isabelle: src/HOL/IMP/Transition.thy@d8efc2490b8e (annotated)

12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	1	(* Title: HOL/IMP/Transition.thy
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	2	Author: Tobias Nipkow & Robert Sandner, TUM
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	3	Isar Version: Gerwin Klein, 2001
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	4	Copyright 1996 TUM
1700 afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	5	*)
afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	6
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	7	header "Transition Semantics of Commands"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	8
16417 9bc16273c2d4 migrated theory headers to new format haftmann parents: 14565 diff changeset	9	theory Transition imports Natural begin
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	10
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	11	subsection "The transition relation"
1700 afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	12
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	13	text {*
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	14	We formalize the transition semantics as in \cite{Nielson}. This
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	15	makes some of the rules a bit more intuitive, but also requires
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	16	some more (internal) formal overhead.
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	17
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	18	Since configurations that have terminated are written without
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	19	a statement, the transition relation is not
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	20	@{typ "((com \<times> state) \<times> (com \<times> state)) set"}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	21	but instead:
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	22	@{typ "((com option \<times> state) \<times> (com option \<times> state)) set"}
4906 0537ee95d004 fixed translations; wenzelm parents: 4897 diff changeset	23
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	24	Some syntactic sugar that we will use to hide the
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	25	@{text option} part in configurations:
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	26	*}
27362 a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	27	abbreviation
a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	28	angle :: "[com, state] \<Rightarrow> com option \<times> state" ("<_,_>") where
a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	29	"<c,s> == (Some c, s)"
a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	30	abbreviation
a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	31	angle2 :: "state \<Rightarrow> com option \<times> state" ("<_>") where
a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	32	"<s> == (None, s)"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	33
27362 a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	34	notation (xsymbols)
a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	35	angle ("\<langle>_,_\<rangle>") and
a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	36	angle2 ("\<langle>_\<rangle>")
14565 c6dc17aab88a use more symbols in HTML output kleing parents: 13524 diff changeset	37
27362 a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	38	notation (HTML output)
a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	39	angle ("\<langle>_,_\<rangle>") and
a6dc1769fdda modernized specifications; wenzelm parents: 25862 diff changeset	40	angle2 ("\<langle>_\<rangle>")
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	41
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	42	text {*
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	43	Now, finally, we are set to write down the rules for our small step semantics:
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	44	*}
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	45	inductive_set
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	46	evalc1 :: "((com option \<times> state) \<times> (com option \<times> state)) set"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	47	and evalc1' :: "[(com option\<times>state),(com option\<times>state)] \<Rightarrow> bool"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	48	("_ \<longrightarrow>\<^sub>1 _" [60,60] 61)
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	49	where
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	50	"cs \<longrightarrow>\<^sub>1 cs' == (cs,cs') \<in> evalc1"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	51	\| Skip: "\<langle>\<SKIP>, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>s\<rangle>"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	52	\| Assign: "\<langle>x :== a, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>s[x \<mapsto> a s]\<rangle>"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	53
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	54	\| Semi1: "\<langle>c0,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>s'\<rangle> \<Longrightarrow> \<langle>c0;c1,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c1,s'\<rangle>"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	55	\| Semi2: "\<langle>c0,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c0',s'\<rangle> \<Longrightarrow> \<langle>c0;c1,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c0';c1,s'\<rangle>"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	56
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	57	\| IfTrue: "b s \<Longrightarrow> \<langle>\<IF> b \<THEN> c1 \<ELSE> c2,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c1,s\<rangle>"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	58	\| IfFalse: "\<not>b s \<Longrightarrow> \<langle>\<IF> b \<THEN> c1 \<ELSE> c2,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c2,s\<rangle>"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	59
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	60	\| While: "\<langle>\<WHILE> b \<DO> c,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>\<IF> b \<THEN> c; \<WHILE> b \<DO> c \<ELSE> \<SKIP>,s\<rangle>"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	61
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	62	lemmas [intro] = evalc1.intros -- "again, use these rules in automatic proofs"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	63
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	64	text {*
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	65	More syntactic sugar for the transition relation, and its
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	66	iteration.
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	67	*}
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	68	abbreviation
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	69	evalcn :: "[(com option\<times>state),nat,(com option\<times>state)] \<Rightarrow> bool"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	70	("_ -_\<rightarrow>\<^sub>1 _" [60,60,60] 60) where
30952 7ab2716dd93b power operation on functions with syntax o^; power operation on relations with syntax ^^ haftmann parents: 27362 diff changeset	71	"cs -n\<rightarrow>\<^sub>1 cs' == (cs,cs') \<in> evalc1^^n"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	72
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	73	abbreviation
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	74	evalc' :: "[(com option\<times>state),(com option\<times>state)] \<Rightarrow> bool"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	75	("_ \<longrightarrow>\<^sub>1\<^sup>* _" [60,60] 60) where
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	76	"cs \<longrightarrow>\<^sub>1\<^sup>* cs' == (cs,cs') \<in> evalc1^*"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	77
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	78	(<)
30952 7ab2716dd93b power operation on functions with syntax o^; power operation on relations with syntax ^^ haftmann parents: 27362 diff changeset	79	declare rel_pow_Suc_E2 [elim!]
