isabelle: src/CTT/CTT.thy@ab97ccef124a (annotated)

0 a5a9c433f639 Initial revision clasohm parents: diff changeset	1	(* Title: CTT/ctt.thy
a5a9c433f639 Initial revision clasohm parents: diff changeset	2	ID: $Id$
a5a9c433f639 Initial revision clasohm parents: diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
a5a9c433f639 Initial revision clasohm parents: diff changeset	4	Copyright 1993 University of Cambridge
a5a9c433f639 Initial revision clasohm parents: diff changeset	5
a5a9c433f639 Initial revision clasohm parents: diff changeset	6	Constructive Type Theory
a5a9c433f639 Initial revision clasohm parents: diff changeset	7	*)
a5a9c433f639 Initial revision clasohm parents: diff changeset	8
a5a9c433f639 Initial revision clasohm parents: diff changeset	9	CTT = Pure +
a5a9c433f639 Initial revision clasohm parents: diff changeset	10
283 76caebd18756 new type declaration syntax instead of numbers lcp parents: 23 diff changeset	11	types
76caebd18756 new type declaration syntax instead of numbers lcp parents: 23 diff changeset	12	i
76caebd18756 new type declaration syntax instead of numbers lcp parents: 23 diff changeset	13	t
76caebd18756 new type declaration syntax instead of numbers lcp parents: 23 diff changeset	14	o
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	15
a5a9c433f639 Initial revision clasohm parents: diff changeset	16	consts
a5a9c433f639 Initial revision clasohm parents: diff changeset	17	(Types)
a5a9c433f639 Initial revision clasohm parents: diff changeset	18	F,T :: "t" (F is empty, T contains one element)
a5a9c433f639 Initial revision clasohm parents: diff changeset	19	contr :: "i=>i"
a5a9c433f639 Initial revision clasohm parents: diff changeset	20	tt :: "i"
a5a9c433f639 Initial revision clasohm parents: diff changeset	21	(Natural numbers)
a5a9c433f639 Initial revision clasohm parents: diff changeset	22	N :: "t"
a5a9c433f639 Initial revision clasohm parents: diff changeset	23	succ :: "i=>i"
a5a9c433f639 Initial revision clasohm parents: diff changeset	24	rec :: "[i, i, [i,i]=>i] => i"
a5a9c433f639 Initial revision clasohm parents: diff changeset	25	(Unions)
a5a9c433f639 Initial revision clasohm parents: diff changeset	26	inl,inr :: "i=>i"
a5a9c433f639 Initial revision clasohm parents: diff changeset	27	when :: "[i, i=>i, i=>i]=>i"
a5a9c433f639 Initial revision clasohm parents: diff changeset	28	(General Sum and Binary Product)
a5a9c433f639 Initial revision clasohm parents: diff changeset	29	Sum :: "[t, i=>t]=>t"
a5a9c433f639 Initial revision clasohm parents: diff changeset	30	fst,snd :: "i=>i"
a5a9c433f639 Initial revision clasohm parents: diff changeset	31	split :: "[i, [i,i]=>i] =>i"
a5a9c433f639 Initial revision clasohm parents: diff changeset	32	(General Product and Function Space)
a5a9c433f639 Initial revision clasohm parents: diff changeset	33	Prod :: "[t, i=>t]=>t"
14765 bafb24c150c1 proper use of 'syntax'; wenzelm parents: 14565 diff changeset	34	(Types)
bafb24c150c1 proper use of 'syntax'; wenzelm parents: 14565 diff changeset	35	"+" :: "[t,t]=>t" (infixr 40)
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	36	(Equality type)
a5a9c433f639 Initial revision clasohm parents: diff changeset	37	Eq :: "[t,i,i]=>t"
a5a9c433f639 Initial revision clasohm parents: diff changeset	38	eq :: "i"
a5a9c433f639 Initial revision clasohm parents: diff changeset	39	(Judgements)
a5a9c433f639 Initial revision clasohm parents: diff changeset	40	Type :: "t => prop" ("(_ type)" [10] 5)
10467 e6e7205e9e91 x-symbol support for Pi, Sigma, -->, : (membership) paulson parents: 3837 diff changeset	41	Eqtype :: "[t,t]=>prop" ("(_ =/ _)" [10,10] 5)
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	42	Elem :: "[i, t]=>prop" ("(_ /: _)" [10,10] 5)
