afl-material: progs/Matcher2.thy@57ea439feaff (annotated)

191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	1	theory Matcher2
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	2	imports "Main"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	3	begin
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	4
355 a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	5	lemma Suc_Union:
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	6	"(\<Union> x\<le>Suc m. B x) = (B (Suc m) \<union> (\<Union> x\<le>m. B x))"
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	7	by (metis UN_insert atMost_Suc)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	8
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	9	lemma Suc_reduce_Union:
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	10	"(\<Union>x\<in>{Suc n..Suc m}. B x) = (\<Union>x\<in>{n..m}. B (Suc x))"
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	11	by (metis UN_extend_simps(10) image_Suc_atLeastAtMost)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	12
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	13
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	14	section {* Regular Expressions *}
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	15
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	16	datatype rexp =
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	17	NULL
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	18	\| EMPTY
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	19	\| CHAR char
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	20	\| SEQ rexp rexp
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	21	\| ALT rexp rexp
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	22	\| STAR rexp
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	23	\| NOT rexp
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	24	\| PLUS rexp
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	25	\| OPT rexp
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	26	\| NTIMES rexp nat
362 57ea439feaff updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 361 diff changeset	27	\| NMTIMES rexp nat nat
57ea439feaff updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 361 diff changeset	28
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	29	fun M :: "rexp \<Rightarrow> nat"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	30	where
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	31	"M (NULL) = 0"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	32	\| "M (EMPTY) = 0"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	33	\| "M (CHAR char) = 0"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	34	\| "M (SEQ r1 r2) = Suc ((M r1) + (M r2))"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	35	\| "M (ALT r1 r2) = Suc ((M r1) + (M r2))"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	36	\| "M (STAR r) = Suc (M r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	37	\| "M (NOT r) = Suc (M r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	38	\| "M (PLUS r) = Suc (M r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	39	\| "M (OPT r) = Suc (M r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	40	\| "M (NTIMES r n) = Suc (M r) * 2 * (Suc n)"
362 57ea439feaff updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 361 diff changeset	41	\| "M (NMTIMES r n m) = Suc (M r) * 2 * (Suc m - Suc n)"
57ea439feaff updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 361 diff changeset	42
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	43	section {* Sequential Composition of Sets *}
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	44
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	45	definition
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	46	Seq :: "string set \<Rightarrow> string set \<Rightarrow> string set" ("_ ;; _" [100,100] 100)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	47	where
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	48	"A ;; B = {s1 @ s2 \| s1 s2. s1 \<in> A \<and> s2 \<in> B}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	49
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	50	text {* Two Simple Properties about Sequential Composition *}
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	51
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	52	lemma seq_empty [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	53	shows "A ;; {[]} = A"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	54	and "{[]} ;; A = A"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	55	by (simp_all add: Seq_def)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	56
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	57	lemma seq_null [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	58	shows "A ;; {} = {}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	59	and "{} ;; A = {}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	60	by (simp_all add: Seq_def)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	61
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	62	lemma seq_union:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	63	shows "A ;; (B \<union> C) = A ;; B \<union> A ;; C"
194 90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	64	and "(B \<union> C) ;; A = B ;; A \<union> C ;; A"
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	65	by (auto simp add: Seq_def)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	66
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	67	lemma seq_Union:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	68	shows "A ;; (\<Union>x\<in>B. C x) = (\<Union>x\<in>B. A ;; C x)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	69	by (auto simp add: Seq_def)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	70
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	71	lemma seq_empty_in [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	72	"[] \<in> A ;; B \<longleftrightarrow> ([] \<in> A \<and> [] \<in> B)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	73	by (simp add: Seq_def)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	74
194 90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	75	lemma seq_assoc:
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	76	shows "A ;; (B ;; C) = (A ;; B) ;; C"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	77	apply(auto simp add: Seq_def)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	78	apply(metis append_assoc)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	79	apply(metis)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	80	done
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	81
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	82
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	83	section {* Power for Sets *}
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	84