7ab2716dd93b power operation on functions with syntax o^; power operation on relations with syntax ^^ haftmann parents: 27362 diff changeset	80	(>)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	81
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	82	text {*
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	83	As for the big step semantics you can read these rules in a
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	84	syntax directed way:
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	85	*}
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	86	lemma SKIP_1: "\<langle>\<SKIP>, s\<rangle> \<longrightarrow>\<^sub>1 y = (y = \<langle>s\<rangle>)"
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	87	by (induct y, rule, cases set: evalc1, auto)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	88
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	89	lemma Assign_1: "\<langle>x :== a, s\<rangle> \<longrightarrow>\<^sub>1 y = (y = \<langle>s[x \<mapsto> a s]\<rangle>)"
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	90	by (induct y, rule, cases set: evalc1, auto)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	91
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	92	lemma Cond_1:
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	93	"\<langle>\<IF> b \<THEN> c1 \<ELSE> c2, s\<rangle> \<longrightarrow>\<^sub>1 y = ((b s \<longrightarrow> y = \<langle>c1, s\<rangle>) \<and> (\<not>b s \<longrightarrow> y = \<langle>c2, s\<rangle>))"
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	94	by (induct y, rule, cases set: evalc1, auto)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	95
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	96	lemma While_1:
12434 ff2efde4574d tuned kleing parents: 12431 diff changeset	97	"\<langle>\<WHILE> b \<DO> c, s\<rangle> \<longrightarrow>\<^sub>1 y = (y = \<langle>\<IF> b \<THEN> c; \<WHILE> b \<DO> c \<ELSE> \<SKIP>, s\<rangle>)"
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	98	by (induct y, rule, cases set: evalc1, auto)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	99
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	100	lemmas [simp] = SKIP_1 Assign_1 Cond_1 While_1
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	101
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	102
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	103	subsection "Examples"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	104
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	105	lemma
12434 ff2efde4574d tuned kleing parents: 12431 diff changeset	106	"s x = 0 \<Longrightarrow> \<langle>\<WHILE> \<lambda>s. s x \<noteq> 1 \<DO> (x:== \<lambda>s. s x+1), s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s[x \<mapsto> 1]\<rangle>"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	107	(is "_ \<Longrightarrow> \<langle>?w, _\<rangle> \<longrightarrow>\<^sub>1\<^sup>* _")
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	108	proof -
12434 ff2efde4574d tuned kleing parents: 12431 diff changeset	109	let ?c = "x:== \<lambda>s. s x+1"
ff2efde4574d tuned kleing parents: 12431 diff changeset	110	let ?if = "\<IF> \<lambda>s. s x \<noteq> 1 \<THEN> ?c; ?w \<ELSE> \<SKIP>"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	111	assume [simp]: "s x = 0"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	112	have "\<langle>?w, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>?if, s\<rangle>" ..
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	113	also have "\<langle>?if, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>?c; ?w, s\<rangle>" by simp
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	114	also have "\<langle>?c; ?w, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>?w, s[x \<mapsto> 1]\<rangle>" by (rule Semi1) simp
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	115	also have "\<langle>?w, s[x \<mapsto> 1]\<rangle> \<longrightarrow>\<^sub>1 \<langle>?if, s[x \<mapsto> 1]\<rangle>" ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	116	also have "\<langle>?if, s[x \<mapsto> 1]\<rangle> \<longrightarrow>\<^sub>1 \<langle>\<SKIP>, s[x \<mapsto> 1]\<rangle>" by (simp add: update_def)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	117	also have "\<langle>\<SKIP>, s[x \<mapsto> 1]\<rangle> \<longrightarrow>\<^sub>1 \<langle>s[x \<mapsto> 1]\<rangle>" ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	118	finally show ?thesis ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	119	qed
4906 0537ee95d004 fixed translations; wenzelm parents: 4897 diff changeset	120
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	121	lemma
12434 ff2efde4574d tuned kleing parents: 12431 diff changeset	122	"s x = 2 \<Longrightarrow> \<langle>\<WHILE> \<lambda>s. s x \<noteq> 1 \<DO> (x:== \<lambda>s. s x+1), s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* s'"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	123	(is "_ \<Longrightarrow> \<langle>?w, _\<rangle> \<longrightarrow>\<^sub>1\<^sup>* s'")
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	124	proof -
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	125	let ?c = "x:== \<lambda>s. s x+1"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	126	let ?if = "\<IF> \<lambda>s. s x \<noteq> 1 \<THEN> ?c; ?w \<ELSE> \<SKIP>"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	127	assume [simp]: "s x = 2"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	128	note update_def [simp]
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	129	have "\<langle>?w, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>?if, s\<rangle>" ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	130	also have "\<langle>?if, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>?c; ?w, s\<rangle>" by simp
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	131	also have "\<langle>?c; ?w, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>?w, s[x \<mapsto> 3]\<rangle>" by (rule Semi1) simp
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	132	also have "\<langle>?w, s[x \<mapsto> 3]\<rangle> \<longrightarrow>\<^sub>1 \<langle>?if, s[x \<mapsto> 3]\<rangle>" ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	133	also have "\<langle>?if, s[x \<mapsto> 3]\<rangle> \<longrightarrow>\<^sub>1 \<langle>?c; ?w, s[x \<mapsto> 3]\<rangle>" by simp