10467 e6e7205e9e91 x-symbol support for Pi, Sigma, -->, : (membership) paulson parents: 3837 diff changeset	43	Eqelem :: "[i,i,t]=>prop" ("(_ =/ _ :/ _)" [10,10,10] 5)
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	44	Reduce :: "[i,i]=>prop" ("Reduce[_,_]")
a5a9c433f639 Initial revision clasohm parents: diff changeset	45	(Types)
14765 bafb24c150c1 proper use of 'syntax'; wenzelm parents: 14565 diff changeset	46
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	47	(Functions)
a5a9c433f639 Initial revision clasohm parents: diff changeset	48	lambda :: "(i => i) => i" (binder "lam " 10)
a5a9c433f639 Initial revision clasohm parents: diff changeset	49	"`" :: "[i,i]=>i" (infixl 60)
a5a9c433f639 Initial revision clasohm parents: diff changeset	50	(Natural numbers)
a5a9c433f639 Initial revision clasohm parents: diff changeset	51	"0" :: "i" ("0")
a5a9c433f639 Initial revision clasohm parents: diff changeset	52	(Pairing)
a5a9c433f639 Initial revision clasohm parents: diff changeset	53	pair :: "[i,i]=>i" ("(1<_,/_>)")
a5a9c433f639 Initial revision clasohm parents: diff changeset	54
14765 bafb24c150c1 proper use of 'syntax'; wenzelm parents: 14565 diff changeset	55	syntax
bafb24c150c1 proper use of 'syntax'; wenzelm parents: 14565 diff changeset	56	"@PROD" :: "[idt,t,t]=>t" ("(3PROD _:_./ _)" 10)
bafb24c150c1 proper use of 'syntax'; wenzelm parents: 14565 diff changeset	57	"@SUM" :: "[idt,t,t]=>t" ("(3SUM _:_./ _)" 10)
bafb24c150c1 proper use of 'syntax'; wenzelm parents: 14565 diff changeset	58	"@-->" :: "[t,t]=>t" ("(_ -->/ _)" [31,30] 30)
bafb24c150c1 proper use of 'syntax'; wenzelm parents: 14565 diff changeset	59	"@" :: "[t,t]=>t" ("(_ / _)" [51,50] 50)
bafb24c150c1 proper use of 'syntax'; wenzelm parents: 14565 diff changeset	60
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	61	translations
a5a9c433f639 Initial revision clasohm parents: diff changeset	62	"PROD x:A. B" => "Prod(A, %x. B)"
23 1cd377c2f7c6 replaced id by idt; wenzelm parents: 0 diff changeset	63	"A --> B" => "Prod(A, _K(B))"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	64	"SUM x:A. B" => "Sum(A, %x. B)"
23 1cd377c2f7c6 replaced id by idt; wenzelm parents: 0 diff changeset	65	"A * B" => "Sum(A, _K(B))"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	66
10467 e6e7205e9e91 x-symbol support for Pi, Sigma, -->, : (membership) paulson parents: 3837 diff changeset	67	syntax (xsymbols)
e6e7205e9e91 x-symbol support for Pi, Sigma, -->, : (membership) paulson parents: 3837 diff changeset	68	"@-->" :: "[t,t]=>t" ("(_ \\<longrightarrow>/ _)" [31,30] 30)
e6e7205e9e91 x-symbol support for Pi, Sigma, -->, : (membership) paulson parents: 3837 diff changeset	69	"@*" :: "[t,t]=>t" ("(_ \\<times>/ _)" [51,50] 50)
12110 f8b4b11cd79d eliminated old "symbols" syntax, use "xsymbols" instead; wenzelm parents: 10467 diff changeset	70	Elem :: "[i, t]=>prop" ("(_ /\\<in> _)" [10,10] 5)
f8b4b11cd79d eliminated old "symbols" syntax, use "xsymbols" instead; wenzelm parents: 10467 diff changeset	71	Eqelem :: "[i,i,t]=>prop" ("(2_ =/ _ \\<in>/ _)" [10,10,10] 5)
f8b4b11cd79d eliminated old "symbols" syntax, use "xsymbols" instead; wenzelm parents: 10467 diff changeset	72	"@SUM" :: "[idt,t,t] => t" ("(3\\<Sigma> _\\<in>_./ _)" 10)
f8b4b11cd79d eliminated old "symbols" syntax, use "xsymbols" instead; wenzelm parents: 10467 diff changeset	73	"@PROD" :: "[idt,t,t] => t" ("(3\\<Pi> _\\<in>_./ _)" 10)
f8b4b11cd79d eliminated old "symbols" syntax, use "xsymbols" instead; wenzelm parents: 10467 diff changeset	74	"lam " :: "[idts, i] => i" ("(3\\<lambda>\\<lambda>_./ _)" 10)
