps (s, l, r) (tp, 0) stp = (s', l', r')"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3602	using assms d
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3603	apply(rule_tac steps_eq_in)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3604	apply(simp_all)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3605	apply(case_tac "(abc_step_l (as, lm) (Some ins))", simp add: crsp.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3606	done
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3607	thus " \<exists>stp>0. crsp ly (abc_step_l (as, lm) (Some ins)) (steps (s, l, r) (tp, 0) stp) ires"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3608	using d e
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3609	apply(rule_tac x = stp in exI, simp)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3610	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3611	qed
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3612
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3613	lemma crsp_steps:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3614	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3615	and compile: "tp = tm_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3616	and crsp: "crsp ly (as, lm) (s, l, r) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3617	shows "\<exists> stp. crsp ly (abc_steps_l (as, lm) ap n)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3618	(steps (s, l, r) (tp, 0) stp) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3619	using crsp
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3620	apply(induct n)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3621	apply(rule_tac x = 0 in exI)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3622	apply(simp add: steps.simps abc_steps_l.simps, simp)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3623	apply(case_tac "(abc_steps_l (as, lm) ap n)", auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3624	apply(frule_tac abc_step_red, simp)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3625	apply(case_tac "abc_fetch a ap", simp add: abc_step_l.simps, auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3626	apply(case_tac "steps (s, l, r) (tp, 0) stp", simp)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3627	using assms
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3628	apply(drule_tac s = ab and l = ba and r = c in crsp_step, auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3629	apply(rule_tac x = "stp + stpa" in exI, simp add: steps_add)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3630	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3631
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3632	lemma tp_correct':
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3633	assumes layout: "ly = layout_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3634	and compile: "tp = tm_of ap"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3635	and crsp: "crsp ly (0, lm) (Suc 0, l, r) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3636	and abc_halt: "abc_steps_l (0, lm) ap stp = (length ap, am)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3637	shows "\<exists> stp k. steps (Suc 0, l, r) (tp, 0) stp = (start_of ly (length ap), Bk # Bk # ires, <am> @ Bk\<up>k)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3638	using assms
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3639	apply(drule_tac n = stp in crsp_steps, auto)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3640	apply(rule_tac x = stpa in exI)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3641	apply(case_tac "steps (Suc 0, l, r) (tm_of ap, 0) stpa", simp add: crsp.simps)
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3642	done
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3643
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3644	text{The tp @ [(Nop, 0), (Nop, 0)] is nomoral turing machines, so we can use Hoare_plus when composing with Mop machine}
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3645
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3646	lemma layout_id_cons: "layout_of (ap @ [p]) = layout_of ap @ [length_of p]"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3647	apply(simp add: layout_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3648	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3649
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3650	lemma [simp]: "length (layout_of xs) = length xs"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3651	by(simp add: layout_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3652
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3653	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3654	"map (start_of (layout_of xs @ [length_of x])) [0..<length xs] = (map (start_of (layout_of xs)) [0..<length xs])"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3655	apply(auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3656	apply(simp add: layout_of.simps start_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3657	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3658
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3659	lemma tpairs_id_cons:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3660	"tpairs_of (xs @ [x]) = tpairs_of xs @ [(start_of (layout_of (xs @ [x])) (length xs), x)]"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3661	apply(auto simp: tpairs_of.simps layout_id_cons )
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3662	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3663
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3664	lemma map_length_ci:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3665	"(map (length \<circ> (\<lambda>(xa, y). ci (layout_of xs @ [length_of x]) xa y)) (tpairs_of xs)) =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3666	(map (length \<circ> (\<lambda>(x, y). ci (layout_of xs) x y)) (tpairs_of xs)) "
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3667	apply(auto)
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	3668	apply(case_tac b, auto simp: ci.simps adjust.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3669	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3670
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3671	lemma length_tp'[simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3672	"\<lbrakk>ly = layout_of ap; tp = tm_of ap\<rbrakk> \<Longrightarrow>
