tm: turing_basic.thy@da147a640085 (annotated)

0 aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	1	theory turing_basic
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	2	imports Main
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3	begin
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	4
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	5	section {* Basic definitions of Turing machine *}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	6
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	7	(* Title: Turing machine's definition and its charater
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	8	Author: Xu Jian <xujian817@hotmail.com>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	9	Maintainer: Xu Jian
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	10	*)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	11
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	12	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	13	Actions of Turing machine (Abbreviated TM in the following* ).
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	14	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	15
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	16	datatype taction =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	17	-- {* Write zero *}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	18	W0 \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	19	-- {* Write one *}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	20	W1 \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	21	-- {* Move left *}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	22	L \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	23	-- {* Move right *}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	24	R \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	25	-- {* Do nothing *}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	26	Nop
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	27
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	28	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	29	Tape contents in every block.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	30	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	31
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	32	datatype block =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	33	-- {* Blank *}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	34	Bk \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	35	-- {* Occupied *}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	36	Oc
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	37
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	38	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	39	Tape is represented as a pair of lists $(L_{left}, L_{right})$,
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	40	where $L_left$, named {\em left list}, is used to represent
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	41	the tape to the left of RW-head and
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	42	$L_{right}$, named {\em right list}, is used to represent the tape
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	43	under and to the right of RW-head.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	44	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	45
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	46	type_synonym tape = "block list \<times> block list"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	47
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	48	text {* The state of turing machine.*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	49	type_synonym tstate = nat
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	50
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	51	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	52	Turing machine instruction is represented as a
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	53	pair @{text "(action, next_state)"},
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	54	where @{text "action"} is the action to take at the current state
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	55	and @{text "next_state"} is the next state the machine is getting into
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	56	after the action.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	57	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	58	type_synonym tinst = "taction \<times> tstate"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	59
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	60	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	61	Program of Turing machine is represented as a list of Turing instructions
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	62	and the execution of the program starts from the head of the list.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	63	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	64	type_synonym tprog = "tinst list"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	65
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	66
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	67	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	68	Turing machine configuration, which consists of the current state
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	69	and the tape.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	70	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	71	type_synonym t_conf = "tstate \<times> tape"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	72
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	73	fun nth_of :: "'a list \<Rightarrow> nat \<Rightarrow> 'a option"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	74	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	75	"nth_of xs n = (if n < length xs then Some (xs!n)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	76	else None)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	77
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	78	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	79	The function used to fetech instruction out of Turing program.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	80	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	81
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	82	fun fetch :: "tprog \<Rightarrow> tstate \<Rightarrow> block \<Rightarrow> tinst"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	83	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	84	"fetch p s b = (if s = 0 then (Nop, 0) else
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	85	case b of
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	86	Bk \<Rightarrow> case nth_of p (2 * (s - 1)) of
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	87	Some i \<Rightarrow> i
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	88	\| None \<Rightarrow> (Nop, 0)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	89	\| Oc \<Rightarrow> case nth_of p (2 * (s - 1) +1) of
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	90	Some i \<Rightarrow> i
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	91	\| None \<Rightarrow> (Nop, 0))"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	92
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	93
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	94	fun new_tape :: "taction \<Rightarrow> tape \<Rightarrow> tape"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	95	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	96	"new_tape action (leftn, rightn) = (case action of
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	97	W0 \<Rightarrow> (leftn, Bk#(tl rightn)) \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	98	W1 \<Rightarrow> (leftn, Oc#(tl rightn)) \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	99	L \<Rightarrow> (if leftn = [] then (tl leftn, Bk#rightn)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	100	else (tl leftn, (hd leftn) # rightn)) \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	101	R \<Rightarrow> if rightn = [] then (Bk#leftn,tl rightn)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	102	else ((hd rightn)#leftn, tl rightn) \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	103	Nop \<Rightarrow> (leftn, rightn)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	104	)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	105