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	85	fun
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	86	pow :: "string set \<Rightarrow> nat \<Rightarrow> string set" ("_ \<up> _" [101, 102] 101)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	87	where
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	88	"A \<up> 0 = {[]}"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	89	\| "A \<up> (Suc n) = A ;; (A \<up> n)"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	90
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	91	lemma pow_empty [simp]:
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	92	shows "[] \<in> A \<up> n \<longleftrightarrow> (n = 0 \<or> [] \<in> A)"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	93	by (induct n) (auto)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	94
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	95	lemma pow_plus:
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	96	"A \<up> (n + m) = A \<up> n ;; A \<up> m"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	97	by (induct n) (simp_all add: seq_assoc)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	98
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	99	section {* Kleene Star for Sets *}
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	100
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	101	inductive_set
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	102	Star :: "string set \<Rightarrow> string set" ("_\<star>" [101] 102)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	103	for A :: "string set"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	104	where
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	105	start[intro]: "[] \<in> A\<star>"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	106	\| step[intro]: "\<lbrakk>s1 \<in> A; s2 \<in> A\<star>\<rbrakk> \<Longrightarrow> s1 @ s2 \<in> A\<star>"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	107
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	108	text {* A Standard Property of Star *}
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	109
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	110	lemma star_decomp:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	111	assumes a: "c # x \<in> A\<star>"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	112	shows "\<exists>a b. x = a @ b \<and> c # a \<in> A \<and> b \<in> A\<star>"
194 90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	113	using a
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	114	using a
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	115	by (induct x\<equiv>"c # x" rule: Star.induct)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	116	(auto simp add: append_eq_Cons_conv)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	117
194 90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	118	lemma star_cases:
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	119	shows "A\<star> = {[]} \<union> A ;; A\<star>"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	120	unfolding Seq_def
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	121	by (auto) (metis Star.simps)
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	122
194 90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	123	lemma Star_in_Pow:
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	124	assumes a: "s \<in> A\<star>"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	125	shows "\<exists>n. s \<in> A \<up> n"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	126	using a
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	127	apply(induct)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	128	apply(auto)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	129	apply(rule_tac x="Suc n" in exI)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	130	apply(auto simp add: Seq_def)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	131	done
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	132
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	133	lemma Pow_in_Star:
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	134	assumes a: "s \<in> A \<up> n"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	135	shows "s \<in> A\<star>"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	136	using a
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	137	by (induct n arbitrary: s) (auto simp add: Seq_def)
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	138
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	139
194 90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	140	lemma Star_def2:
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	141	shows "A\<star> = (\<Union>n. A \<up> n)"
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	142	using Star_in_Pow Pow_in_Star
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	143	by (auto)
90796ee3c17a added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 193 diff changeset	144
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	145
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	146
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	147	section {* Semantics of Regular Expressions *}
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	148
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	149	fun
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	150	L :: "rexp \<Rightarrow> string set"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	151	where
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	152	"L (NULL) = {}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	153	\| "L (EMPTY) = {[]}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	154	\| "L (CHAR c) = {[c]}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	155	\| "L (SEQ r1 r2) = (L r1) ;; (L r2)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	156	\| "L (ALT r1 r2) = (L r1) \<union> (L r2)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	157	\| "L (STAR r) = (L r)\<star>"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	158	\| "L (NOT r) = UNIV - (L r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	159	\| "L (PLUS r) = (L r) ;; ((L r)\<star>)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	160	\| "L (OPT r) = (L r) \<union> {[]}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	161	\| "L (NTIMES r n) = (L r) \<up> n"
362 57ea439feaff updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 361 diff changeset	162	\| "L (NMTIMES r n m) = (\<Union>i\<in> {n..m} . ((L r) \<up> i))"
355 a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	163
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	164
227 93bd75031ced added handout Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 198 diff changeset	165	lemma "L (NOT NULL) = UNIV"
93bd75031ced added handout Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 198 diff changeset	166	apply(simp)