10467 e6e7205e9e91 x-symbol support for Pi, Sigma, -->, : (membership) paulson parents: 3837 diff changeset	75
14565 c6dc17aab88a use more symbols in HTML output kleing parents: 12110 diff changeset	76	syntax (HTML output)
c6dc17aab88a use more symbols in HTML output kleing parents: 12110 diff changeset	77	"@*" :: "[t,t]=>t" ("(_ \\<times>/ _)" [51,50] 50)
c6dc17aab88a use more symbols in HTML output kleing parents: 12110 diff changeset	78	Elem :: "[i, t]=>prop" ("(_ /\\<in> _)" [10,10] 5)
c6dc17aab88a use more symbols in HTML output kleing parents: 12110 diff changeset	79	Eqelem :: "[i,i,t]=>prop" ("(2_ =/ _ \\<in>/ _)" [10,10,10] 5)
c6dc17aab88a use more symbols in HTML output kleing parents: 12110 diff changeset	80	"@SUM" :: "[idt,t,t] => t" ("(3\\<Sigma> _\\<in>_./ _)" 10)
c6dc17aab88a use more symbols in HTML output kleing parents: 12110 diff changeset	81	"@PROD" :: "[idt,t,t] => t" ("(3\\<Pi> _\\<in>_./ _)" 10)
c6dc17aab88a use more symbols in HTML output kleing parents: 12110 diff changeset	82	"lam " :: "[idts, i] => i" ("(3\\<lambda>\\<lambda>_./ _)" 10)
c6dc17aab88a use more symbols in HTML output kleing parents: 12110 diff changeset	83
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	84	rules
a5a9c433f639 Initial revision clasohm parents: diff changeset	85
a5a9c433f639 Initial revision clasohm parents: diff changeset	86	(*Reduction: a weaker notion than equality; a hack for simplification.
a5a9c433f639 Initial revision clasohm parents: diff changeset	87	Reduce[a,b] means either that a=b:A for some A or else that "a" and "b"
a5a9c433f639 Initial revision clasohm parents: diff changeset	88	are textually identical.*)
a5a9c433f639 Initial revision clasohm parents: diff changeset	89
a5a9c433f639 Initial revision clasohm parents: diff changeset	90	(*does not verify a:A! Sound because only trans_red uses a Reduce premise
a5a9c433f639 Initial revision clasohm parents: diff changeset	91	No new theorems can be proved about the standard judgements.*)
a5a9c433f639 Initial revision clasohm parents: diff changeset	92	refl_red "Reduce[a,a]"
a5a9c433f639 Initial revision clasohm parents: diff changeset	93	red_if_equal "a = b : A ==> Reduce[a,b]"
a5a9c433f639 Initial revision clasohm parents: diff changeset	94	trans_red "[\| a = b : A; Reduce[b,c] \|] ==> a = c : A"
a5a9c433f639 Initial revision clasohm parents: diff changeset	95
a5a9c433f639 Initial revision clasohm parents: diff changeset	96	(Reflexivity)
a5a9c433f639 Initial revision clasohm parents: diff changeset	97
a5a9c433f639 Initial revision clasohm parents: diff changeset	98	refl_type "A type ==> A = A"
a5a9c433f639 Initial revision clasohm parents: diff changeset	99	refl_elem "a : A ==> a = a : A"
a5a9c433f639 Initial revision clasohm parents: diff changeset	100
a5a9c433f639 Initial revision clasohm parents: diff changeset	101	(Symmetry)
a5a9c433f639 Initial revision clasohm parents: diff changeset	102
a5a9c433f639 Initial revision clasohm parents: diff changeset	103	sym_type "A = B ==> B = A"
a5a9c433f639 Initial revision clasohm parents: diff changeset	104	sym_elem "a = b : A ==> b = a : A"
a5a9c433f639 Initial revision clasohm parents: diff changeset	105
a5a9c433f639 Initial revision clasohm parents: diff changeset	106	(Transitivity)
a5a9c433f639 Initial revision clasohm parents: diff changeset	107
a5a9c433f639 Initial revision clasohm parents: diff changeset	108	trans_type "[\| A = B; B = C \|] ==> A = C"
a5a9c433f639 Initial revision clasohm parents: diff changeset	109	trans_elem "[\| a = b : A; b = c : A \|] ==> a = c : A"
a5a9c433f639 Initial revision clasohm parents: diff changeset	110
a5a9c433f639 Initial revision clasohm parents: diff changeset	111	equal_types "[\| a : A; A = B \|] ==> a : B"