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	106	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	107	The one step function used to transfer Turing machine configuration.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	108	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	109	fun tstep :: "t_conf \<Rightarrow> tprog \<Rightarrow> t_conf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	110	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	111	"tstep c p = (let (s, l, r) = c in
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	112	let (ac, ns) = (fetch p s (case r of [] \<Rightarrow> Bk \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	113	x # xs \<Rightarrow> x)) in
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	114	(ns, new_tape ac (l, r)))"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	115
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	116	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	117	The many-step function.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	118	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	119	fun steps :: "t_conf \<Rightarrow> tprog \<Rightarrow> nat \<Rightarrow> t_conf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	120	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	121	"steps c p 0 = c" \|
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	122	"steps c p (Suc n) = steps (tstep c p) p n"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	123
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	124	lemma tstep_red: "steps c p (Suc n) = tstep (steps c p n) p"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	125	proof(induct n arbitrary: c)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	126	fix c
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	127	show "steps c p (Suc 0) = tstep (steps c p 0) p" by(simp add: steps.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	128	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	129	fix n c
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	130	assume ind: "\<And> c. steps c p (Suc n) = tstep (steps c p n) p"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	131	have "steps (tstep c p) p (Suc n) = tstep (steps (tstep c p) p n) p"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	132	by(rule ind)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	133	thus "steps c p (Suc (Suc n)) = tstep (steps c p (Suc n)) p" by(simp add: steps.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	134	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	135
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	136	declare Let_def[simp] option.split[split]
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	137
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	138	definition
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	139	"iseven n \<equiv> \<exists> x. n = 2 * x"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	140
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	141
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	142	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	143	The following @{text "t_correct"} function is used to specify the wellformedness of Turing
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	144	machine.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	145	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	146	fun t_correct :: "tprog \<Rightarrow> bool"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	147	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	148	"t_correct p = (length p \<ge> 2 \<and> iseven (length p) \<and>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	149	list_all (\<lambda> (acn, s). s \<le> length p div 2) p)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	150
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	151	declare t_correct.simps[simp del]
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	152
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	153	lemma allimp: "\<lbrakk>\<forall>x. P x \<longrightarrow> Q x; \<forall>x. P x\<rbrakk> \<Longrightarrow> \<forall>x. Q x"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	154	by(auto elim: allE)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	155
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	156	lemma halt_lemma: "\<lbrakk>wf LE; \<forall> n. (\<not> P (f n) \<longrightarrow> (f (Suc n), (f n)) \<in> LE)\<rbrakk> \<Longrightarrow> \<exists> n. P (f n)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	157	apply(rule exCI, drule allimp, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	158	apply(drule_tac f = f in wf_inv_image, simp add: inv_image_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	159	apply(erule wf_induct, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	160	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	161
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	162	lemma steps_add: "steps c t (x + y) = steps (steps c t x) t y"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	163	by(induct x arbitrary: c, auto simp: steps.simps tstep_red)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	164
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	165	lemma listall_set: "list_all p t \<Longrightarrow> \<forall> a \<in> set t. p a"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	166	by(induct t, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	167
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	168	lemma fetch_ex: "\<exists>b a. fetch T aa ab = (b, a)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	169	by(simp add: fetch.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	170	definition exponent :: "'a \<Rightarrow> nat \<Rightarrow> 'a list" ("_\<^bsup>_\<^esup>" [0, 0]100)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	171	where "exponent x n = replicate n x"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	172
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	173	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	174	@{text "tinres l1 l2"} means left list @{text "l1"} is congruent with
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	175	@{text "l2"} with respect to the execution of Turing machine.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	176	Appending Blank to the right of eigther one does not affect the
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	177	outcome of excution.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	178	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	179
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	180	definition tinres :: "block list \<Rightarrow> block list \<Rightarrow> bool"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	181	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	182	"tinres bx by = (\<exists> n. bx = by@Bk\<^bsup>n\<^esup> \<or> by = bx @ Bk\<^bsup>n\<^esup>)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	183
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	184	lemma exp_zero: "a\<^bsup>0\<^esup> = []"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	185	by(simp add: exponent_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	186	lemma exp_ind_def: "a\<^bsup>Suc x \<^esup> = a # a\<^bsup>x\<^esup>"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	187	by(simp add: exponent_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	188
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	189	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	190	The following lemma shows the meaning of @{text "tinres"} with respect to
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	191	one step execution.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	192	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	193	lemma tinres_step:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	194	"\<lbrakk>tinres l l'; tstep (ss, l, r) t = (sa, la, ra); tstep (ss, l', r) t = (sb, lb, rb)\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	195	\<Longrightarrow> tinres la lb \<and> ra = rb \<and> sa = sb"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	196	apply(auto simp: tstep.simps fetch.simps new_tape.simps
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	197	split: if_splits taction.splits list.splits
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	198	block.splits)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	199	apply(case_tac [!] "t ! (2 * (ss - Suc 0))",
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	200	auto simp: exponent_def tinres_def split: if_splits taction.splits list.splits
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	201	block.splits)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	202	apply(case_tac [!] "t ! (2 * (ss - Suc 0) + Suc 0)",