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	134	also have "\<langle>?c; ?w, s[x \<mapsto> 3]\<rangle> \<longrightarrow>\<^sub>1 \<langle>?w, s[x \<mapsto> 4]\<rangle>" by (rule Semi1) simp
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	135	also have "\<langle>?w, s[x \<mapsto> 4]\<rangle> \<longrightarrow>\<^sub>1 \<langle>?if, s[x \<mapsto> 4]\<rangle>" ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	136	also have "\<langle>?if, s[x \<mapsto> 4]\<rangle> \<longrightarrow>\<^sub>1 \<langle>?c; ?w, s[x \<mapsto> 4]\<rangle>" by simp
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	137	also have "\<langle>?c; ?w, s[x \<mapsto> 4]\<rangle> \<longrightarrow>\<^sub>1 \<langle>?w, s[x \<mapsto> 5]\<rangle>" by (rule Semi1) simp
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	138	oops
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	139
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	140	subsection "Basic properties"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	141
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	142	text {*
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	143	There are no \emph{stuck} programs:
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	144	*}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	145	lemma no_stuck: "\<exists>y. \<langle>c,s\<rangle> \<longrightarrow>\<^sub>1 y"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	146	proof (induct c)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	147	-- "case Semi:"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	148	fix c1 c2 assume "\<exists>y. \<langle>c1,s\<rangle> \<longrightarrow>\<^sub>1 y"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	149	then obtain y where "\<langle>c1,s\<rangle> \<longrightarrow>\<^sub>1 y" ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	150	then obtain c1' s' where "\<langle>c1,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>s'\<rangle> \<or> \<langle>c1,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c1',s'\<rangle>"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	151	by (cases y, cases "fst y") auto
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	152	thus "\<exists>s'. \<langle>c1;c2,s\<rangle> \<longrightarrow>\<^sub>1 s'" by auto
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	153	next
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	154	-- "case If:"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	155	fix b c1 c2 assume "\<exists>y. \<langle>c1,s\<rangle> \<longrightarrow>\<^sub>1 y" and "\<exists>y. \<langle>c2,s\<rangle> \<longrightarrow>\<^sub>1 y"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	156	thus "\<exists>y. \<langle>\<IF> b \<THEN> c1 \<ELSE> c2, s\<rangle> \<longrightarrow>\<^sub>1 y" by (cases "b s") auto
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	157	qed auto -- "the rest is trivial"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	158
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	159	text {*
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	160	If a configuration does not contain a statement, the program
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	161	has terminated and there is no next configuration:
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	162	*}
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	163	lemma stuck [elim!]: "\<langle>s\<rangle> \<longrightarrow>\<^sub>1 y \<Longrightarrow> P"
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	164	by (induct y, auto elim: evalc1.cases)
12434 ff2efde4574d tuned kleing parents: 12431 diff changeset	165
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	166	lemma evalc_None_retrancl [simp, dest!]: "\<langle>s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* s' \<Longrightarrow> s' = \<langle>s\<rangle>"
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	167	by (induct set: rtrancl) auto
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	168
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	169	(<)
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	170	(* FIXME: relpow.simps don't work *)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	171	lemmas [simp del] = relpow.simps
30952 7ab2716dd93b power operation on functions with syntax o^; power operation on relations with syntax ^^ haftmann parents: 27362 diff changeset	172	lemma rel_pow_0 [simp]: "!!R::('a*'a) set. R ^^ 0 = Id" by (simp add: relpow.simps)
7ab2716dd93b power operation on functions with syntax o^; power operation on relations with syntax ^^ haftmann parents: 27362 diff changeset	173	lemma rel_pow_Suc_0 [simp]: "!!R::('a*'a) set. R ^^ Suc 0 = R" by (simp add: relpow.simps)
25862 9756a80d8a13 tuned haftmann parents: 23746 diff changeset	174
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	175	(>)
18557 60a0f9caa0a2 Provers/classical: stricter checks to ensure that supplied intro, dest and paulson parents: 18447 diff changeset	176	lemma evalc1_None_0 [simp]: "\<langle>s\<rangle> -n\<rightarrow>\<^sub>1 y = (n = 0 \<and> y = \<langle>s\<rangle>)"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	177	by (cases n) auto
4906 0537ee95d004 fixed translations; wenzelm parents: 4897 diff changeset	178
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	179	lemma SKIP_n: "\<langle>\<SKIP>, s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s'\<rangle> \<Longrightarrow> s' = s \<and> n=1"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	180	by (cases n) auto
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	181
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	182	subsection "Equivalence to natural semantics (after Nielson and Nielson)"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	183
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	184	text {*
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	185	We first need two lemmas about semicolon statements:
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	186	decomposition and composition.