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	3673	length tp = 2 * sum_list (take (length ap) (layout_of ap))"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3674	proof(induct ap arbitrary: ly tp rule: rev_induct)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3675	case Nil
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3676	thus "?case"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3677	by(simp add: tms_of.simps tm_of.simps tpairs_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3678	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3679	fix x xs ly tp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3680	assume ind: "\<And>ly tp. \<lbrakk>ly = layout_of xs; tp = tm_of xs\<rbrakk> \<Longrightarrow>
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	3681	length tp = 2 * sum_list (take (length xs) (layout_of xs))"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3682	and layout: "ly = layout_of (xs @ [x])"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3683	and tp: "tp = tm_of (xs @ [x])"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3684	obtain ly' where a: "ly' = layout_of xs"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3685	by metis
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3686	obtain tp' where b: "tp' = tm_of xs"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3687	by metis
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	3688	have c: "length tp' = 2 * sum_list (take (length xs) (layout_of xs))"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3689	using a b
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3690	by(erule_tac ind, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3691	thus "length tp = 2 *
288 a9003e6d0463 Up to date for Isabelle 2018. Gave names to simp rules in UF and UTM Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at> parents: 285 diff changeset	3692	sum_list (take (length (xs @ [x])) (layout_of (xs @ [x])))"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3693	using tp b
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3694	apply(auto simp: layout_id_cons tm_of.simps tms_of.simps length_concat tpairs_id_cons map_length_ci)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3695	apply(case_tac x)
190 f1ecb4a68a54 renamed sete definition to adjust and old special case of adjust to adjust0 Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 181 diff changeset	3696	apply(auto simp: ci.simps tinc_b_def tdec_b_def length_findnth adjust.simps length_of.simps
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3697	split: abc_inst.splits)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3698	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3699	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3700
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3701	lemma [simp]:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3702	"\<lbrakk>ly = layout_of ap; tp = tm_of ap\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3703	fetch (tp @ [(Nop, 0), (Nop, 0)]) (start_of ly (length ap)) b =
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3704	(Nop, 0)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3705	apply(case_tac b)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3706	apply(simp_all add: start_of.simps fetch.simps nth_append)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3707	done
165 582916f289ea took out all deadcode from abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 163 diff changeset	3708
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3709	lemma length_tp:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3710	"\<lbrakk>ly = layout_of ap; tp = tm_of ap\<rbrakk> \<Longrightarrow>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3711	start_of ly (length ap) = Suc (length tp div 2)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3712	apply(frule_tac length_tp', simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3713	apply(simp add: start_of.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3714	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3715
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3716	lemma compile_correct_halt:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3717	assumes layout: "ly = layout_of ap"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3718	and compile: "tp = tm_of ap"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3719	and crsp: "crsp ly (0, lm) (Suc 0, l, r) ires"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3720	and abc_halt: "abc_steps_l (0, lm) ap stp = (length ap, am)"
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3721	and rs_loc: "n < length am"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3722	and rs: "abc_lm_v am n = rs"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3723	and off: "off = length tp div 2"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3724	shows "\<exists> stp i j. steps (Suc 0, l, r) (tp @ shift (mopup n) off, 0) stp = (0, Bk\<up>i @ Bk # Bk # ires, Oc\<up>Suc rs @ Bk\<up>j)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3725	proof -
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3726	have "\<exists> stp k. steps (Suc 0, l, r) (tp, 0) stp = (Suc off, Bk # Bk # ires, <am> @ Bk\<up>k)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3727	using assms tp_correct'[of ly ap tp lm l r ires stp am]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3728	by(simp add: length_tp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3729	then obtain stp k where "steps (Suc 0, l, r) (tp, 0) stp = (Suc off, Bk # Bk # ires, <am> @ Bk\<up>k)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3730	by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3731	then have a: "steps (Suc 0, l, r) (tp@shift (mopup n) off , 0) stp = (Suc off, Bk # Bk # ires, <am> @ Bk\<up>k)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3732	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3733	by(auto intro: tm_append_first_steps_eq)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3734	have "\<exists> stp i j. (steps (Suc 0, Bk # Bk # ires, <am> @ Bk \<up> k) (mopup_a n @ shift mopup_b (2 * n), 0) stp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3735	= (0, Bk\<up>i @ Bk # Bk # ires, Oc # Oc\<up> rs @ Bk\<up>j)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3736	using assms