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	203	auto simp: exponent_def tinres_def split: if_splits taction.splits list.splits
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	204	block.splits)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	205	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	206
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	207	declare tstep.simps[simp del] steps.simps[simp del]
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	208
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	209	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	210	The following lemma shows the meaning of @{text "tinres"} with respect to
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	211	many step execution.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	212	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	213	lemma tinres_steps:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	214	"\<lbrakk>tinres l l'; steps (ss, l, r) t stp = (sa, la, ra); steps (ss, l', r) t stp = (sb, lb, rb)\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	215	\<Longrightarrow> tinres la lb \<and> ra = rb \<and> sa = sb"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	216	apply(induct stp arbitrary: sa la ra sb lb rb, simp add: steps.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	217	apply(simp add: tstep_red)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	218	apply(case_tac "(steps (ss, l, r) t stp)")
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	219	apply(case_tac "(steps (ss, l', r) t stp)")
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	220	proof -
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	221	fix stp sa la ra sb lb rb a b c aa ba ca
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	222	assume ind: "\<And>sa la ra sb lb rb. \<lbrakk>steps (ss, l, r) t stp = (sa, la, ra);
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	223	steps (ss, l', r) t stp = (sb, lb, rb)\<rbrakk> \<Longrightarrow> tinres la lb \<and> ra = rb \<and> sa = sb"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	224	and h: " tinres l l'" "tstep (steps (ss, l, r) t stp) t = (sa, la, ra)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	225	"tstep (steps (ss, l', r) t stp) t = (sb, lb, rb)" "steps (ss, l, r) t stp = (a, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	226	"steps (ss, l', r) t stp = (aa, ba, ca)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	227	have "tinres b ba \<and> c = ca \<and> a = aa"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	228	apply(rule_tac ind, simp_all add: h)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	229	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	230	thus "tinres la lb \<and> ra = rb \<and> sa = sb"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	231	apply(rule_tac l = b and l' = ba and r = c and ss = a
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	232	and t = t in tinres_step)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	233	using h
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	234	apply(simp, simp, simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	235	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	236	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	237
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	238	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	239	The following function @{text "tshift tp n"} is used to shift Turing programs
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	240	@{text "tp"} by @{text "n"} when it is going to be combined with others.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	241	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	242
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	243	fun tshift :: "tprog \<Rightarrow> nat \<Rightarrow> tprog"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	244	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	245	"tshift tp off = (map (\<lambda> (action, state). (action, (if state = 0 then 0
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	246	else state + off))) tp)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	247
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	248	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	249	When two Turing programs are combined, the end state (state @{text "0"}) of the one
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	250	at the prefix position needs to be connected to the start state
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	251	of the one at postfix position. If @{text "tp"} is the Turing program
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	252	to be at the prefix, @{text "change_termi_state tp"} is the transformed Turing program.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	253	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	254	fun change_termi_state :: "tprog \<Rightarrow> tprog"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	255	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	256	"change_termi_state t =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	257	(map (\<lambda> (acn, ns). if ns = 0 then (acn, Suc ((length t) div 2)) else (acn, ns)) t)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	258
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	259	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	260	@{text "t_add tp1 tp2"} is the combined Truing program.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	261	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	262
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	263	fun t_add :: "tprog \<Rightarrow> tprog \<Rightarrow> tprog" ("_ \|+\| _" [0, 0] 100)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	264	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	265	"t_add t1 t2 = ((change_termi_state t1) @ (tshift t2 ((length t1) div 2)))"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	266
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	267	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	268	Tests whether the current configuration is at state @{text "0"}.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	269	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	270	definition isS0 :: "t_conf \<Rightarrow> bool"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	271	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	272	"isS0 c = (let (s, l, r) = c in s = 0)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	273
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	274	declare tstep.simps[simp del] steps.simps[simp del]
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	275	t_add.simps[simp del] fetch.simps[simp del]
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	276	new_tape.simps[simp del]
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	277
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	278
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	279	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	280	Single step execution starting from state @{text "0"} will not make any progress.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	281	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	282	lemma tstep_0: "tstep (0, tp) p = (0, tp)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	283	apply(simp add: tstep.simps fetch.simps new_tape.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	284	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	285
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	286
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	287	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	288	Many step executions starting from state @{text "0"} will not make any progress.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	289	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	290
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	291	lemma steps_0: "steps (0, tp) p stp = (0, tp)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	292	apply(induct stp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	293	apply(simp add: steps.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	294	apply(simp add: tstep_red tstep_0)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	295	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	296
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	297	lemma s_keep_step: "\<lbrakk>a \<le> length A div 2; tstep (a, b, c) A = (s, l, r); t_correct A\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	298	\<Longrightarrow> s \<le> length A div 2"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	299	apply(simp add: tstep.simps fetch.simps t_correct.simps iseven_def