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	187	*}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	188	lemma semiD:
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	189	"\<langle>c1; c2, s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s''\<rangle> \<Longrightarrow>
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	190	\<exists>i j s'. \<langle>c1, s\<rangle> -i\<rightarrow>\<^sub>1 \<langle>s'\<rangle> \<and> \<langle>c2, s'\<rangle> -j\<rightarrow>\<^sub>1 \<langle>s''\<rangle> \<and> n = i+j"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 18557 diff changeset	191	proof (induct n arbitrary: c1 c2 s s'')
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	192	case 0
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	193	then show ?case by simp
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	194	next
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	195	case (Suc n)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	196
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	197	from `\<langle>c1; c2, s\<rangle> -Suc n\<rightarrow>\<^sub>1 \<langle>s''\<rangle>`
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	198	obtain co s''' where
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	199	1: "\<langle>c1; c2, s\<rangle> \<longrightarrow>\<^sub>1 (co, s''')" and
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	200	n: "(co, s''') -n\<rightarrow>\<^sub>1 \<langle>s''\<rangle>"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	201	by auto
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	202
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	203	from 1
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	204	show "\<exists>i j s'. \<langle>c1, s\<rangle> -i\<rightarrow>\<^sub>1 \<langle>s'\<rangle> \<and> \<langle>c2, s'\<rangle> -j\<rightarrow>\<^sub>1 \<langle>s''\<rangle> \<and> Suc n = i+j"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	205	(is "\<exists>i j s'. ?Q i j s'")
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	206	proof (cases set: evalc1)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	207	case Semi1
34990 81e8fdfeb849 Adapted to changes in cases method. berghofe parents: 34055 diff changeset	208	from `co = Some c2` and `\<langle>c1, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>s'''\<rangle>` and 1 n
81e8fdfeb849 Adapted to changes in cases method. berghofe parents: 34055 diff changeset	209	have "?Q 1 n s'''" by simp
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	210	thus ?thesis by blast
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	211	next
34990 81e8fdfeb849 Adapted to changes in cases method. berghofe parents: 34055 diff changeset	212	case (Semi2 c1')
81e8fdfeb849 Adapted to changes in cases method. berghofe parents: 34055 diff changeset	213	note c1 = `\<langle>c1, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c1', s'''\<rangle>`
81e8fdfeb849 Adapted to changes in cases method. berghofe parents: 34055 diff changeset	214	with `co = Some (c1'; c2)` and n
81e8fdfeb849 Adapted to changes in cases method. berghofe parents: 34055 diff changeset	215	have "\<langle>c1'; c2, s'''\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s''\<rangle>" by simp
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	216	with Suc.hyps obtain i j s0 where
34990 81e8fdfeb849 Adapted to changes in cases method. berghofe parents: 34055 diff changeset	217	c1': "\<langle>c1',s'''\<rangle> -i\<rightarrow>\<^sub>1 \<langle>s0\<rangle>" and
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	218	c2: "\<langle>c2,s0\<rangle> -j\<rightarrow>\<^sub>1 \<langle>s''\<rangle>" and
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	219	i: "n = i+j"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	220	by fast
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	221
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	222	from c1 c1'
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	223	have "\<langle>c1,s\<rangle> -(i+1)\<rightarrow>\<^sub>1 \<langle>s0\<rangle>" by (auto intro: rel_pow_Suc_I2)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	224	with c2 i
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	225	have "?Q (i+1) j s0" by simp
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	226	thus ?thesis by blast
34990 81e8fdfeb849 Adapted to changes in cases method. berghofe parents: 34055 diff changeset	227	qed
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	228	qed
1700 afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	229
afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	230
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	231	lemma semiI:
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	232	"\<langle>c0,s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s''\<rangle> \<Longrightarrow> \<langle>c1,s''\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle> \<Longrightarrow> \<langle>c0; c1, s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 18557 diff changeset	233	proof (induct n arbitrary: c0 s s'')
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	234	case 0
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	235	from `\<langle>c0,s\<rangle> -(0::nat)\<rightarrow>\<^sub>1 \<langle>s''\<rangle>`
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	236	have False by simp
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	237	thus ?case ..
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	238	next
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	239	case (Suc n)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	240	note c0 = `\<langle>c0,s\<rangle> -Suc n\<rightarrow>\<^sub>1 \<langle>s''\<rangle>`
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	241	note c1 = `\<langle>c1,s''\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>`
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	242	note IH = `\<And>c0 s s''.
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	243	\<langle>c0,s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s''\<rangle> \<Longrightarrow> \<langle>c1,s''\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle> \<Longrightarrow> \<langle>c0; c1,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>`
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	244	from c0 obtain y where
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	245	1: "\<langle>c0,s\<rangle> \<longrightarrow>\<^sub>1 y" and n: "y -n\<rightarrow>\<^sub>1 \<langle>s''\<rangle>" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	246	from 1 obtain c0' s0' where
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	247	"y = \<langle>s0'\<rangle> \<or> y = \<langle>c0', s0'\<rangle>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	248	by (cases y, cases "fst y") auto
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	249	moreover
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	250	{ assume y: "y = \<langle>s0'\<rangle>"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	251	with n have "s'' = s0'" by simp
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	252	with y 1 have "\<langle>c0; c1,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c1, s''\<rangle>" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	253	with c1 have "\<langle>c0; c1,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" by (blast intro: rtrancl_trans)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	254	}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	255	moreover
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	256	{ assume y: "y = \<langle>c0', s0'\<rangle>"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	257	with n have "\<langle>c0', s0'\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s''\<rangle>" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	258	with IH c1 have "\<langle>c0'; c1,s0'\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	259	moreover
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	260	from y 1 have "\<langle>c0; c1,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c0'; c1,s0'\<rangle>" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	261	hence "\<langle>c0; c1,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>c0'; c1,s0'\<rangle>" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	262	ultimately
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	263	have "\<langle>c0; c1,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" by (blast intro: rtrancl_trans)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	264	}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	265	ultimately
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	266	show "\<langle>c0; c1,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	267	qed
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	268
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	269	text {*
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	270	The easy direction of the equivalence proof:
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	271	*}
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	272	lemma evalc_imp_evalc1:
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	273	assumes "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	274	shows "\<langle>c, s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>"
41529 ba60efa2fd08 eliminated global prems; wenzelm parents: 34990 diff changeset	275	using assms
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	276	proof induct
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	277	fix s show "\<langle>\<SKIP>,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s\<rangle>" by auto
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	278	next
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	279	fix x a s show "\<langle>x :== a ,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s[x\<mapsto>a s]\<rangle>" by auto
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	280	next
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	281	fix c0 c1 s s'' s'
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	282	assume "\<langle>c0,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s''\<rangle>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	283	then obtain n where "\<langle>c0,s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s''\<rangle>" by (blast dest: rtrancl_imp_rel_pow)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	284	moreover
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	285	assume "\<langle>c1,s''\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	286	ultimately
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	287	show "\<langle>c0; c1,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" by (rule semiI)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	288	next
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	289	fix s::state and b c0 c1 s'
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	290	assume "b s"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	291	hence "\<langle>\<IF> b \<THEN> c0 \<ELSE> c1,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c0,s\<rangle>" by simp
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	292	also assume "\<langle>c0,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	293	finally show "\<langle>\<IF> b \<THEN> c0 \<ELSE> c1,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" .