173 b51cb9aef3ae split Mopup TM into a separate file Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 170 diff changeset	3737	by(rule_tac mopup_correct, auto simp: abc_lm_v.simps)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3738	then obtain stpb i j where
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3739	"steps (Suc 0, Bk # Bk # ires, <am> @ Bk \<up> k) (mopup_a n @ shift mopup_b (2 * n), 0) stpb
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3740	= (0, Bk\<up>i @ Bk # Bk # ires, Oc # Oc\<up> rs @ Bk\<up>j)" by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3741	then have b: "steps (Suc 0 + off, Bk # Bk # ires, <am> @ Bk \<up> k) (tp @ shift (mopup n) off, 0) stpb
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3742	= (0, Bk\<up>i @ Bk # Bk # ires, Oc # Oc\<up> rs @ Bk\<up>j)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3743	using assms wf_mopup
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3744	apply(drule_tac tm_append_second_halt_eq, auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3745	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3746	from a b show "?thesis"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3747	by(rule_tac x = "stp + stpb" in exI, simp add: steps_add)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3748	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3749
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3750	declare mopup.simps[simp del]
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3751	lemma abc_step_red2:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3752	"abc_steps_l (s, lm) p (Suc n) = (let (as', am') = abc_steps_l (s, lm) p n in
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3753	abc_step_l (as', am') (abc_fetch as' p))"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3754	apply(case_tac "abc_steps_l (s, lm) p n", simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3755	apply(drule_tac abc_step_red, simp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3756	done
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3757
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3758	lemma crsp_steps2:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3759	assumes
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3760	layout: "ly = layout_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3761	and compile: "tp = tm_of ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3762	and crsp: "crsp ly (0, lm) (Suc 0, l, r) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3763	and nothalt: "as < length ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3764	and aexec: "abc_steps_l (0, lm) ap stp = (as, am)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3765	shows "\<exists>stpa\<ge>stp. crsp ly (as, am) (steps (Suc 0, l, r) (tp, 0) stpa) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3766	using nothalt aexec
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3767	proof(induct stp arbitrary: as am)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3768	case 0
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3769	thus "?case"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3770	using crsp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3771	by(rule_tac x = 0 in exI, auto simp: abc_steps_l.simps steps.simps crsp)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3772	next
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3773	case (Suc stp as am)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3774	have ind:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3775	"\<And> as am. \<lbrakk>as < length ap; abc_steps_l (0, lm) ap stp = (as, am)\<rbrakk>
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3776	\<Longrightarrow> \<exists>stpa\<ge>stp. crsp ly (as, am) (steps (Suc 0, l, r) (tp, 0) stpa) ires" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3777	have a: "as < length ap" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3778	have b: "abc_steps_l (0, lm) ap (Suc stp) = (as, am)" by fact
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3779	obtain as' am' where c: "abc_steps_l (0, lm) ap stp = (as', am')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3780	by(case_tac "abc_steps_l (0, lm) ap stp", auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3781	then have d: "as' < length ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3782	using a b
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3783	by(simp add: abc_step_red2, case_tac "as' < length ap", simp,
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3784	simp add: abc_fetch.simps abc_steps_l.simps abc_step_l.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3785	have "\<exists>stpa\<ge>stp. crsp ly (as', am') (steps (Suc 0, l, r) (tp, 0) stpa) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3786	using d c ind by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3787	from this obtain stpa where e:
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3788	"stpa \<ge> stp \<and> crsp ly (as', am') (steps (Suc 0, l, r) (tp, 0) stpa) ires"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3789	by blast
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3790	obtain s' l' r' where f: "steps (Suc 0, l, r) (tp, 0) stpa = (s', l', r')"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3791	by(case_tac "steps (Suc 0, l, r) (tp, 0) stpa", auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3792	obtain ins where g: "abc_fetch as' ap = Some ins" using d
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3793	by(case_tac "abc_fetch as' ap",auto simp: abc_fetch.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3794	then have "\<exists>stp> (0::nat). crsp ly (abc_step_l (as', am') (Some ins))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3795	(steps (s', l', r') (tp, 0) stp) ires "
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3796	using layout compile e f
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3797	by(rule_tac crsp_step, simp_all)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3798	then obtain stpb where "stpb > 0 \<and> crsp ly (abc_step_l (as', am') (Some ins))
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3799	(steps (s', l', r') (tp, 0) stpb) ires" ..