a5a9c433f639 Initial revision clasohm parents: diff changeset	112	equal_typesL "[\| a = b : A; A = B \|] ==> a = b : B"
a5a9c433f639 Initial revision clasohm parents: diff changeset	113
a5a9c433f639 Initial revision clasohm parents: diff changeset	114	(Substitution)
a5a9c433f639 Initial revision clasohm parents: diff changeset	115
a5a9c433f639 Initial revision clasohm parents: diff changeset	116	subst_type "[\| a : A; !!z. z:A ==> B(z) type \|] ==> B(a) type"
a5a9c433f639 Initial revision clasohm parents: diff changeset	117	subst_typeL "[\| a = c : A; !!z. z:A ==> B(z) = D(z) \|] ==> B(a) = D(c)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	118
a5a9c433f639 Initial revision clasohm parents: diff changeset	119	subst_elem "[\| a : A; !!z. z:A ==> b(z):B(z) \|] ==> b(a):B(a)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	120	subst_elemL
a5a9c433f639 Initial revision clasohm parents: diff changeset	121	"[\| a=c : A; !!z. z:A ==> b(z)=d(z) : B(z) \|] ==> b(a)=d(c) : B(a)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	122
a5a9c433f639 Initial revision clasohm parents: diff changeset	123
a5a9c433f639 Initial revision clasohm parents: diff changeset	124	(The type N -- natural numbers)
a5a9c433f639 Initial revision clasohm parents: diff changeset	125
a5a9c433f639 Initial revision clasohm parents: diff changeset	126	NF "N type"
a5a9c433f639 Initial revision clasohm parents: diff changeset	127	NI0 "0 : N"
a5a9c433f639 Initial revision clasohm parents: diff changeset	128	NI_succ "a : N ==> succ(a) : N"
a5a9c433f639 Initial revision clasohm parents: diff changeset	129	NI_succL "a = b : N ==> succ(a) = succ(b) : N"
a5a9c433f639 Initial revision clasohm parents: diff changeset	130
a5a9c433f639 Initial revision clasohm parents: diff changeset	131	NE
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	132	"[\| p: N; a: C(0); !!u v. [\| u: N; v: C(u) \|] ==> b(u,v): C(succ(u)) \|]
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	133	==> rec(p, a, %u v. b(u,v)) : C(p)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	134
a5a9c433f639 Initial revision clasohm parents: diff changeset	135	NEL
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	136	"[\| p = q : N; a = c : C(0);
5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	137	!!u v. [\| u: N; v: C(u) \|] ==> b(u,v) = d(u,v): C(succ(u)) \|]
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	138	==> rec(p, a, %u v. b(u,v)) = rec(q,c,d) : C(p)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	139
a5a9c433f639 Initial revision clasohm parents: diff changeset	140	NC0
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	141	"[\| a: C(0); !!u v. [\| u: N; v: C(u) \|] ==> b(u,v): C(succ(u)) \|]
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	142	==> rec(0, a, %u v. b(u,v)) = a : C(0)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	143
a5a9c433f639 Initial revision clasohm parents: diff changeset	144	NC_succ
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	145	"[\| p: N; a: C(0);
5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	146	!!u v. [\| u: N; v: C(u) \|] ==> b(u,v): C(succ(u)) \|] ==>
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	147	rec(succ(p), a, %u v. b(u,v)) = b(p, rec(p, a, %u v. b(u,v))) : C(succ(p))"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	148
a5a9c433f639 Initial revision clasohm parents: diff changeset	149	(The fourth Peano axiom. See page 91 of Martin-Lof's book)
a5a9c433f639 Initial revision clasohm parents: diff changeset	150	zero_ne_succ
a5a9c433f639 Initial revision clasohm parents: diff changeset	151	"[\| a: N; 0 = succ(a) : N \|] ==> 0: F"
a5a9c433f639 Initial revision clasohm parents: diff changeset	152