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	294	next
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	295	fix s::state and b c0 c1 s'
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	296	assume "\<not>b s"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	297	hence "\<langle>\<IF> b \<THEN> c0 \<ELSE> c1,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c1,s\<rangle>" by simp
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	298	also assume "\<langle>c1,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	299	finally show "\<langle>\<IF> b \<THEN> c0 \<ELSE> c1,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" .
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	300	next
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	301	fix b c and s::state
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	302	assume b: "\<not>b s"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	303	let ?if = "\<IF> b \<THEN> c; \<WHILE> b \<DO> c \<ELSE> \<SKIP>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	304	have "\<langle>\<WHILE> b \<DO> c,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>?if, s\<rangle>" by blast
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	305	also have "\<langle>?if,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>\<SKIP>, s\<rangle>" by (simp add: b)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	306	also have "\<langle>\<SKIP>, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>s\<rangle>" by blast
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	307	finally show "\<langle>\<WHILE> b \<DO> c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s\<rangle>" ..
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	308	next
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	309	fix b c s s'' s'
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	310	let ?w = "\<WHILE> b \<DO> c"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	311	let ?if = "\<IF> b \<THEN> c; ?w \<ELSE> \<SKIP>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	312	assume w: "\<langle>?w,s''\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	313	assume c: "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s''\<rangle>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	314	assume b: "b s"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	315	have "\<langle>?w,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>?if, s\<rangle>" by blast
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	316	also have "\<langle>?if, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c; ?w, s\<rangle>" by (simp add: b)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	317	also
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	318	from c obtain n where "\<langle>c,s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s''\<rangle>" by (blast dest: rtrancl_imp_rel_pow)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	319	with w have "\<langle>c; ?w,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" by - (rule semiI)
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	320	finally show "\<langle>\<WHILE> b \<DO> c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" ..
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	321	qed
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	322
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	323	text {*
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	324	Finally, the equivalence theorem:
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	325	*}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	326	theorem evalc_equiv_evalc1:
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	327	"\<langle>c, s\<rangle> \<longrightarrow>\<^sub>c s' = \<langle>c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	328	proof
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	329	assume "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 22267 diff changeset	330	then show "\<langle>c, s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>" by (rule evalc_imp_evalc1)
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	331	next
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	332	assume "\<langle>c, s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s'\<rangle>"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	333	then obtain n where "\<langle>c, s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s'\<rangle>" by (blast dest: rtrancl_imp_rel_pow)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	334	moreover
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	335	have "\<langle>c, s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s'\<rangle> \<Longrightarrow> \<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 18557 diff changeset	336	proof (induct arbitrary: c s s' rule: less_induct)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	337	fix n
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	338	assume IH: "\<And>m c s s'. m < n \<Longrightarrow> \<langle>c,s\<rangle> -m\<rightarrow>\<^sub>1 \<langle>s'\<rangle> \<Longrightarrow> \<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	339	fix c s s'
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	340	assume c: "\<langle>c, s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>s'\<rangle>"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	341	then obtain m where n: "n = Suc m" by (cases n) auto
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	342	with c obtain y where
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	343	c': "\<langle>c, s\<rangle> \<longrightarrow>\<^sub>1 y" and m: "y -m\<rightarrow>\<^sub>1 \<langle>s'\<rangle>" by blast
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	344	show "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	345	proof (cases c)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	346	case SKIP
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	347	with c n show ?thesis by auto
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	348	next
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	349	case Assign
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	350	with c n show ?thesis by auto
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	351	next
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	352	fix c1 c2 assume semi: "c = (c1; c2)"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	353	with c obtain i j s'' where
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	354	c1: "\<langle>c1, s\<rangle> -i\<rightarrow>\<^sub>1 \<langle>s''\<rangle>" and
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	355	c2: "\<langle>c2, s''\<rangle> -j\<rightarrow>\<^sub>1 \<langle>s'\<rangle>" and
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	356	ij: "n = i+j"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	357	by (blast dest: semiD)
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	358	from c1 c2 obtain
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	359	"0 < i" and "0 < j" by (cases i, auto, cases j, auto)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	360	with ij obtain
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	361	i: "i < n" and j: "j < n" by simp
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	362	from IH i c1
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	363	have "\<langle>c1,s\<rangle> \<longrightarrow>\<^sub>c s''" .
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	364	moreover
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	365	from IH j c2
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	366	have "\<langle>c2,s''\<rangle> \<longrightarrow>\<^sub>c s'" .