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3800	from this show "?case" using b e g f c
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3801	by(rule_tac x = "stpa + stpb" in exI, simp add: steps_add abc_step_red2)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3802	qed
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3803
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3804	lemma compile_correct_unhalt:
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3805	assumes layout: "ly = layout_of ap"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3806	and compile: "tp = tm_of ap"
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3807	and crsp: "crsp ly (0, lm) (1, l, r) ires"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3808	and off: "off = length tp div 2"
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3809	and abc_unhalt: "\<forall> stp. (\<lambda> (as, am). as < length ap) (abc_steps_l (0, lm) ap stp)"
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3810	shows "\<forall> stp.\<not> is_final (steps (1, l, r) (tp @ shift (mopup n) off, 0) stp)"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3811	using assms
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3812	proof(rule_tac allI, rule_tac notI)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3813	fix stp
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3814	assume h: "is_final (steps (1, l, r) (tp @ shift (mopup n) off, 0) stp)"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3815	obtain as am where a: "abc_steps_l (0, lm) ap stp = (as, am)"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3816	by(case_tac "abc_steps_l (0, lm) ap stp", auto)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3817	then have b: "as < length ap"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3818	using abc_unhalt
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3819	by(erule_tac x = stp in allE, simp)
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3820	have "\<exists> stpa\<ge>stp. crsp ly (as, am) (steps (1, l, r) (tp, 0) stpa) ires "
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3821	using assms b a
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3822	apply(simp add: numeral)
eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3823	apply(rule_tac crsp_steps2)
eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3824	apply(simp_all)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3825	done
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3826	then obtain stpa where
eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3827	"stpa\<ge>stp \<and> crsp ly (as, am) (steps (1, l, r) (tp, 0) stpa) ires" ..
eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3828	then obtain s' l' r' where b: "(steps (1, l, r) (tp, 0) stpa) = (s', l', r') \<and>
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3829	stpa\<ge>stp \<and> crsp ly (as, am) (s', l', r') ires"
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3830	by(case_tac "steps (1, l, r) (tp, 0) stpa", auto)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3831	hence c:
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3832	"(steps (1, l, r) (tp @ shift (mopup n) off, 0) stpa) = (s', l', r')"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3833	by(rule_tac tm_append_first_steps_eq, simp_all add: crsp.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3834	from b have d: "s' > 0 \<and> stpa \<ge> stp"
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3835	by(simp add: crsp.simps)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3836	then obtain diff where e: "stpa = stp + diff" by (metis le_iff_add)
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3837	obtain s'' l'' r'' where f:
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3838	"steps (1, l, r) (tp @ shift (mopup n) off, 0) stp = (s'', l'', r'') \<and> is_final (s'', l'', r'')"
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3839	using h
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3840	by(case_tac "steps (1, l, r) (tp @ shift (mopup n) off, 0) stp", auto)
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3841
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3842	then have "is_final (steps (s'', l'', r'') (tp @ shift (mopup n) off, 0) diff)"
61 7edbd5657702 updated files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 60 diff changeset	3843	by(auto intro: after_is_final)
170 eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3844	then have "is_final (steps (1, l, r) (tp @ shift (mopup n) off, 0) stpa)"
eccd79a974ae updated some files Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 166 diff changeset	3845	using e f by simp
60 c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3846	from this and c d show "False" by simp
c8ff97d9f8da new version of abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 48 diff changeset	3847	qed
47 251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3848
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3849	end
251e192339b7 added abacus Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3850

author	Sebastiaan Joosten <sebastiaan.joosten@uibk.ac.at>
	Wed, 19 Dec 2018 16:10:58 +0100
changeset 288	a9003e6d0463
parent 285	447b433b67fa
child 290	6e1c03614d36
permissions	-rwxr-xr-x