a5a9c433f639 Initial revision clasohm parents: diff changeset	153
a5a9c433f639 Initial revision clasohm parents: diff changeset	154	(The Product of a family of types)
a5a9c433f639 Initial revision clasohm parents: diff changeset	155
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	156	ProdF "[\| A type; !!x. x:A ==> B(x) type \|] ==> PROD x:A. B(x) type"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	157
a5a9c433f639 Initial revision clasohm parents: diff changeset	158	ProdFL
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	159	"[\| A = C; !!x. x:A ==> B(x) = D(x) \|] ==>
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	160	PROD x:A. B(x) = PROD x:C. D(x)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	161
a5a9c433f639 Initial revision clasohm parents: diff changeset	162	ProdI
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	163	"[\| A type; !!x. x:A ==> b(x):B(x)\|] ==> lam x. b(x) : PROD x:A. B(x)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	164
a5a9c433f639 Initial revision clasohm parents: diff changeset	165	ProdIL
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	166	"[\| A type; !!x. x:A ==> b(x) = c(x) : B(x)\|] ==>
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	167	lam x. b(x) = lam x. c(x) : PROD x:A. B(x)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	168
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	169	ProdE "[\| p : PROD x:A. B(x); a : A \|] ==> p`a : B(a)"
d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	170	ProdEL "[\| p=q: PROD x:A. B(x); a=b : A \|] ==> p`a = q`b : B(a)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	171
a5a9c433f639 Initial revision clasohm parents: diff changeset	172	ProdC
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	173	"[\| a : A; !!x. x:A ==> b(x) : B(x)\|] ==>
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	174	(lam x. b(x)) ` a = b(a) : B(a)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	175
a5a9c433f639 Initial revision clasohm parents: diff changeset	176	ProdC2
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	177	"p : PROD x:A. B(x) ==> (lam x. p`x) = p : PROD x:A. B(x)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	178
a5a9c433f639 Initial revision clasohm parents: diff changeset	179
a5a9c433f639 Initial revision clasohm parents: diff changeset	180	(The Sum of a family of types)
a5a9c433f639 Initial revision clasohm parents: diff changeset	181
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	182	SumF "[\| A type; !!x. x:A ==> B(x) type \|] ==> SUM x:A. B(x) type"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	183	SumFL
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	184	"[\| A = C; !!x. x:A ==> B(x) = D(x) \|] ==> SUM x:A. B(x) = SUM x:C. D(x)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	185
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	186	SumI "[\| a : A; b : B(a) \|] ==> <a,b> : SUM x:A. B(x)"
d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	187	SumIL "[\| a=c:A; b=d:B(a) \|] ==> <a,b> = <c,d> : SUM x:A. B(x)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	188
a5a9c433f639 Initial revision clasohm parents: diff changeset	189	SumE
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	190	"[\| p: SUM x:A. B(x); !!x y. [\| x:A; y:B(x) \|] ==> c(x,y): C(<x,y>) \|]
d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	191	==> split(p, %x y. c(x,y)) : C(p)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	192
a5a9c433f639 Initial revision clasohm parents: diff changeset	193	SumEL
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	194	"[\| p=q : SUM x:A. B(x);