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	367	moreover
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	368	note semi
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	369	ultimately
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	370	show "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	371	next
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	372	fix b c1 c2 assume If: "c = \<IF> b \<THEN> c1 \<ELSE> c2"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	373	{ assume True: "b s = True"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	374	with If c n
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	375	have "\<langle>c1,s\<rangle> -m\<rightarrow>\<^sub>1 \<langle>s'\<rangle>" by auto
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	376	with n IH
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	377	have "\<langle>c1,s\<rangle> \<longrightarrow>\<^sub>c s'" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	378	with If True
34055 fdf294ee08b2 streamlined proofs paulson parents: 30952 diff changeset	379	have "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'" by blast
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	380	}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	381	moreover
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	382	{ assume False: "b s = False"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	383	with If c n
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	384	have "\<langle>c2,s\<rangle> -m\<rightarrow>\<^sub>1 \<langle>s'\<rangle>" by auto
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	385	with n IH
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	386	have "\<langle>c2,s\<rangle> \<longrightarrow>\<^sub>c s'" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	387	with If False
34055 fdf294ee08b2 streamlined proofs paulson parents: 30952 diff changeset	388	have "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'" by blast
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	389	}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	390	ultimately
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	391	show "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'" by (cases "b s") auto
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	392	next
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	393	fix b c' assume w: "c = \<WHILE> b \<DO> c'"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	394	with c n
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	395	have "\<langle>\<IF> b \<THEN> c'; \<WHILE> b \<DO> c' \<ELSE> \<SKIP>,s\<rangle> -m\<rightarrow>\<^sub>1 \<langle>s'\<rangle>"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	396	(is "\<langle>?if,_\<rangle> -m\<rightarrow>\<^sub>1 _") by auto
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	397	with n IH
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	398	have "\<langle>\<IF> b \<THEN> c'; \<WHILE> b \<DO> c' \<ELSE> \<SKIP>,s\<rangle> \<longrightarrow>\<^sub>c s'" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	399	moreover note unfold_while [of b c']
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	400	-- {* @{thm unfold_while [of b c']} *}
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	401	ultimately
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	402	have "\<langle>\<WHILE> b \<DO> c',s\<rangle> \<longrightarrow>\<^sub>c s'" by (blast dest: equivD2)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	403	with w show "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'" by simp
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	404	qed
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	405	qed
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	406	ultimately
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	407	show "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s'" by blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	408	qed
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	409
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	410
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	411	subsection "Winskel's Proof"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	412
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	413	declare rel_pow_0_E [elim!]
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	414
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	415	text {*
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	416	Winskel's small step rules are a bit different \cite{Winskel};
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	417	we introduce their equivalents as derived rules:
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	418	*}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	419	lemma whileFalse1 [intro]:
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	420	"\<not> b s \<Longrightarrow> \<langle>\<WHILE> b \<DO> c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s\<rangle>" (is "_ \<Longrightarrow> \<langle>?w, s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s\<rangle>")
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	421	proof -
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	422	assume "\<not>b s"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	423	have "\<langle>?w, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>\<IF> b \<THEN> c;?w \<ELSE> \<SKIP>, s\<rangle>" ..
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 22267 diff changeset	424	also from `\<not>b s` have "\<langle>\<IF> b \<THEN> c;?w \<ELSE> \<SKIP>, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>\<SKIP>, s\<rangle>" ..
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	425	also have "\<langle>\<SKIP>, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>s\<rangle>" ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	426	finally show "\<langle>?w, s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s\<rangle>" ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	427	qed
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	428
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	429	lemma whileTrue1 [intro]:
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	430	"b s \<Longrightarrow> \<langle>\<WHILE> b \<DO> c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>c;\<WHILE> b \<DO> c, s\<rangle>"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	431	(is "_ \<Longrightarrow> \<langle>?w, s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>c;?w,s\<rangle>")
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	432	proof -
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	433	assume "b s"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	434	have "\<langle>?w, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>\<IF> b \<THEN> c;?w \<ELSE> \<SKIP>, s\<rangle>" ..
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 22267 diff changeset	435	also from `b s` have "\<langle>\<IF> b \<THEN> c;?w \<ELSE> \<SKIP>, s\<rangle> \<longrightarrow>\<^sub>1 \<langle>c;?w, s\<rangle>" ..
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	436	finally show "\<langle>?w, s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>c;?w,s\<rangle>" ..
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	437	qed
1700 afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	438
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	439	inductive_cases evalc1_SEs:
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	440	"\<langle>\<SKIP>,s\<rangle> \<longrightarrow>\<^sub>1 (co, s')"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	441	"\<langle>x:==a,s\<rangle> \<longrightarrow>\<^sub>1 (co, s')"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	442	"\<langle>c1;c2, s\<rangle> \<longrightarrow>\<^sub>1 (co, s')"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	443	"\<langle>\<IF> b \<THEN> c1 \<ELSE> c2, s\<rangle> \<longrightarrow>\<^sub>1 (co, s')"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	444	"\<langle>\<WHILE> b \<DO> c, s\<rangle> \<longrightarrow>\<^sub>1 (co, s')"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	445
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	446	inductive_cases evalc1_E: "\<langle>\<WHILE> b \<DO> c, s\<rangle> \<longrightarrow>\<^sub>1 (co, s')"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	447
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	448	declare evalc1_SEs [elim!]
