isabelle: src/HOL/Lambda/ParRed.thy@61dd8c145da7 (annotated)

1120 ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	1	(* Title: HOL/Lambda/ParRed.thy
ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	2	Author: Tobias Nipkow
ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	3	Copyright 1995 TU Muenchen
ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	4
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	5	Properties of => and "cd", in particular the diamond property of => and
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	6	confluence of beta.
1120 ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	7	*)
ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	8
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	9	header {* Parallel reduction and a complete developments *}
1120 ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	10
16417 9bc16273c2d4 migrated theory headers to new format haftmann parents: 12011 diff changeset	11	theory ParRed imports Lambda Commutation begin
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	12
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	13
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	14	subsection {* Parallel reduction *}
1120 ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	15
23750 a1db5f819d00 - Renamed inductive2 to inductive berghofe parents: 22271 diff changeset	16	inductive par_beta :: "[dB, dB] => bool" (infixl "=>" 50)
22271 51a80e238b29 Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	17	where
51a80e238b29 Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	18	var [simp, intro!]: "Var n => Var n"
51a80e238b29 Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	19	\| abs [simp, intro!]: "s => t ==> Abs s => Abs t"
51a80e238b29 Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	20	\| app [simp, intro!]: "[\| s => s'; t => t' \|] ==> s \<degree> t => s' \<degree> t'"
51a80e238b29 Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	21	\| beta [simp, intro!]: "[\| s => s'; t => t' \|] ==> (Abs s) \<degree> t => s'[t'/0]"
1120 ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	22
23750 a1db5f819d00 - Renamed inductive2 to inductive berghofe parents: 22271 diff changeset	23	inductive_cases par_beta_cases [elim!]:
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	24	"Var n => t"
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	25	"Abs s => Abs t"
12011 1a3a7b3cd9bb tuned notation (degree instead of dollar); wenzelm parents: 11638 diff changeset	26	"(Abs s) \<degree> t => u"
1a3a7b3cd9bb tuned notation (degree instead of dollar); wenzelm parents: 11638 diff changeset	27	"s \<degree> t => u"
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	28	"Abs s => t"
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	29
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	30
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	31	subsection {* Inclusions *}
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	32
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	33	text {* @{text "beta \<subseteq> par_beta \<subseteq> beta^"} \medskip }
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	34
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	35	lemma par_beta_varL [simp]:
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	36	"(Var n => t) = (t = Var n)"
18241 afdba6b3e383 tuned induction proofs; wenzelm parents: 16417 diff changeset	37	by blast
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	38
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	39	lemma par_beta_refl [simp]: "t => t" (* par_beta_refl [intro!] causes search to blow up *)
18241 afdba6b3e383 tuned induction proofs; wenzelm parents: 16417 diff changeset	40	by (induct t) simp_all
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	41
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	42	lemma beta_subset_par_beta: "beta <= par_beta"
22271 51a80e238b29 Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	43	apply (rule predicate2I)
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	44	apply (erule beta.induct)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	45	apply (blast intro!: par_beta_refl)+
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	46	done
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	47
22271 51a80e238b29 Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	48	lemma par_beta_subset_beta: "par_beta <= beta^**"
51a80e238b29 Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	49	apply (rule predicate2I)
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	50	apply (erule par_beta.induct)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	51	apply blast
23750 a1db5f819d00 - Renamed inductive2 to inductive berghofe parents: 22271 diff changeset	52	apply (blast del: rtranclp.rtrancl_refl intro: rtranclp.rtrancl_into_rtrancl)+
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	53	-- {* @{thm[source] rtrancl_refl} complicates the proof by increasing the branching factor *}
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	54	done
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	55
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	56
25972 94b15338da8d tuned document; wenzelm parents: 23750 diff changeset	57	subsection {* Misc properties of @{text "par_beta"} *}