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	300	split: if_splits block.splits list.splits)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	301	apply(case_tac [!] a, auto simp: list_all_length)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	302	apply(erule_tac x = "2 * nat" in allE, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	303	apply(erule_tac x = "2 * nat" in allE, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	304	apply(erule_tac x = "Suc (2 * nat)" in allE, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	305	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	306
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	307	lemma s_keep: "\<lbrakk>steps (Suc 0, tp) A stp = (s, l, r); t_correct A\<rbrakk> \<Longrightarrow> s \<le> length A div 2"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	308	proof(induct stp arbitrary: s l r)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	309	case 0 thus "?case" by(auto simp: t_correct.simps steps.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	310	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	311	fix stp s l r
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	312	assume ind: "\<And>s l r. \<lbrakk>steps (Suc 0, tp) A stp = (s, l, r); t_correct A\<rbrakk> \<Longrightarrow> s \<le> length A div 2"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	313	and h1: "steps (Suc 0, tp) A (Suc stp) = (s, l, r)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	314	and h2: "t_correct A"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	315	from h1 h2 show "s \<le> length A div 2"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	316	proof(simp add: tstep_red, cases "(steps (Suc 0, tp) A stp)", simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	317	fix a b c
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	318	assume h3: "tstep (a, b, c) A = (s, l, r)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	319	and h4: "steps (Suc 0, tp) A stp = (a, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	320	have "a \<le> length A div 2"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	321	using h2 h4
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	322	by(rule_tac l = b and r = c in ind, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	323	thus "?thesis"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	324	using h3 h2
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	325	by(simp add: s_keep_step)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	326	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	327	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	328
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	329	lemma t_merge_fetch_pre:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	330	"\<lbrakk>fetch A s b = (ac, ns); s \<le> length A div 2; t_correct A; s \<noteq> 0\<rbrakk> \<Longrightarrow>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	331	fetch (A \|+\| B) s b = (ac, if ns = 0 then Suc (length A div 2) else ns)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	332	apply(subgoal_tac "2 * (s - Suc 0) < length A \<and> Suc (2 * (s - Suc 0)) < length A")
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	333	apply(auto simp: fetch.simps t_add.simps split: if_splits block.splits)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	334	apply(simp_all add: nth_append change_termi_state.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	335	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	336
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	337	lemma [simp]: "\<lbrakk>\<not> a \<le> length A div 2; t_correct A\<rbrakk> \<Longrightarrow> fetch A a b = (Nop, 0)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	338	apply(auto simp: fetch.simps del: nth_of.simps split: block.splits)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	339	apply(case_tac [!] a, auto simp: t_correct.simps iseven_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	340	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	341
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	342	lemma [elim]: "\<lbrakk>t_correct A; \<not> isS0 (tstep (a, b, c) A)\<rbrakk> \<Longrightarrow> a \<le> length A div 2"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	343	apply(rule_tac classical, auto simp: tstep.simps new_tape.simps isS0_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	344	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	345
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	346	lemma [elim]: "\<lbrakk>t_correct A; \<not> isS0 (tstep (a, b, c) A)\<rbrakk> \<Longrightarrow> 0 < a"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	347	apply(rule_tac classical, simp add: tstep_0 isS0_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	348	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	349
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	350
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	351	lemma t_merge_pre_eq_step: "\<lbrakk>tstep (a, b, c) A = cf; t_correct A; \<not> isS0 cf\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	352	\<Longrightarrow> tstep (a, b, c) (A \|+\| B) = cf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	353	apply(subgoal_tac "a \<le> length A div 2 \<and> a \<noteq> 0")
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	354	apply(simp add: tstep.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	355	apply(case_tac "fetch A a (case c of [] \<Rightarrow> Bk \| x # xs \<Rightarrow> x)", simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	356	apply(drule_tac B = B in t_merge_fetch_pre, simp, simp, simp, simp add: isS0_def, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	357	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	358
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	359	lemma t_merge_pre_eq: "\<lbrakk>steps (Suc 0, tp) A stp = cf; \<not> isS0 cf; t_correct A\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	360	\<Longrightarrow> steps (Suc 0, tp) (A \|+\| B) stp = cf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	361	proof(induct stp arbitrary: cf)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	362	case 0 thus "?case" by(simp add: steps.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	363	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	364	fix stp cf
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	365	assume ind: "\<And>cf. \<lbrakk>steps (Suc 0, tp) A stp = cf; \<not> isS0 cf; t_correct A\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	366	\<Longrightarrow> steps (Suc 0, tp) (A \|+\| B) stp = cf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	367	and h1: "steps (Suc 0, tp) A (Suc stp) = cf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	368	and h2: "\<not> isS0 cf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	369	and h3: "t_correct A"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	370	from h1 h2 h3 show "steps (Suc 0, tp) (A \|+\| B) (Suc stp) = cf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	371	proof(simp add: tstep_red, cases "steps (Suc 0, tp) (A) stp", simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	372	fix a b c
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	373	assume h4: "tstep (a, b, c) A = cf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	374	and h5: "steps (Suc 0, tp) A stp = (a, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	375	have "steps (Suc 0, tp) (A \|+\| B) stp = (a, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	376	proof(cases a)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	377	case 0 thus "?thesis"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	378	using h4 h2
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	379	apply(simp add: tstep_0, cases cf, simp add: isS0_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	380	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	381	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	382	case (Suc n) thus "?thesis"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	383	using h5 h3
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	384	apply(rule_tac ind, auto simp: isS0_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	385	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	386	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	387	thus "tstep (steps (Suc 0, tp) (A \|+\| B) stp) (A \|+\| B) = cf"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	388	using h4 h5 h3 h2
