isabelle: src/FOLP/IFOLP.thy@4c51ab632cda (annotated)

1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	1	(* Title: FOLP/IFOLP.thy
1142 eb0e2ff8f032 Corrected comments in headers lcp parents: 648 diff changeset	2	ID: $Id$
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	3	Author: Martin D Coen, Cambridge University Computer Laboratory
1142 eb0e2ff8f032 Corrected comments in headers lcp parents: 648 diff changeset	4	Copyright 1992 University of Cambridge
eb0e2ff8f032 Corrected comments in headers lcp parents: 648 diff changeset	5
eb0e2ff8f032 Corrected comments in headers lcp parents: 648 diff changeset	6	Intuitionistic First-Order Logic with Proofs
eb0e2ff8f032 Corrected comments in headers lcp parents: 648 diff changeset	7	*)
eb0e2ff8f032 Corrected comments in headers lcp parents: 648 diff changeset	8
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	9	IFOLP = Pure +
a5a9c433f639 Initial revision clasohm parents: diff changeset	10
a5a9c433f639 Initial revision clasohm parents: diff changeset	11	classes term < logic
a5a9c433f639 Initial revision clasohm parents: diff changeset	12
a5a9c433f639 Initial revision clasohm parents: diff changeset	13	default term
a5a9c433f639 Initial revision clasohm parents: diff changeset	14
283 76caebd18756 new type declaration syntax instead of numbers lcp parents: 0 diff changeset	15	types
76caebd18756 new type declaration syntax instead of numbers lcp parents: 0 diff changeset	16	p
76caebd18756 new type declaration syntax instead of numbers lcp parents: 0 diff changeset	17	o
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	18
283 76caebd18756 new type declaration syntax instead of numbers lcp parents: 0 diff changeset	19	arities
76caebd18756 new type declaration syntax instead of numbers lcp parents: 0 diff changeset	20	p,o :: logic
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	21
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	22	consts
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	23	(* Judgements *)
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	24	"@Proof" :: "[p,o]=>prop" ("(_ /: _)" [51,10] 5)
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	25	Proof :: "[o,p]=>prop"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	26	EqProof :: "[p,p,o]=>prop" ("(3_ /= _ :/ _)" [10,10,10] 5)
a5a9c433f639 Initial revision clasohm parents: diff changeset	27
a5a9c433f639 Initial revision clasohm parents: diff changeset	28	(* Logical Connectives -- Type Formers *)
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	29	"=" :: "['a,'a] => o" (infixl 50)
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	30	True,False :: "o"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	31	"Not" :: "o => o" ("~ _" [40] 40)
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	32	"&" :: "[o,o] => o" (infixr 35)
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	33	"\|" :: "[o,o] => o" (infixr 30)
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	34	"-->" :: "[o,o] => o" (infixr 25)
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	35	"<->" :: "[o,o] => o" (infixr 25)
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	36	(Quantifiers)
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	37	All :: "('a => o) => o" (binder "ALL " 10)
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	38	Ex :: "('a => o) => o" (binder "EX " 10)
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	39	Ex1 :: "('a => o) => o" (binder "EX! " 10)
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	40	(Rewriting gadgets)
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	41	NORM :: "o => o"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	42	norm :: "'a => 'a"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	43
648 e27c9ec2b48b FOLP/IFOLP.thy: tightening precedences to eliminate syntactic ambiguities. lcp parents: 283 diff changeset	44	(* Proof Term Formers: precedence must exceed 50 *)
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	45	tt :: "p"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	46	contr :: "p=>p"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	47	fst,snd :: "p=>p"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	48	pair :: "[p,p]=>p" ("(1<_,/_>)")
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	49	split :: "[p, [p,p]=>p] =>p"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	50	inl,inr :: "p=>p"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	51	when :: "[p, p=>p, p=>p]=>p"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	52	lambda :: "(p => p) => p" (binder "lam " 55)
