isabelle: src/HOL/Induct/PropLog.thy@a89b4bc311a5 (annotated)

13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	1	(* Title: HOL/Induct/PropLog.thy
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	2	Author: Tobias Nipkow
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	3	Copyright 1994 TU Muenchen & University of Cambridge
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	4	*)
c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	5
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	6	header {* Meta-theory of propositional logic *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	7
16417 9bc16273c2d4 migrated theory headers to new format haftmann parents: 13075 diff changeset	8	theory PropLog imports Main begin
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	9
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	10	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	11	Datatype definition of propositional logic formulae and inductive
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	12	definition of the propositional tautologies.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	13
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	14	Inductive definition of propositional logic. Soundness and
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	15	completeness w.r.t.\ truth-tables.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	16
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	17	Prove: If @{text "H \|= p"} then @{text "G \|= p"} where @{text "G \<in>
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	18	Fin(H)"}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	19	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	20
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	21	subsection {* The datatype of propositions *}
5184 9b8547a9496a Adapted to new datatype package. berghofe parents: 3842 diff changeset	22
24824 b7866aea0815 avoid unnamed infixes; wenzelm parents: 23746 diff changeset	23	datatype 'a pl =
b7866aea0815 avoid unnamed infixes; wenzelm parents: 23746 diff changeset	24	false \|
b7866aea0815 avoid unnamed infixes; wenzelm parents: 23746 diff changeset	25	var 'a ("#_" [1000]) \|
b7866aea0815 avoid unnamed infixes; wenzelm parents: 23746 diff changeset	26	imp "'a pl" "'a pl" (infixr "->" 90)
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	27
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	28	subsection {* The proof system *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	29
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	30	inductive
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	31	thms :: "['a pl set, 'a pl] => bool" (infixl "\|-" 50)
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	32	for H :: "'a pl set"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	33	where
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	34	H [intro]: "p\<in>H ==> H \|- p"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	35	\| K: "H \|- p->q->p"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	36	\| S: "H \|- (p->q->r) -> (p->q) -> p->r"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	37	\| DN: "H \|- ((p->false) -> false) -> p"
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	38	\| MP: "[\| H \|- p->q; H \|- p \|] ==> H \|- q"
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	39
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	40	subsection {* The semantics *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	41
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	42	subsubsection {* Semantics of propositional logic. *}
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	43
39246 9e58f0499f57 modernized primrec haftmann parents: 36862 diff changeset	44	primrec eval :: "['a set, 'a pl] => bool" ("_[[_]]" [100,0] 100) where
9e58f0499f57 modernized primrec haftmann parents: 36862 diff changeset	45	"tt[[false]] = False"
9e58f0499f57 modernized primrec haftmann parents: 36862 diff changeset	46	\| "tt[[#v]] = (v \<in> tt)"
9e58f0499f57 modernized primrec haftmann parents: 36862 diff changeset	47	\| eval_imp: "tt[[p->q]] = (tt[[p]] --> tt[[q]])"
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: 10759 diff changeset	49	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	50	A finite set of hypotheses from @{text t} and the @{text Var}s in
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	51	@{text p}.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	52	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	53
39246 9e58f0499f57 modernized primrec haftmann parents: 36862 diff changeset	54	primrec hyps :: "['a pl, 'a set] => 'a pl set" where
10759 994877ee68cb * empty log message * nipkow parents: 9101 diff changeset	55	"hyps false tt = {}"
39246 9e58f0499f57 modernized primrec haftmann parents: 36862 diff changeset	56	\| "hyps (#v) tt = {if v \<in> tt then #v else #v->false}"
9e58f0499f57 modernized primrec haftmann parents: 36862 diff changeset	57	\| "hyps (p->q) tt = hyps p tt Un hyps q tt"
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	58
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	59	subsubsection {* Logical consequence *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	60
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	61	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	62	For every valuation, if all elements of @{text H} are true then so
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	63	is @{text p}.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	64	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	65
19736 d8d0f8f51d69 tuned; wenzelm parents: 18260 diff changeset	66	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 20503 diff changeset	67	sat :: "['a pl set, 'a pl] => bool" (infixl "\|=" 50) where
19736 d8d0f8f51d69 tuned; wenzelm parents: 18260 diff changeset	68	"H \|= p = (\<forall>tt. (\<forall>q\<in>H. tt[[q]]) --> tt[[p]])"
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	69
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	70
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	71	subsection {* Proof theory of propositional logic *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	72
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	73	lemma thms_mono: "G<=H ==> thms(G) <= thms(H)"
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	74	apply (rule predicate1I)
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	75	apply (erule thms.induct)
a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	76	apply (auto intro: thms.intros)
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	77	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	78
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	79	lemma thms_I: "H \|- p->p"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	80	-- {Called @{text I} for Identity Combinator, not for Introduction. }
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	81	by (best intro: thms.K thms.S thms.MP)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	82
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	83
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	84	subsubsection {* Weakening, left and right *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	85
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	86	lemma weaken_left: "[\| G \<subseteq> H; G\|-p \|] ==> H\|-p"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	87	-- {* Order of premises is convenient with @{text THEN} *}
23746 a455e69c31cc Adapted to new inductive definition package. berghofe parents: 21404 diff changeset	88	by (erule thms_mono [THEN predicate1D])
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	89
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	90	lemmas weaken_left_insert = subset_insertI [THEN weaken_left]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	91
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	92	lemmas weaken_left_Un1 = Un_upper1 [THEN weaken_left]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	93	lemmas weaken_left_Un2 = Un_upper2 [THEN weaken_left]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	94
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	95	lemma weaken_right: "H \|- q ==> H \|- p->q"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	96	by (fast intro: thms.K thms.MP)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	97
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	98
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	99	subsubsection {* The deduction theorem *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	100
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	101	theorem deduction: "insert p H \|- q ==> H \|- p->q"
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	102	apply (induct set: thms)