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	389	apply(simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	390	apply(rule t_merge_pre_eq_step, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	391	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	392	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	393	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	394
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	395	declare nth.simps[simp del] tshift.simps[simp del] change_termi_state.simps[simp del]
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	396
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	397	lemma [simp]: "length (change_termi_state A) = length A"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	398	by(simp add: change_termi_state.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	399
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	400	lemma first_halt_point: "steps (Suc 0, tp) A stp = (0, tp')
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	401	\<Longrightarrow> \<exists>stp. \<not> isS0 (steps (Suc 0, tp) A stp) \<and> steps (Suc 0, tp) A (Suc stp) = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	402	proof(induct stp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	403	case 0 thus "?case" by(simp add: steps.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	404	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	405	case (Suc n)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	406	fix stp
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	407	assume ind: "steps (Suc 0, tp) A stp = (0, tp') \<Longrightarrow>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	408	\<exists>stp. \<not> isS0 (steps (Suc 0, tp) A stp) \<and> steps (Suc 0, tp) A (Suc stp) = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	409	and h: "steps (Suc 0, tp) A (Suc stp) = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	410	from h show "\<exists>stp. \<not> isS0 (steps (Suc 0, tp) A stp) \<and> steps (Suc 0, tp) A (Suc stp) = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	411	proof(simp add: tstep_red, cases "steps (Suc 0, tp) A stp", simp, case_tac a)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	412	fix a b c
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	413	assume g1: "a = (0::nat)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	414	and g2: "tstep (a, b, c) A = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	415	and g3: "steps (Suc 0, tp) A stp = (a, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	416	have "steps (Suc 0, tp) A stp = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	417	using g2 g1 g3
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	418	by(simp add: tstep_0)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	419	hence "\<exists> stp. \<not> isS0 (steps (Suc 0, tp) A stp) \<and> steps (Suc 0, tp) A (Suc stp) = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	420	by(rule ind)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	421	thus "\<exists>stp. \<not> isS0 (steps (Suc 0, tp) A stp) \<and> tstep (steps (Suc 0, tp) A stp) A = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	422	apply(simp add: tstep_red)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	423	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	424	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	425	fix a b c nat
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	426	assume g1: "steps (Suc 0, tp) A stp = (a, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	427	and g2: "steps (Suc 0, tp) A (Suc stp) = (0, tp')" "a= Suc nat"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	428	thus "\<exists>stp. \<not> isS0 (steps (Suc 0, tp) A stp) \<and> tstep (steps (Suc 0, tp) A stp) A = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	429	apply(rule_tac x = stp in exI)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	430	apply(simp add: isS0_def tstep_red)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	431	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	432	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	433	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	434
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	435	lemma t_merge_pre_halt_same':
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	436	"\<lbrakk>\<not> isS0 (steps (Suc 0, tp) A stp) ; steps (Suc 0, tp) A (Suc stp) = (0, tp'); t_correct A\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	437	\<Longrightarrow> steps (Suc 0, tp) (A \|+\| B) (Suc stp) = (Suc (length A div 2), tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	438	proof(simp add: tstep_red, cases "steps (Suc 0, tp) A stp", simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	439	fix a b c
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	440	assume h1: "\<not> isS0 (a, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	441	and h2: "tstep (a, b, c) A = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	442	and h3: "t_correct A"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	443	and h4: "steps (Suc 0, tp) A stp = (a, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	444	have "steps (Suc 0, tp) (A \|+\| B) stp = (a, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	445	using h1 h4 h3
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	446	apply(rule_tac t_merge_pre_eq, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	447	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	448	moreover have "tstep (a, b, c) (A \|+\| B) = (Suc (length A div 2), tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	449	using h2 h3 h1 h4
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	450	apply(simp add: tstep.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	451	apply(case_tac " fetch A a (case c of [] \<Rightarrow> Bk \| x # xs \<Rightarrow> x)", simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	452	apply(drule_tac B = B in t_merge_fetch_pre, auto simp: isS0_def intro: s_keep)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	453	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	454	ultimately show "tstep (steps (Suc 0, tp) (A \|+\| B) stp) (A \|+\| B) = (Suc (length A div 2), tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	455	by(simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	456	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	457
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	458	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	459	When Turing machine @{text "A"} and @{text "B"} are combined and the execution
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	460	of @{text "A"} can termination within @{text "stp"} steps,
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	461	the combined machine @{text "A \|+\| B"} will eventually get into the starting
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	462	state of machine @{text "B"}.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	463	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	464	lemma t_merge_pre_halt_same: "
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	465	\<lbrakk>steps (Suc 0, tp) A stp = (0, tp'); t_correct A; t_correct B\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	466	\<Longrightarrow> \<exists> stp. steps (Suc 0, tp) (A \|+\| B) stp = (Suc (length A div 2), tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	467	proof -
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	468	assume a_wf: "t_correct A"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	469	and b_wf: "t_correct B"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	470	and a_ht: "steps (Suc 0, tp) A stp = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	471	have halt_point: "\<exists> stp. \<not> isS0 (steps (Suc 0, tp) A stp) \<and> steps (Suc 0, tp) A (Suc stp) = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	472	using a_ht
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	473	by(erule_tac first_halt_point)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	474	then obtain stp' where "\<not> isS0 (steps (Suc 0, tp) A stp') \<and> steps (Suc 0, tp) A (Suc stp') = (0, tp')"..
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	475	hence "steps (Suc 0, tp) (A \|+\| B) (Suc stp') = (Suc (length A div 2), tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	476	using a_wf
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	477	apply(rule_tac t_merge_pre_halt_same', auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	478	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	479	thus "?thesis" ..