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	53	"`" :: "[p,p]=>p" (infixl 60)
648 e27c9ec2b48b FOLP/IFOLP.thy: tightening precedences to eliminate syntactic ambiguities. lcp parents: 283 diff changeset	54	alll :: "['a=>p]=>p" (binder "all " 55)
e27c9ec2b48b FOLP/IFOLP.thy: tightening precedences to eliminate syntactic ambiguities. lcp parents: 283 diff changeset	55	"^" :: "[p,'a]=>p" (infixl 55)
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	56	exists :: "['a,p]=>p" ("(1[_,/_])")
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	57	xsplit :: "[p,['a,p]=>p]=>p"
a5a9c433f639 Initial revision clasohm parents: diff changeset	58	ideq :: "'a=>p"
a5a9c433f639 Initial revision clasohm parents: diff changeset	59	idpeel :: "[p,'a=>p]=>p"
a5a9c433f639 Initial revision clasohm parents: diff changeset	60	nrm, NRM :: "p"
a5a9c433f639 Initial revision clasohm parents: diff changeset	61
a5a9c433f639 Initial revision clasohm parents: diff changeset	62	rules
a5a9c433f639 Initial revision clasohm parents: diff changeset	63
a5a9c433f639 Initial revision clasohm parents: diff changeset	64	(** Propositional logic **)
a5a9c433f639 Initial revision clasohm parents: diff changeset	65
a5a9c433f639 Initial revision clasohm parents: diff changeset	66	(Equality)
a5a9c433f639 Initial revision clasohm parents: diff changeset	67	(* Like Intensional Equality in MLTT - but proofs distinct from terms *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	68
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	69	ieqI "ideq(a) : a=a"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	70	ieqE "[\| p : a=b; !!x.f(x) : P(x,x) \|] ==> idpeel(p,f) : P(a,b)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	71
a5a9c433f639 Initial revision clasohm parents: diff changeset	72	(* Truth and Falsity *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	73
a5a9c433f639 Initial revision clasohm parents: diff changeset	74	TrueI "tt : True"
a5a9c433f639 Initial revision clasohm parents: diff changeset	75	FalseE "a:False ==> contr(a):P"
a5a9c433f639 Initial revision clasohm parents: diff changeset	76
a5a9c433f639 Initial revision clasohm parents: diff changeset	77	(* Conjunction *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	78
a5a9c433f639 Initial revision clasohm parents: diff changeset	79	conjI "[\| a:P; b:Q \|] ==> <a,b> : P&Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	80	conjunct1 "p:P&Q ==> fst(p):P"
a5a9c433f639 Initial revision clasohm parents: diff changeset	81	conjunct2 "p:P&Q ==> snd(p):Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	82
a5a9c433f639 Initial revision clasohm parents: diff changeset	83	(* Disjunction *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	84
a5a9c433f639 Initial revision clasohm parents: diff changeset	85	disjI1 "a:P ==> inl(a):P\|Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	86	disjI2 "b:Q ==> inr(b):P\|Q"
1149 5750eba8820d removed \...\ inside strings clasohm parents: 1142 diff changeset	87	disjE "[\| a:P\|Q; !!x.x:P ==> f(x):R; !!x.x:Q ==> g(x):R
5750eba8820d removed \...\ inside strings clasohm parents: 1142 diff changeset	88	\|] ==> when(a,f,g):R"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	89
a5a9c433f639 Initial revision clasohm parents: diff changeset	90	(* Implication *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	91
a5a9c433f639 Initial revision clasohm parents: diff changeset	92	impI "(!!x.x:P ==> f(x):Q) ==> lam x.f(x):P-->Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	93	mp "[\| f:P-->Q; a:P \|] ==> f`a:Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	94
a5a9c433f639 Initial revision clasohm parents: diff changeset	95	(Quantifiers)
a5a9c433f639 Initial revision clasohm parents: diff changeset	96
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	97	allI "(!!x. f(x) : P(x)) ==> all x.f(x) : ALL x.P(x)"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	98	spec "(f:ALL x.P(x)) ==> f^x : P(x)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	99
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	100	exI "p : P(x) ==> [x,p] : EX x.P(x)"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	101	exE "[\| p: EX x.P(x); !!x u. u:P(x) ==> f(x,u) : R \|] ==> xsplit(p,f):R"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	102
a5a9c433f639 Initial revision clasohm parents: diff changeset	103	(** Equality between proofs **)
a5a9c433f639 Initial revision clasohm parents: diff changeset	104