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	449
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	450	lemma evalc_impl_evalc1: "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s1 \<Longrightarrow> \<langle>c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s1\<rangle>"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	451	apply (induct set: evalc)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	452
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	453	-- SKIP
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	454	apply blast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	455
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	456	-- ASSIGN
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	457	apply fast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	458
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	459	-- SEMI
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	460	apply (fast dest: rtrancl_imp_UN_rel_pow intro: semiI)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	461
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	462	-- IF
12566 fe20540bcf93 renamed rtrancl_into_rtrancl2 to converse_rtrancl_into_rtrancl nipkow parents: 12546 diff changeset	463	apply (fast intro: converse_rtrancl_into_rtrancl)
fe20540bcf93 renamed rtrancl_into_rtrancl2 to converse_rtrancl_into_rtrancl nipkow parents: 12546 diff changeset	464	apply (fast intro: converse_rtrancl_into_rtrancl)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	465
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	466	-- WHILE
34055 fdf294ee08b2 streamlined proofs paulson parents: 30952 diff changeset	467	apply blast
fdf294ee08b2 streamlined proofs paulson parents: 30952 diff changeset	468	apply (blast dest: rtrancl_imp_UN_rel_pow intro: converse_rtrancl_into_rtrancl semiI)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	469
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	470	done
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	471
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	472
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	473	lemma lemma2:
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	474	"\<langle>c;d,s\<rangle> -n\<rightarrow>\<^sub>1 \<langle>u\<rangle> \<Longrightarrow> \<exists>t m. \<langle>c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>t\<rangle> \<and> \<langle>d,t\<rangle> -m\<rightarrow>\<^sub>1 \<langle>u\<rangle> \<and> m \<le> n"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 18557 diff changeset	475	apply (induct n arbitrary: c d s u)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	476	-- "case n = 0"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	477	apply fastsimp
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	478	-- "induction step"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	479	apply (fast intro!: le_SucI le_refl dest!: rel_pow_Suc_D2
12566 fe20540bcf93 renamed rtrancl_into_rtrancl2 to converse_rtrancl_into_rtrancl nipkow parents: 12546 diff changeset	480	elim!: rel_pow_imp_rtrancl converse_rtrancl_into_rtrancl)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	481	done
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	482
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	483	lemma evalc1_impl_evalc:
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	484	"\<langle>c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>t\<rangle> \<Longrightarrow> \<langle>c,s\<rangle> \<longrightarrow>\<^sub>c t"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 18557 diff changeset	485	apply (induct c arbitrary: s t)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	486	apply (safe dest!: rtrancl_imp_UN_rel_pow)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	487
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	488	-- SKIP
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	489	apply (simp add: SKIP_n)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	490
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	491	-- ASSIGN
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	492	apply (fastsimp elim: rel_pow_E2)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	493
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	494	-- SEMI
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	495	apply (fast dest!: rel_pow_imp_rtrancl lemma2)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	496
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	497	-- IF
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	498	apply (erule rel_pow_E2)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	499	apply simp
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	500	apply (fast dest!: rel_pow_imp_rtrancl)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	501
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	502	-- "WHILE, induction on the length of the computation"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	503	apply (rename_tac b c s t n)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	504	apply (erule_tac P = "?X -n\<rightarrow>\<^sub>1 ?Y" in rev_mp)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	505	apply (rule_tac x = "s" in spec)
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	506	apply (induct_tac n rule: nat_less_induct)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	507	apply (intro strip)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	508	apply (erule rel_pow_E2)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	509	apply simp
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 23373 diff changeset	510	apply (simp only: split_paired_all)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	511	apply (erule evalc1_E)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	512
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	513	apply simp
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	514	apply (case_tac "b x")
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	515	-- WhileTrue
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	516	apply (erule rel_pow_E2)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	517	apply simp
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	518	apply (clarify dest!: lemma2)
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	519	apply atomize
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	520	apply (erule allE, erule allE, erule impE, assumption)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	521	apply (erule_tac x=mb in allE, erule impE, fastsimp)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	522	apply blast
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	523	-- WhileFalse
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	524	apply (erule rel_pow_E2)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	525	apply simp
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	526	apply (simp add: SKIP_n)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	527	done
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	528
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	529
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	530	text {* proof of the equivalence of evalc and evalc1 *}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	531	lemma evalc1_eq_evalc: "(\<langle>c, s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>t\<rangle>) = (\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c t)"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	532	by (fast elim!: evalc1_impl_evalc evalc_impl_evalc1)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	533
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	534
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	535	subsection "A proof without n"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	536
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	537	text {*
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	538	The inductions are a bit awkward to write in this section,
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	539	because @{text None} as result statement in the small step
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	540	semantics doesn't have a direct counterpart in the big step
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	541	semantics.
1700 afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	542
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	543	Winskel's small step rule set (using the @{text "\<SKIP>"} statement
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	544	to indicate termination) is better suited for this proof.