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	480	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	481
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	482	lemma fetch_0: "fetch p 0 b = (Nop, 0)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	483	by(simp add: fetch.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	484
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	485	lemma [simp]: "length (tshift B x) = length B"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	486	by(simp add: tshift.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	487
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	488	lemma [simp]: "t_correct A \<Longrightarrow> 2 * (length A div 2) = length A"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	489	apply(simp add: t_correct.simps iseven_def, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	490	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	491
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	492	lemma t_merge_fetch_snd:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	493	"\<lbrakk>fetch B a b = (ac, ns); t_correct A; t_correct B; a > 0 \<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	494	\<Longrightarrow> fetch (A \|+\| B) (a + length A div 2) b
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	495	= (ac, if ns = 0 then 0 else ns + length A div 2)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	496	apply(auto simp: fetch.simps t_add.simps split: if_splits block.splits)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	497	apply(case_tac [!] a, simp_all)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	498	apply(simp_all add: nth_append change_termi_state.simps tshift.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	499	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	500
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	501	lemma t_merge_snd_eq_step:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	502	"\<lbrakk>tstep (s, l, r) B = (s', l', r'); t_correct A; t_correct B; s > 0\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	503	\<Longrightarrow> tstep (s + length A div 2, l, r) (A \|+\| B) =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	504	(if s' = 0 then 0 else s' + length A div 2, l' ,r') "
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	505	apply(simp add: tstep.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	506	apply(cases "fetch B s (case r of [] \<Rightarrow> Bk \| x # xs \<Rightarrow> x)")
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	507	apply(auto simp: t_merge_fetch_snd)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	508	apply(frule_tac [!] t_merge_fetch_snd, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	509	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	510
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	511	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	512	Relates the executions of TM @{text "B"}, one is when @{text "B"} is executed alone,
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	513	the other is the execution when @{text "B"} is in the combined TM.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	514	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	515	lemma t_merge_snd_eq_steps:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	516	"\<lbrakk>t_correct A; t_correct B; steps (s, l, r) B stp = (s', l', r'); s > 0\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	517	\<Longrightarrow> steps (s + length A div 2, l, r) (A \|+\| B) stp =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	518	(if s' = 0 then 0 else s' + length A div 2, l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	519	proof(induct stp arbitrary: s' l' r')
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	520	case 0 thus "?case"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	521	by(simp add: steps.simps)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	522	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	523	fix stp s' l' r'
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	524	assume ind: "\<And>s' l' r'. \<lbrakk>t_correct A; t_correct B; steps (s, l, r) B stp = (s', l', r'); 0 < s\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	525	\<Longrightarrow> steps (s + length A div 2, l, r) (A \|+\| B) stp =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	526	(if s' = 0 then 0 else s' + length A div 2, l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	527	and h1: "steps (s, l, r) B (Suc stp) = (s', l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	528	and h2: "t_correct A"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	529	and h3: "t_correct B"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	530	and h4: "0 < s"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	531	from h1 show "steps (s + length A div 2, l, r) (A \|+\| B) (Suc stp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	532	= (if s' = 0 then 0 else s' + length A div 2, l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	533	proof(simp only: tstep_red, cases "steps (s, l, r) B stp")
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	534	fix a b c
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	535	assume h5: "steps (s, l, r) B stp = (a, b, c)" "tstep (steps (s, l, r) B stp) B = (s', l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	536	hence h6: "(steps (s + length A div 2, l, r) (A \|+\| B) stp) =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	537	((if a = 0 then 0 else a + length A div 2, b, c))"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	538	using h2 h3 h4
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	539	by(rule_tac ind, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	540	thus "tstep (steps (s + length A div 2, l, r) (A \|+\| B) stp) (A \|+\| B) =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	541	(if s' = 0 then 0 else s'+ length A div 2, l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	542	using h5
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	543	proof(auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	544	assume "tstep (0, b, c) B = (0, l', r')" thus "tstep (0, b, c) (A \|+\| B) = (0, l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	545	by(simp add: tstep_0)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	546	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	547	assume "tstep (0, b, c) B = (s', l', r')" "0 < s'"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	548	thus "tstep (0, b, c) (A \|+\| B) = (s' + length A div 2, l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	549	by(simp add: tstep_0)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	550	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	551	assume "tstep (a, b, c) B = (0, l', r')" "0 < a"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	552	thus "tstep (a + length A div 2, b, c) (A \|+\| B) = (0, l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	553	using h2 h3
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	554	by(drule_tac t_merge_snd_eq_step, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	555	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	556	assume "tstep (a, b, c) B = (s', l', r')" "0 < a" "0 < s'"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	557	thus "tstep (a + length A div 2, b, c) (A \|+\| B) = (s' + length A div 2, l', r')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	558	using h2 h3
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	559	by(drule_tac t_merge_snd_eq_step, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	560	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	561	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	562	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	563