a5a9c433f639 Initial revision clasohm parents: diff changeset	105	prefl "a : P ==> a = a : P"
a5a9c433f639 Initial revision clasohm parents: diff changeset	106	psym "a = b : P ==> b = a : P"
a5a9c433f639 Initial revision clasohm parents: diff changeset	107	ptrans "[\| a = b : P; b = c : P \|] ==> a = c : P"
a5a9c433f639 Initial revision clasohm parents: diff changeset	108
a5a9c433f639 Initial revision clasohm parents: diff changeset	109	idpeelB "[\| !!x.f(x) : P(x,x) \|] ==> idpeel(ideq(a),f) = f(a) : P(a,a)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	110
a5a9c433f639 Initial revision clasohm parents: diff changeset	111	fstB "a:P ==> fst(<a,b>) = a : P"
a5a9c433f639 Initial revision clasohm parents: diff changeset	112	sndB "b:Q ==> snd(<a,b>) = b : Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	113	pairEC "p:P&Q ==> p = <fst(p),snd(p)> : P&Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	114
a5a9c433f639 Initial revision clasohm parents: diff changeset	115	whenBinl "[\| a:P; !!x.x:P ==> f(x) : Q \|] ==> when(inl(a),f,g) = f(a) : Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	116	whenBinr "[\| b:P; !!x.x:P ==> g(x) : Q \|] ==> when(inr(b),f,g) = g(b) : Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	117	plusEC "a:P\|Q ==> when(a,%x.inl(x),%y.inr(y)) = p : P\|Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	118
a5a9c433f639 Initial revision clasohm parents: diff changeset	119	applyB "[\| a:P; !!x.x:P ==> b(x) : Q \|] ==> (lam x.b(x)) ` a = b(a) : Q"
a5a9c433f639 Initial revision clasohm parents: diff changeset	120	funEC "f:P ==> f = lam x.f`x : P"
a5a9c433f639 Initial revision clasohm parents: diff changeset	121
a5a9c433f639 Initial revision clasohm parents: diff changeset	122	specB "[\| !!x.f(x) : P(x) \|] ==> (all x.f(x)) ^ a = f(a) : P(a)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	123
a5a9c433f639 Initial revision clasohm parents: diff changeset	124
a5a9c433f639 Initial revision clasohm parents: diff changeset	125	(** Definitions **)
a5a9c433f639 Initial revision clasohm parents: diff changeset	126
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	127	not_def "~P == P-->False"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	128	iff_def "P<->Q == (P-->Q) & (Q-->P)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	129
a5a9c433f639 Initial revision clasohm parents: diff changeset	130	(Unique existence)
a5a9c433f639 Initial revision clasohm parents: diff changeset	131	ex1_def "EX! x. P(x) == EX x. P(x) & (ALL y. P(y) --> y=x)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	132
a5a9c433f639 Initial revision clasohm parents: diff changeset	133	(Rewriting -- special constants to flag normalized terms and formulae)
1477 4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	134	norm_eq "nrm : norm(x) = x"
4c51ab632cda expanded tabs clasohm parents: 1149 diff changeset	135	NORM_iff "NRM : NORM(P) <-> P"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	136
a5a9c433f639 Initial revision clasohm parents: diff changeset	137	end
a5a9c433f639 Initial revision clasohm parents: diff changeset	138
a5a9c433f639 Initial revision clasohm parents: diff changeset	139	ML
a5a9c433f639 Initial revision clasohm parents: diff changeset	140
a5a9c433f639 Initial revision clasohm parents: diff changeset	141	(show_proofs:=true displays the proof terms -- they are ENORMOUS)
a5a9c433f639 Initial revision clasohm parents: diff changeset	142	val show_proofs = ref false;
a5a9c433f639 Initial revision clasohm parents: diff changeset	143
a5a9c433f639 Initial revision clasohm parents: diff changeset	144	fun proof_tr [p,P] = Const("Proof",dummyT) $ P $ p;
a5a9c433f639 Initial revision clasohm parents: diff changeset	145
a5a9c433f639 Initial revision clasohm parents: diff changeset	146	fun proof_tr' [P,p] =
a5a9c433f639 Initial revision clasohm parents: diff changeset	147	if !show_proofs then Const("@Proof",dummyT) $ p $ P
a5a9c433f639 Initial revision clasohm parents: diff changeset	148	else P (this case discards the proof term);
a5a9c433f639 Initial revision clasohm parents: diff changeset	149
a5a9c433f639 Initial revision clasohm parents: diff changeset	150	val parse_translation = [("@Proof", proof_tr)];
a5a9c433f639 Initial revision clasohm parents: diff changeset	151	val print_translation = [("Proof", proof_tr')];
a5a9c433f639 Initial revision clasohm parents: diff changeset	152

author	clasohm
	Mon, 05 Feb 1996 21:33:14 +0100
changeset 1477	4c51ab632cda
parent 1149	5750eba8820d
child 2714	b0fbdfbbad66
permissions	-rw-r--r--