93bd75031ced added handout Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 198 diff changeset	167	done
93bd75031ced added handout Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 198 diff changeset	168
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	169	section {* The Matcher *}
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	170
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	171	fun
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	172	nullable :: "rexp \<Rightarrow> bool"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	173	where
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	174	"nullable (NULL) = False"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	175	\| "nullable (EMPTY) = True"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	176	\| "nullable (CHAR c) = False"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	177	\| "nullable (ALT r1 r2) = (nullable r1 \<or> nullable r2)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	178	\| "nullable (SEQ r1 r2) = (nullable r1 \<and> nullable r2)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	179	\| "nullable (STAR r) = True"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	180	\| "nullable (NOT r) = (\<not>(nullable r))"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	181	\| "nullable (PLUS r) = (nullable r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	182	\| "nullable (OPT r) = True"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	183	\| "nullable (NTIMES r n) = (if n = 0 then True else nullable r)"
362 57ea439feaff updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 361 diff changeset	184	\| "nullable (NMTIMES r n m) = (if m < n then False else (if n = 0 then True else nullable r))"
361 9c7eb266594c updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 355 diff changeset	185
9c7eb266594c updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 355 diff changeset	186	function der :: "char \<Rightarrow> rexp \<Rightarrow> rexp"
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	187	where
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	188	"der c (NULL) = NULL"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	189	\| "der c (EMPTY) = NULL"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	190	\| "der c (CHAR d) = (if c = d then EMPTY else NULL)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	191	\| "der c (ALT r1 r2) = ALT (der c r1) (der c r2)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	192	\| "der c (SEQ r1 r2) = ALT (SEQ (der c r1) r2) (if nullable r1 then der c r2 else NULL)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	193	\| "der c (STAR r) = SEQ (der c r) (STAR r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	194	\| "der c (NOT r) = NOT(der c r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	195	\| "der c (PLUS r) = SEQ (der c r) (STAR r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	196	\| "der c (OPT r) = der c r"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	197	\| "der c (NTIMES r 0) = NULL"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	198	\| "der c (NTIMES r (Suc n)) = der c (SEQ r (NTIMES r n))"
362 57ea439feaff updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 361 diff changeset	199	\| "der c (NMTIMES r n m) = (if m < n then NULL else
355 a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	200	(if n = m then der c (NTIMES r n) else
362 57ea439feaff updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 361 diff changeset	201	ALT (der c (NTIMES r n)) (der c (NMTIMES r (Suc n) m))))"
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	202	by pat_completeness auto
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	203
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	204	termination der
361 9c7eb266594c updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 355 diff changeset	205	apply(relation "measure (\<lambda>(c, r). M r)")
9c7eb266594c updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 355 diff changeset	206	apply(simp_all)
355 a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	207	sorry
361 9c7eb266594c updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 355 diff changeset	208
193 6518475020fc added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 191 diff changeset	209
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	210
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	211	fun
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	212	ders :: "string \<Rightarrow> rexp \<Rightarrow> rexp"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	213	where
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	214	"ders [] r = r"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	215	\| "ders (c # s) r = ders s (der c r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	216
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	217	fun
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	218	matcher :: "rexp \<Rightarrow> string \<Rightarrow> bool"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	219	where
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	220	"matcher r s = nullable (ders s r)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	221
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	222
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	223	section {* Correctness Proof of the Matcher *}
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	224
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	225	lemma nullable_correctness:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	226	shows "nullable r \<longleftrightarrow> [] \<in> (L r)"
355 a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	227	apply(induct r)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	228	apply(auto simp add: Seq_def)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	229	done
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	230
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	231	section {* Left-Quotient of a Set *}
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	232
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	233	definition
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	234	Der :: "char \<Rightarrow> string set \<Rightarrow> string set"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	235	where
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	236	"Der c A \<equiv> {s. [c] @ s \<in> A}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	237
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	238	lemma Der_null [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	239	shows "Der c {} = {}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	240	unfolding Der_def
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	241	by auto
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	242