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	545	*}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	546
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	547	lemma my_lemma1:
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	548	assumes "\<langle>c1,s1\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s2\<rangle>"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	549	and "\<langle>c2,s2\<rangle> \<longrightarrow>\<^sub>1\<^sup>* cs3"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	550	shows "\<langle>c1;c2,s1\<rangle> \<longrightarrow>\<^sub>1\<^sup>* cs3"
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	551	proof -
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	552	-- {* The induction rule needs @{text P} to be a function of @{term "Some c1"} *}
41529 ba60efa2fd08 eliminated global prems; wenzelm parents: 34990 diff changeset	553	from assms
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	554	have "\<langle>(\<lambda>c. if c = None then c2 else the c; c2) (Some c1),s1\<rangle> \<longrightarrow>\<^sub>1\<^sup>* cs3"
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	555	apply (induct rule: converse_rtrancl_induct2)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	556	apply simp
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	557	apply (rename_tac c s')
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	558	apply simp
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	559	apply (rule conjI)
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	560	apply fast
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	561	apply clarify
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	562	apply (case_tac c)
12566 fe20540bcf93 renamed rtrancl_into_rtrancl2 to converse_rtrancl_into_rtrancl nipkow parents: 12546 diff changeset	563	apply (auto intro: converse_rtrancl_into_rtrancl)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	564	done
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	565	then show ?thesis by simp
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	566	qed
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	567
13524 604d0f3622d6 * empty log message * wenzelm parents: 12566 diff changeset	568	lemma evalc_impl_evalc1': "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>c s1 \<Longrightarrow> \<langle>c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>s1\<rangle>"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	569	apply (induct set: evalc)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	570
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	571	-- SKIP
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	572	apply fast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	573
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	574	-- ASSIGN
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	575	apply fast
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	576
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	577	-- SEMI
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	578	apply (fast intro: my_lemma1)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	579
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	580	-- IF
12566 fe20540bcf93 renamed rtrancl_into_rtrancl2 to converse_rtrancl_into_rtrancl nipkow parents: 12546 diff changeset	581	apply (fast intro: converse_rtrancl_into_rtrancl)
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	582	apply (fast intro: converse_rtrancl_into_rtrancl)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	583
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	584	-- WHILE
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	585	apply fast
12566 fe20540bcf93 renamed rtrancl_into_rtrancl2 to converse_rtrancl_into_rtrancl nipkow parents: 12546 diff changeset	586	apply (fast intro: converse_rtrancl_into_rtrancl my_lemma1)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	587
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	588	done
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	589
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	590	text {*
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	591	The opposite direction is based on a Coq proof done by Ranan Fraer and
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	592	Yves Bertot. The following sketch is from an email by Ranan Fraer.
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	593
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	594	\begin{verbatim}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	595	First we've broke it into 2 lemmas:
1700 afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	596
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	597	Lemma 1
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	598	((c,s) --> (SKIP,t)) => (<c,s> -c-> t)
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	599
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	600	This is a quick one, dealing with the cases skip, assignment
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	601	and while_false.
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	602
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	603	Lemma 2
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	604	((c,s) -*-> (c',s')) /\ <c',s'> -c'-> t
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	605	=>
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	606	<c,s> -c-> t
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	607
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	608	This is proved by rule induction on the -*-> relation
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	609	and the induction step makes use of a third lemma:
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	610
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	611	Lemma 3
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	612	((c,s) --> (c',s')) /\ <c',s'> -c'-> t
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	613	=>
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	614	<c,s> -c-> t
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	615
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	616	This captures the essence of the proof, as it shows that <c',s'>
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	617	behaves as the continuation of <c,s> with respect to the natural
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	618	semantics.
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	619	The proof of Lemma 3 goes by rule induction on the --> relation,
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	620	dealing with the cases sequence1, sequence2, if_true, if_false and
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	621	while_true. In particular in the case (sequence1) we make use again
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	622	of Lemma 1.
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	623	\end{verbatim}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	624	*}
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	625
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	626	inductive_cases evalc1_term_cases: "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>1 \<langle>s'\<rangle>"
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	627
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	628	lemma FB_lemma3:
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	629	"(c,s) \<longrightarrow>\<^sub>1 (c',s') \<Longrightarrow> c \<noteq> None \<Longrightarrow>
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	630	\<langle>if c'=None then \<SKIP> else the c',s'\<rangle> \<longrightarrow>\<^sub>c t \<Longrightarrow> \<langle>the c,s\<rangle> \<longrightarrow>\<^sub>c t"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 18557 diff changeset	631	by (induct arbitrary: t set: evalc1)
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	632	(auto elim!: evalc1_term_cases equivD2 [OF unfold_while])
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	633
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	634	lemma FB_lemma2:
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	635	"(c,s) \<longrightarrow>\<^sub>1\<^sup>* (c',s') \<Longrightarrow> c \<noteq> None \<Longrightarrow>
2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	636	\<langle>if c' = None then \<SKIP> else the c',s'\<rangle> \<longrightarrow>\<^sub>c t \<Longrightarrow> \<langle>the c,s\<rangle> \<longrightarrow>\<^sub>c t"
18447 da548623916a removed or modified some instances of [iff] paulson parents: 18372 diff changeset	637	apply (induct rule: converse_rtrancl_induct2, force)
12434 ff2efde4574d tuned kleing parents: 12431 diff changeset	638	apply (fastsimp elim!: evalc1_term_cases intro: FB_lemma3)
12431 07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	639	done
07ec657249e5 converted to Isar kleing parents: 9364 diff changeset	640
13524 604d0f3622d6 * empty log message * wenzelm parents: 12566 diff changeset	641	lemma evalc1_impl_evalc': "\<langle>c,s\<rangle> \<longrightarrow>\<^sub>1\<^sup>* \<langle>t\<rangle> \<Longrightarrow> \<langle>c,s\<rangle> \<longrightarrow>\<^sub>c t"
18372 2bffdf62fe7f tuned proofs; wenzelm parents: 16417 diff changeset	642	by (fastsimp dest: FB_lemma2)
1700 afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	643
afd3b60660db Natural and Transition semantics. nipkow parents: diff changeset	644	end

author	krauss
	Wed, 02 Feb 2011 08:47:45 +0100
changeset 41686	d8efc2490b8e
parent 41529	ba60efa2fd08
permissions	-rw-r--r--