isabelle: src/HOL/Induct/Comb.thy@d3e1d554cd6d (annotated)

13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	1	(* Title: HOL/Induct/Comb.thy
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	2	ID: $Id$
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	3	Author: Lawrence C Paulson
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	4	Copyright 1996 University of Cambridge
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	5	*)
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	6
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	7	header {* Combinatory Logic example: the Church-Rosser Theorem *}
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	8
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	9	theory Comb = Main:
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	10
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	11	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	12	Curiously, combinators do not include free variables.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	13
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	14	Example taken from \cite{camilleri-melham}.
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	15
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	16	HOL system proofs may be found in the HOL distribution at
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	17	.../contrib/rule-induction/cl.ml
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	18	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	19
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	20	subsection {* Definitions *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	21
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	22	text {* Datatype definition of combinators @{text S} and @{text K}. *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	23
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	24	datatype comb = K
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	25	\| S
11359 29f8b00d7e1f renamed # to ## to avoid clashing with List cons paulson parents: 9101 diff changeset	26	\| "##" comb comb (infixl 90)
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	27
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	28	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	29	Inductive definition of contractions, @{text "-1->"} and
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	30	(multi-step) reductions, @{text "--->"}.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	31	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	32
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	33	consts
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	34	contract :: "(comb*comb) set"
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	35	"-1->" :: "[comb,comb] => bool" (infixl 50)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	36	"--->" :: "[comb,comb] => bool" (infixl 50)
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	37
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	38	translations
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	39	"x -1-> y" == "(x,y) \<in> contract"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	40	"x ---> y" == "(x,y) \<in> contract^*"
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	41
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	42	inductive contract
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	43	intros
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	44	K: "K##x##y -1-> x"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	45	S: "S##x##y##z -1-> (x##z)##(y##z)"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	46	Ap1: "x-1->y ==> x##z -1-> y##z"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	47	Ap2: "x-1->y ==> z##x -1-> z##y"
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	48
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	49	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	50	Inductive definition of parallel contractions, @{text "=1=>"} and
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	51	(multi-step) parallel reductions, @{text "===>"}.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	52	*}
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	53
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	54	consts
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	55	parcontract :: "(comb*comb) set"
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	56	"=1=>" :: "[comb,comb] => bool" (infixl 50)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	57	"===>" :: "[comb,comb] => bool" (infixl 50)
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	58
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	59	translations
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	60	"x =1=> y" == "(x,y) \<in> parcontract"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	61	"x ===> y" == "(x,y) \<in> parcontract^*"
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	62
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	63	inductive parcontract
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	64	intros
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	65	refl: "x =1=> x"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	66	K: "K##x##y =1=> x"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	67	S: "S##x##y##z =1=> (x##z)##(y##z)"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	68	Ap: "[\| x=1=>y; z=1=>w \|] ==> x##z =1=> y##w"
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	69
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	70	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	71	Misc definitions.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	72	*}
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	73
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	74	constdefs
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	75	I :: comb
11359 29f8b00d7e1f renamed # to ## to avoid clashing with List cons paulson parents: 9101 diff changeset	76	"I == S##K##K"
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	77
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	78	diamond :: "('a * 'a)set => bool"
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	79	--{confluence; Lambda/Commutation treats this more abstractly}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	80	"diamond(r) == \<forall>x y. (x,y) \<in> r -->
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	81	(\<forall>y'. (x,y') \<in> r -->
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	82	(\<exists>z. (y,z) \<in> r & (y',z) \<in> r))"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	83
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	84
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	85	subsection {Reflexive/Transitive closure preserves Church-Rosser property}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	86
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	87	text{So does the Transitive closure, with a similar proof}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	88
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	89	text{*Strip lemma.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	90	The induction hypothesis covers all but the last diamond of the strip.*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	91	lemma diamond_strip_lemmaE [rule_format]:
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	92	"[\| diamond(r); (x,y) \<in> r^* \|] ==>
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	93	\<forall>y'. (x,y') \<in> r --> (\<exists>z. (y',z) \<in> r^* & (y,z) \<in> r)"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	94	apply (unfold diamond_def)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	95	apply (erule rtrancl_induct, blast, clarify)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	96	apply (drule spec, drule mp, assumption)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	97	apply (blast intro: rtrancl_trans [OF _ r_into_rtrancl])
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	98	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	99
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	100	lemma diamond_rtrancl: "diamond(r) ==> diamond(r^*)"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	101	apply (simp (no_asm_simp) add: diamond_def)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	102	apply (rule impI [THEN allI, THEN allI])
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	103	apply (erule rtrancl_induct, blast)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	104	apply (best intro: rtrancl_trans [OF _ r_into_rtrancl]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	105	elim: diamond_strip_lemmaE [THEN exE])
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	106	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	107
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	108
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	109	subsection {* Non-contraction results *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	110
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	111	text {* Derive a case for each combinator constructor. *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	112
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	113	inductive_cases