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	564	lemma t_merge_snd_halt_eq:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	565	"\<lbrakk>steps (Suc 0, tp) B stp = (0, tp'); t_correct A; t_correct B\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	566	\<Longrightarrow> \<exists>stp. steps (Suc (length A div 2), tp) (A \|+\| B) stp = (0, tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	567	apply(case_tac tp, cases tp', simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	568	apply(drule_tac s = "Suc 0" in t_merge_snd_eq_steps, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	569	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	570
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	571	lemma t_inj: "\<lbrakk>steps (Suc 0, tp) A stpa = (0, tp1); steps (Suc 0, tp) A stpb = (0, tp2)\<rbrakk>
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	572	\<Longrightarrow> tp1 = tp2"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	573	proof -
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	574	assume h1: "steps (Suc 0, tp) A stpa = (0, tp1)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	575	and h2: "steps (Suc 0, tp) A stpb = (0, tp2)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	576	thus "?thesis"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	577	proof(cases "stpa < stpb")
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	578	case True thus "?thesis"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	579	using h1 h2
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	580	apply(drule_tac less_imp_Suc_add, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	581	apply(simp del: add_Suc_right add_Suc add: add_Suc_right[THEN sym] steps_add steps_0)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	582	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	583	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	584	case False thus "?thesis"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	585	using h1 h2
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	586	apply(drule_tac leI)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	587	apply(case_tac "stpb = stpa", auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	588	apply(subgoal_tac "stpb < stpa")
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	589	apply(drule_tac less_imp_Suc_add, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	590	apply(simp del: add_Suc_right add_Suc add: add_Suc_right[THEN sym] steps_add steps_0)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	591	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	592	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	593	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	594
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	595	type_synonym t_assert = "tape \<Rightarrow> bool"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	596
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	597	definition t_imply :: "t_assert \<Rightarrow> t_assert \<Rightarrow> bool" ("_ \<turnstile>-> _" [0, 0] 100)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	598	where
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	599	"t_imply a1 a2 = (\<forall> tp. a1 tp \<longrightarrow> a2 tp)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	600
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	601
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	602	locale turing_merge =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	603	fixes A :: "tprog" and B :: "tprog" and P1 :: "t_assert"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	604	and P2 :: "t_assert"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	605	and P3 :: "t_assert"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	606	and P4 :: "t_assert"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	607	and Q1:: "t_assert"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	608	and Q2 :: "t_assert"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	609	assumes
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	610	A_wf : "t_correct A"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	611	and B_wf : "t_correct B"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	612	and A_halt : "P1 tp \<Longrightarrow> \<exists> stp. let (s, tp') = steps (Suc 0, tp) A stp in s = 0 \<and> Q1 tp'"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	613	and B_halt : "P2 tp \<Longrightarrow> \<exists> stp. let (s, tp') = steps (Suc 0, tp) B stp in s = 0 \<and> Q2 tp'"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	614	and A_uhalt : "P3 tp \<Longrightarrow> \<not> (\<exists> stp. isS0 (steps (Suc 0, tp) A stp))"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	615	and B_uhalt: "P4 tp \<Longrightarrow> \<not> (\<exists> stp. isS0 (steps (Suc 0, tp) B stp))"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	616	begin
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	617
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	618
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	619	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	620	The following lemma tries to derive the Hoare logic rule for sequentially combined TMs.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	621	It deals with the situtation when both @{text "A"} and @{text "B"} are terminated.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	622	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	623
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	624	lemma t_merge_halt:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	625	assumes aimpb: "Q1 \<turnstile>-> P2"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	626	shows "P1 \<turnstile>-> \<lambda> tp. (\<exists> stp tp'. steps (Suc 0, tp) (A \|+\| B) stp = (0, tp') \<and> Q2 tp')"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	627	proof(simp add: t_imply_def, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	628	fix a b
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	629	assume h: "P1 (a, b)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	630	hence "\<exists> stp. let (s, tp') = steps (Suc 0, a, b) A stp in s = 0 \<and> Q1 tp'"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	631	using A_halt by simp
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	632	from this obtain stp1 where "let (s, tp') = steps (Suc 0, a, b) A stp1 in s = 0 \<and> Q1 tp'" ..
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	633	thus "\<exists>stp aa ba. steps (Suc 0, a, b) (A \|+\| B) stp = (0, aa, ba) \<and> Q2 (aa, ba)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	634	proof(case_tac "steps (Suc 0, a, b) A stp1", simp, erule_tac conjE)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	635	fix aa ba c
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	636	assume g1: "Q1 (ba, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	637	and g2: "steps (Suc 0, a, b) A stp1 = (0, ba, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	638	hence "P2 (ba, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	639	using aimpb apply(simp add: t_imply_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	640	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	641	hence "\<exists> stp. let (s, tp') = steps (Suc 0, ba, c) B stp in s = 0 \<and> Q2 tp'"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	642	using B_halt by simp
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	643	from this obtain stp2 where "let (s, tp') = steps (Suc 0, ba, c) B stp2 in s = 0 \<and> Q2 tp'" ..