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	58
18241 afdba6b3e383 tuned induction proofs; wenzelm parents: 16417 diff changeset	59	lemma par_beta_lift [simp]:
afdba6b3e383 tuned induction proofs; wenzelm parents: 16417 diff changeset	60	"t => t' \<Longrightarrow> lift t n => lift t' n"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 19363 diff changeset	61	by (induct t arbitrary: t' n) fastsimp+
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	62
18241 afdba6b3e383 tuned induction proofs; wenzelm parents: 16417 diff changeset	63	lemma par_beta_subst:
afdba6b3e383 tuned induction proofs; wenzelm parents: 16417 diff changeset	64	"s => s' \<Longrightarrow> t => t' \<Longrightarrow> t[s/n] => t'[s'/n]"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 19363 diff changeset	65	apply (induct t arbitrary: s s' t' n)
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	66	apply (simp add: subst_Var)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	67	apply (erule par_beta_cases)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	68	apply simp
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	69	apply (simp add: subst_subst [symmetric])
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	70	apply (fastsimp intro!: par_beta_lift)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	71	apply fastsimp
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	72	done
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	73
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	74
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	75	subsection {* Confluence (directly) *}
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	76
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	77	lemma diamond_par_beta: "diamond par_beta"
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	78	apply (unfold diamond_def commute_def square_def)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	79	apply (rule impI [THEN allI [THEN allI]])
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	80	apply (erule par_beta.induct)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	81	apply (blast intro!: par_beta_subst)+
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	82	done
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	83
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	84
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	85	subsection {* Complete developments *}
1120 ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	86
35440 bdf8ad377877 killed more recdefs krauss parents: 25972 diff changeset	87	fun
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	88	"cd" :: "dB => dB"
35440 bdf8ad377877 killed more recdefs krauss parents: 25972 diff changeset	89	where
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	90	"cd (Var n) = Var n"
35440 bdf8ad377877 killed more recdefs krauss parents: 25972 diff changeset	91	\| "cd (Var n \<degree> t) = Var n \<degree> cd t"
bdf8ad377877 killed more recdefs krauss parents: 25972 diff changeset	92	\| "cd ((s1 \<degree> s2) \<degree> t) = cd (s1 \<degree> s2) \<degree> cd t"
bdf8ad377877 killed more recdefs krauss parents: 25972 diff changeset	93	\| "cd (Abs u \<degree> t) = (cd u)[cd t/0]"
bdf8ad377877 killed more recdefs krauss parents: 25972 diff changeset	94	\| "cd (Abs s) = Abs (cd s)"
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	95
18241 afdba6b3e383 tuned induction proofs; wenzelm parents: 16417 diff changeset	96	lemma par_beta_cd: "s => t \<Longrightarrow> t => cd s"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 19363 diff changeset	97	apply (induct s arbitrary: t rule: cd.induct)
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	98	apply auto
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	99	apply (fast intro!: par_beta_subst)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	100	done
1120 ff7dd80513e6 Lambda calculus in de Bruijn notation. nipkow parents: diff changeset	101
9811 39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	102
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	103	subsection {* Confluence (via complete developments) *}
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	104
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	105	lemma diamond_par_beta2: "diamond par_beta"
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	106	apply (unfold diamond_def commute_def square_def)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	107	apply (blast intro: par_beta_cd)
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	108	done
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	109
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	110	theorem beta_confluent: "confluent beta"
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	111	apply (rule diamond_par_beta2 diamond_to_confluence
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	112	par_beta_subset_beta beta_subset_par_beta)+
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	113	done
39ffdb8cab03 HOL/Lambda: converted into new-style theory and document; wenzelm parents: 8624 diff changeset	114
11638 2c3dee321b4b inductive: no collective atts; wenzelm parents: 9941 diff changeset	115	end

author	haftmann
	Fri, 11 Jun 2010 17:14:02 +0200
changeset 37407	61dd8c145da7
parent 36862	952b2b102a0a
permissions	-rw-r--r--