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	243	lemma Der_empty [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	244	shows "Der c {[]} = {}"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	245	unfolding Der_def
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	246	by auto
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	247
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	248	lemma Der_char [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	249	shows "Der c {[d]} = (if c = d then {[]} else {})"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	250	unfolding Der_def
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	251	by auto
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	252
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	253	lemma Der_union [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	254	shows "Der c (A \<union> B) = Der c A \<union> Der c B"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	255	unfolding Der_def
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	256	by auto
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	257
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	258	lemma Der_insert_nil [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	259	shows "Der c (insert [] A) = Der c A"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	260	unfolding Der_def
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	261	by auto
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	262
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	263	lemma Der_seq [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	264	shows "Der c (A ;; B) = (Der c A) ;; B \<union> (if [] \<in> A then Der c B else {})"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	265	unfolding Der_def Seq_def
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	266	by (auto simp add: Cons_eq_append_conv)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	267
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	268	lemma Der_star [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	269	shows "Der c (A\<star>) = (Der c A) ;; A\<star>"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	270	proof -
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	271	have "Der c (A\<star>) = Der c ({[]} \<union> A ;; A\<star>)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	272	by (simp only: star_cases[symmetric])
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	273	also have "... = Der c (A ;; A\<star>)"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	274	by (simp only: Der_union Der_empty) (simp)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	275	also have "... = (Der c A) ;; A\<star> \<union> (if [] \<in> A then Der c (A\<star>) else {})"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	276	by simp
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	277	also have "... = (Der c A) ;; A\<star>"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	278	unfolding Seq_def Der_def
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	279	by (auto dest: star_decomp)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	280	finally show "Der c (A\<star>) = (Der c A) ;; A\<star>" .
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	281	qed
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	282
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	283	lemma Der_UNIV [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	284	"Der c (UNIV - A) = UNIV - Der c A"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	285	unfolding Der_def
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	286	by (auto)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	287
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	288	lemma Der_pow [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	289	shows "Der c (A \<up> (Suc n)) = (Der c A) ;; (A \<up> n) \<union> (if [] \<in> A then Der c (A \<up> n) else {})"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	290	unfolding Der_def
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	291	by(auto simp add: Cons_eq_append_conv Seq_def)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	292
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	293	lemma Der_UNION [simp]:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	294	shows "Der c (\<Union>x\<in>A. B x) = (\<Union>x\<in>A. Der c (B x))"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	295	by (auto simp add: Der_def)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	296
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	297
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	298
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	299	lemma der_correctness:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	300	shows "L (der c r) = Der c (L r)"
355 a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	301	apply(induct rule: der.induct)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	302	apply(simp_all add: nullable_correctness
193 6518475020fc added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 191 diff changeset	303	Suc_Union Suc_reduce_Union seq_Union atLeast0AtMost)
355 a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	304	apply(case_tac m)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	305	apply(simp)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	306	apply(simp)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	307	apply(auto)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	308	apply (metis (poly_guards_query) atLeastAtMost_iff not_le order_refl)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	309	apply (metis Suc_leD atLeastAtMost_iff)
a259eec25156 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 272 diff changeset	310	by (metis atLeastAtMost_iff le_antisym not_less_eq_eq)
193 6518475020fc added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 191 diff changeset	311
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	312
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	313	lemma matcher_correctness:
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	314	shows "matcher r s \<longleftrightarrow> s \<in> L r"
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	315	by (induct s arbitrary: r)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	316	(simp_all add: nullable_correctness der_correctness Der_def)
ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	317
272 1446bc47a294 updated Christian Urban <christian dot urban at kcl dot ac dot uk> parents: 227 diff changeset	318
191 ff6665581ced added Christian Urban <christian dot urban at kcl dot ac dot uk> parents: diff changeset	319	end

author	Christian Urban <christian dot urban at kcl dot ac dot uk>
	Fri, 23 Oct 2015 14:45:57 +0100
changeset 362	57ea439feaff
parent 361	9c7eb266594c
child 363	0d6deecdb2eb
permissions	-rw-r--r--