5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	103	apply (fast intro: thms_I thms.H thms.K thms.S thms.DN
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	104	thms.S [THEN thms.MP, THEN thms.MP] weaken_right)+
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	105	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	106
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	107
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	108	subsubsection {* The cut rule *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	109
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	110	lemmas cut = deduction [THEN thms.MP]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	111
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	112	lemmas thms_falseE = weaken_right [THEN thms.DN [THEN thms.MP]]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	113
45605 a89b4bc311a5 eliminated obsolete "standard"; wenzelm parents: 39246 diff changeset	114	lemmas thms_notE = thms.MP [THEN thms_falseE]
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	115
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	116
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	117	subsubsection {* Soundness of the rules wrt truth-table semantics *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	118
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	119	theorem soundness: "H \|- p ==> H \|= p"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	120	apply (unfold sat_def)
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	121	apply (induct set: thms)
5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	122	apply auto
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	123	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	124
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	125	subsection {* Completeness *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	126
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	127	subsubsection {* Towards the completeness proof *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	128
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	129	lemma false_imp: "H \|- p->false ==> H \|- p->q"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	130	apply (rule deduction)
27034 5257bc7e0c06 tuned proofs nipkow parents: 24824 diff changeset	131	apply (metis H insert_iff weaken_left_insert thms_notE)
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	132	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	133
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	134	lemma imp_false:
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	135	"[\| H \|- p; H \|- q->false \|] ==> H \|- (p->q)->false"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	136	apply (rule deduction)
27034 5257bc7e0c06 tuned proofs nipkow parents: 24824 diff changeset	137	apply (metis H MP insert_iff weaken_left_insert)
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	138	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	139
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	140	lemma hyps_thms_if: "hyps p tt \|- (if tt[[p]] then p else p->false)"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	141	-- {* Typical example of strengthening the induction statement. *}
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	142	apply simp
5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	143	apply (induct p)
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	144	apply (simp_all add: thms_I thms.H)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	145	apply (blast intro: weaken_left_Un1 weaken_left_Un2 weaken_right
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	146	imp_false false_imp)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	147	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	148
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	149	lemma sat_thms_p: "{} \|= p ==> hyps p tt \|- p"
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	150	-- {* Key lemma for completeness; yields a set of assumptions
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	151	satisfying @{text p} *}
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	152	apply (unfold sat_def)
5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	153	apply (drule spec, erule mp [THEN if_P, THEN subst],
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	154	rule_tac [2] hyps_thms_if, simp)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	155	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	156
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	157	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	158	For proving certain theorems in our new propositional logic.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	159	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	160
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	161	declare deduction [intro!]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	162	declare thms.H [THEN thms.MP, intro]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	163
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	164	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	165	The excluded middle in the form of an elimination rule.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	166	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	167
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	168	lemma thms_excluded_middle: "H \|- (p->q) -> ((p->false)->q) -> q"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	169	apply (rule deduction [THEN deduction])
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	170	apply (rule thms.DN [THEN thms.MP], best)
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	171	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	172
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	173	lemma thms_excluded_middle_rule:
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	174	"[\| insert p H \|- q; insert (p->false) H \|- q \|] ==> H \|- q"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	175	-- {* Hard to prove directly because it requires cuts *}
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	176	by (rule thms_excluded_middle [THEN thms.MP, THEN thms.MP], auto)
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	177
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	178
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	179	subsection{* Completeness -- lemmas for reducing the set of assumptions*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	180
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	181	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	182	For the case @{prop "hyps p t - insert #v Y \|- p"} we also have @{prop
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	183	"hyps p t - {#v} \<subseteq> hyps p (t-{v})"}.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	184	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	185
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	186	lemma hyps_Diff: "hyps p (t-{v}) <= insert (#v->false) ((hyps p t)-{#v})"
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	187	by (induct p) auto
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	188
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	189	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	190	For the case @{prop "hyps p t - insert (#v -> Fls) Y \|- p"} we also have
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	191	@{prop "hyps p t-{#v->Fls} \<subseteq> hyps p (insert v t)"}.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	192	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	193
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	194	lemma hyps_insert: "hyps p (insert v t) <= insert (#v) (hyps p t-{#v->false})"
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	195	by (induct p) auto
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	196
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	197	text {* Two lemmas for use with @{text weaken_left} *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	198
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	199	lemma insert_Diff_same: "B-C <= insert a (B-insert a C)"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	200	by fast
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	201
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	202	lemma insert_Diff_subset2: "insert a (B-{c}) - D <= insert a (B-insert c D)"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	203	by fast
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	204
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	205	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	206	The set @{term "hyps p t"} is finite, and elements have the form
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	207	@{term "#v"} or @{term "#v->Fls"}.