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	644	thus "?thesis"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	645	proof(case_tac "steps (Suc 0, ba, c) B stp2", simp, erule_tac conjE)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	646	fix aa bb ca
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	647	assume g3: " Q2 (bb, ca)" "steps (Suc 0, ba, c) B stp2 = (0, bb, ca)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	648	have "\<exists> stp. steps (Suc 0, a, b) (A \|+\| B) stp = (Suc (length A div 2), ba , c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	649	using g2 A_wf B_wf
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	650	by(rule_tac t_merge_pre_halt_same, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	651	moreover have "\<exists> stp. steps (Suc (length A div 2), ba, c) (A \|+\| B) stp = (0, bb, ca)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	652	using g3 A_wf B_wf
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	653	apply(rule_tac t_merge_snd_halt_eq, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	654	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	655	ultimately show "\<exists>stp aa ba. steps (Suc 0, a, b) (A \|+\| B) stp = (0, aa, ba) \<and> Q2 (aa, ba)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	656	apply(erule_tac exE, erule_tac exE)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	657	apply(rule_tac x = "stp + stpa" in exI, simp add: steps_add)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	658	using g3 by simp
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	659	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	660	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	661	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	662
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	663	lemma t_merge_uhalt_tmp:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	664	assumes B_uh: "\<forall>stp. \<not> isS0 (steps (Suc 0, b, c) B stp)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	665	and merge_ah: "steps (Suc 0, tp) (A \|+\| B) stpa = (Suc (length A div 2), b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	666	shows "\<forall> stp. \<not> isS0 (steps (Suc 0, tp) (A \|+\| B) stp)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	667	using B_uh merge_ah
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	668	apply(rule_tac allI)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	669	apply(case_tac "stp > stpa")
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	670	apply(erule_tac x = "stp - stpa" in allE)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	671	apply(case_tac "(steps (Suc 0, b, c) B (stp - stpa))", simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	672	proof -
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	673	fix stp a ba ca
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	674	assume h1: "\<not> isS0 (a, ba, ca)" "stpa < stp"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	675	and h2: "steps (Suc 0, b, c) B (stp - stpa) = (a, ba, ca)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	676	have "steps (Suc 0 + length A div 2, b, c) (A \|+\| B) (stp - stpa) =
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	677	(if a = 0 then 0 else a + length A div 2, ba, ca)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	678	using A_wf B_wf h2
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	679	by(rule_tac t_merge_snd_eq_steps, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	680	moreover have "a > 0" using h1 by(simp add: isS0_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	681	moreover have "\<exists> stpb. stp = stpa + stpb"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	682	using h1 by(rule_tac x = "stp - stpa" in exI, simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	683	ultimately show "\<not> isS0 (steps (Suc 0, tp) (A \|+\| B) stp)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	684	using merge_ah
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	685	by(auto simp: steps_add isS0_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	686	next
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	687	fix stp
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	688	assume h: "steps (Suc 0, tp) (A \|+\| B) stpa = (Suc (length A div 2), b, c)" "\<not> stpa < stp"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	689	hence "\<exists> stpb. stpa = stp + stpb" apply(rule_tac x = "stpa - stp" in exI, auto) done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	690	thus "\<not> isS0 (steps (Suc 0, tp) (A \|+\| B) stp)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	691	using h
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	692	apply(auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	693	apply(cases "steps (Suc 0, tp) (A \|+\| B) stp", simp add: steps_add isS0_def steps_0)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	694	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	695	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	696
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	697	text {*
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	698	The following lemma deals with the situation when TM @{text "B"} can not terminate.
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	699	*}
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	700
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	701	lemma t_merge_uhalt:
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	702	assumes aimpb: "Q1 \<turnstile>-> P4"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	703	shows "P1 \<turnstile>-> \<lambda> tp. \<not> (\<exists> stp. isS0 (steps (Suc 0, tp) (A \|+\| B) stp))"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	704	proof(simp only: t_imply_def, rule_tac allI, rule_tac impI)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	705	fix tp
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	706	assume init_asst: "P1 tp"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	707	show "\<not> (\<exists>stp. isS0 (steps (Suc 0, tp) (A \|+\| B) stp))"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	708	proof -
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	709	have "\<exists> stp. let (s, tp') = steps (Suc 0, tp) A stp in s = 0 \<and> Q1 tp'"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	710	using A_halt[of tp] init_asst
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	711	by(simp)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	712	from this obtain stpx where "let (s, tp') = steps (Suc 0, tp) A stpx in s = 0 \<and> Q1 tp'" ..
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	713	thus "?thesis"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	714	proof(cases "steps (Suc 0, tp) A stpx", simp, erule_tac conjE)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	715	fix a b c
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	716	assume "Q1 (b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	717	and h3: "steps (Suc 0, tp) A stpx = (0, b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	718	hence h2: "P4 (b, c)" using aimpb
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	719	by(simp add: t_imply_def)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	720	have "\<exists> stp. steps (Suc 0, tp) (A \|+\| B) stp = (Suc (length A div 2), b, c)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	721	using h3 A_wf B_wf
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	722	apply(rule_tac stp = stpx in t_merge_pre_halt_same, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	723	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	724	from this obtain stpa where h4:"steps (Suc 0, tp) (A \|+\| B) stpa = (Suc (length A div 2), b, c)" ..
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	725	have " \<not> (\<exists> stp. isS0 (steps (Suc 0, b, c) B stp))"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	726	using B_uhalt [of "(b, c)"] h2 apply simp
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	727	done
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	728	from this and h4 show "\<forall>stp. \<not> isS0 (steps (Suc 0, tp) (A \|+\| B) stp)"
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	729	by(rule_tac t_merge_uhalt_tmp, auto)
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	730	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	731	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	732	qed
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	733	end
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	734
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	735	end
aa8656a8dbef initial setup Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	736

author	Christian Urban <christian dot urban at kcl dot ac dot uk>
	Thu, 27 Dec 2012 10:07:17 +0000
changeset 4	da147a640085
parent 0	aa8656a8dbef
child 41	6d89ed67ba27
permissions	-rw-r--r--