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	114	K_contractE [elim!]: "K -1-> r"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	115	and S_contractE [elim!]: "S -1-> r"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	116	and Ap_contractE [elim!]: "p##q -1-> r"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	117
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	118	declare contract.K [intro!] contract.S [intro!]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	119	declare contract.Ap1 [intro] contract.Ap2 [intro]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	120
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	121	lemma I_contract_E [elim!]: "I -1-> z ==> P"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	122	by (unfold I_def, blast)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	123
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	124	lemma K1_contractD [elim!]: "K##x -1-> z ==> (\<exists>x'. z = K##x' & x -1-> x')"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	125	by blast
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	126
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	127	lemma Ap_reduce1 [intro]: "x ---> y ==> x##z ---> y##z"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	128	apply (erule rtrancl_induct)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	129	apply (blast intro: rtrancl_trans)+
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	130	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	131
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	132	lemma Ap_reduce2 [intro]: "x ---> y ==> z##x ---> z##y"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	133	apply (erule rtrancl_induct)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	134	apply (blast intro: rtrancl_trans)+
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	135	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	136
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	137	( Counterexample to the diamond property for -1-> )
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	138
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	139	lemma KIII_contract1: "K##I##(I##I) -1-> I"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	140	by (rule contract.K)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	141
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	142	lemma KIII_contract2: "K##I##(I##I) -1-> K##I##((K##I)##(K##I))"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	143	by (unfold I_def, blast)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	144
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	145	lemma KIII_contract3: "K##I##((K##I)##(K##I)) -1-> I"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	146	by blast
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	147
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	148	lemma not_diamond_contract: "~ diamond(contract)"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	149	apply (unfold diamond_def)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	150	apply (best intro: KIII_contract1 KIII_contract2 KIII_contract3)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	151	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	152
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	153
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	154	subsection {* Results about Parallel Contraction *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	155
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	156	text {* Derive a case for each combinator constructor. *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	157
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	158	inductive_cases
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	159	K_parcontractE [elim!]: "K =1=> r"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	160	and S_parcontractE [elim!]: "S =1=> r"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	161	and Ap_parcontractE [elim!]: "p##q =1=> r"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	162
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	163	declare parcontract.intros [intro]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	164
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	165	(* Basic properties of parallel contraction *)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	166
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	167	subsection {* Basic properties of parallel contraction *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	168
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	169	lemma K1_parcontractD [dest!]: "K##x =1=> z ==> (\<exists>x'. z = K##x' & x =1=> x')"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	170	by blast
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	171
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	172	lemma S1_parcontractD [dest!]: "S##x =1=> z ==> (\<exists>x'. z = S##x' & x =1=> x')"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	173	by blast
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	174
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	175	lemma S2_parcontractD [dest!]:
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	176	"S##x##y =1=> z ==> (\<exists>x' y'. z = S##x'##y' & x =1=> x' & y =1=> y')"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	177	by blast
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	178
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	179	text{The rules above are not essential but make proofs much faster}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	180
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	181	text{Church-Rosser property for parallel contraction}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	182	lemma diamond_parcontract: "diamond parcontract"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	183	apply (unfold diamond_def)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	184	apply (rule impI [THEN allI, THEN allI])
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	185	apply (erule parcontract.induct, fast+)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	186	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	187
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	188	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	189	\medskip Equivalence of @{prop "p ---> q"} and @{prop "p ===> q"}.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	190	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	191
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	192	lemma contract_subset_parcontract: "contract <= parcontract"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	193	apply (rule subsetI)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	194	apply (simp only: split_tupled_all)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	195	apply (erule contract.induct, blast+)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	196	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	197
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	198	text{*Reductions: simply throw together reflexivity, transitivity and
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	199	the one-step reductions*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	200
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	201	declare r_into_rtrancl [intro] rtrancl_trans [intro]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	202
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	203	(Example only: not used)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	204	lemma reduce_I: "I##x ---> x"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	205	by (unfold I_def, blast)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	206
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	207	lemma parcontract_subset_reduce: "parcontract <= contract^*"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	208	apply (rule subsetI)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	209	apply (simp only: split_tupled_all)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	210	apply (erule parcontract.induct , blast+)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	211	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	212
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	213	lemma reduce_eq_parreduce: "contract^* = parcontract^*"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	214	by (rule equalityI contract_subset_parcontract [THEN rtrancl_mono]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	215	parcontract_subset_reduce [THEN rtrancl_subset_rtrancl])+
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	216
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	217	lemma diamond_reduce: "diamond(contract^*)"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 11359 diff changeset	218	by (simp add: reduce_eq_parreduce diamond_rtrancl diamond_parcontract)
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	219
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	220	end

author	paulson
	Tue, 02 Apr 2002 14:28:28 +0200
changeset 13075	d3e1d554cd6d
parent 11359	29f8b00d7e1f
child 15816	4575c87dd25b
permissions	-rw-r--r--