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	208	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	209
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	210	lemma hyps_finite: "finite(hyps p t)"
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	211	by (induct p) auto
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	212
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	213	lemma hyps_subset: "hyps p t <= (UN v. {#v, #v->false})"
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	214	by (induct p) auto
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	215
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	216	lemmas Diff_weaken_left = Diff_mono [OF _ subset_refl, THEN weaken_left]
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	217
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	218	subsubsection {* Completeness theorem *}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	219
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	220	text {*
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	221	Induction on the finite set of assumptions @{term "hyps p t0"}. We
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	222	may repeatedly subtract assumptions until none are left!
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	223	*}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	224
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	225	lemma completeness_0_lemma:
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	226	"{} \|= p ==> \<forall>t. hyps p t - hyps p t0 \|- p"
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	227	apply (rule hyps_subset [THEN hyps_finite [THEN finite_subset_induct]])
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	228	apply (simp add: sat_thms_p, safe)
16563 a92f96951355 meson method taking an argument list paulson parents: 16417 diff changeset	229	txt{Case @{text"hyps p t-insert(#v,Y) \|- p"} }
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	230	apply (iprover intro: thms_excluded_middle_rule
5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	231	insert_Diff_same [THEN weaken_left]
5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	232	insert_Diff_subset2 [THEN weaken_left]
16563 a92f96951355 meson method taking an argument list paulson parents: 16417 diff changeset	233	hyps_Diff [THEN Diff_weaken_left])
a92f96951355 meson method taking an argument list paulson parents: 16417 diff changeset	234	txt{Case @{text"hyps p t-insert(#v -> false,Y) \|- p"} }
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	235	apply (iprover intro: thms_excluded_middle_rule
5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	236	insert_Diff_same [THEN weaken_left]
5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	237	insert_Diff_subset2 [THEN weaken_left]
16563 a92f96951355 meson method taking an argument list paulson parents: 16417 diff changeset	238	hyps_insert [THEN Diff_weaken_left])
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	239	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	240
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	241	text{The base case for completeness}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	242	lemma completeness_0: "{} \|= p ==> {} \|- p"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	243	apply (rule Diff_cancel [THEN subst])
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	244	apply (erule completeness_0_lemma [THEN spec])
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	245	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	246
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	247	text{A semantic analogue of the Deduction Theorem}
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	248	lemma sat_imp: "insert p H \|= q ==> H \|= p->q"
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	249	by (unfold sat_def, auto)
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	250
18260 5597cfcecd49 tuned induct proofs; wenzelm parents: 17589 diff changeset	251	theorem completeness: "finite H ==> H \|= p ==> H \|- p"
20503 503ac4c5ef91 induct method: renamed 'fixing' to 'arbitrary'; wenzelm parents: 19736 diff changeset	252	apply (induct arbitrary: p rule: finite_induct)
16563 a92f96951355 meson method taking an argument list paulson parents: 16417 diff changeset	253	apply (blast intro: completeness_0)
17589 58eeffd73be1 renamed rules to iprover nipkow parents: 16563 diff changeset	254	apply (iprover intro: sat_imp thms.H insertI1 weaken_left_insert [THEN thms.MP])
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	255	done
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	256
d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	257	theorem syntax_iff_semantics: "finite H ==> (H \|- p) = (H \|= p)"
16563 a92f96951355 meson method taking an argument list paulson parents: 16417 diff changeset	258	by (blast intro: soundness completeness)
13075 d3e1d554cd6d conversion of some HOL/Induct proof scripts to Isar paulson parents: 10759 diff changeset	259
3120 c58423c20740 New directory to contain examples of (co)inductive definitions paulson parents: diff changeset	260	end

author	wenzelm
	Sun, 20 Nov 2011 21:05:23 +0100
changeset 45605	a89b4bc311a5
parent 39246	9e58f0499f57
child 46579	fa035a015ea8
permissions	-rw-r--r--