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	195	!!x y. [\| x:A; y:B(x) \|] ==> c(x,y)=d(x,y): C(<x,y>)\|]
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	196	==> split(p, %x y. c(x,y)) = split(q, % x y. d(x,y)) : C(p)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	197
a5a9c433f639 Initial revision clasohm parents: diff changeset	198	SumC
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	199	"[\| a: A; b: B(a); !!x y. [\| x:A; y:B(x) \|] ==> c(x,y): C(<x,y>) \|]
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	200	==> split(<a,b>, %x y. c(x,y)) = c(a,b) : C(<a,b>)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	201
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	202	fst_def "fst(a) == split(a, %x y. x)"
d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	203	snd_def "snd(a) == split(a, %x y. y)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	204
a5a9c433f639 Initial revision clasohm parents: diff changeset	205
a5a9c433f639 Initial revision clasohm parents: diff changeset	206	(The sum of two types)
a5a9c433f639 Initial revision clasohm parents: diff changeset	207
a5a9c433f639 Initial revision clasohm parents: diff changeset	208	PlusF "[\| A type; B type \|] ==> A+B type"
a5a9c433f639 Initial revision clasohm parents: diff changeset	209	PlusFL "[\| A = C; B = D \|] ==> A+B = C+D"
a5a9c433f639 Initial revision clasohm parents: diff changeset	210
a5a9c433f639 Initial revision clasohm parents: diff changeset	211	PlusI_inl "[\| a : A; B type \|] ==> inl(a) : A+B"
a5a9c433f639 Initial revision clasohm parents: diff changeset	212	PlusI_inlL "[\| a = c : A; B type \|] ==> inl(a) = inl(c) : A+B"
a5a9c433f639 Initial revision clasohm parents: diff changeset	213
a5a9c433f639 Initial revision clasohm parents: diff changeset	214	PlusI_inr "[\| A type; b : B \|] ==> inr(b) : A+B"
a5a9c433f639 Initial revision clasohm parents: diff changeset	215	PlusI_inrL "[\| A type; b = d : B \|] ==> inr(b) = inr(d) : A+B"
a5a9c433f639 Initial revision clasohm parents: diff changeset	216
a5a9c433f639 Initial revision clasohm parents: diff changeset	217	PlusE
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	218	"[\| p: A+B; !!x. x:A ==> c(x): C(inl(x));
5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	219	!!y. y:B ==> d(y): C(inr(y)) \|]
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	220	==> when(p, %x. c(x), %y. d(y)) : C(p)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	221
a5a9c433f639 Initial revision clasohm parents: diff changeset	222	PlusEL
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	223	"[\| p = q : A+B; !!x. x: A ==> c(x) = e(x) : C(inl(x));
5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	224	!!y. y: B ==> d(y) = f(y) : C(inr(y)) \|]
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	225	==> when(p, %x. c(x), %y. d(y)) = when(q, %x. e(x), %y. f(y)) : C(p)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	226
a5a9c433f639 Initial revision clasohm parents: diff changeset	227	PlusC_inl
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	228	"[\| a: A; !!x. x:A ==> c(x): C(inl(x));
5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	229	!!y. y:B ==> d(y): C(inr(y)) \|]
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	230	==> when(inl(a), %x. c(x), %y. d(y)) = c(a) : C(inl(a))"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	231
a5a9c433f639 Initial revision clasohm parents: diff changeset	232	PlusC_inr
1149 5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	233	"[\| b: B; !!x. x:A ==> c(x): C(inl(x));
5750eba8820d removed \...\ inside strings clasohm parents: 283 diff changeset	234	!!y. y:B ==> d(y): C(inr(y)) \|]
3837 d7f033c74b38 fixed dots; wenzelm parents: 1149 diff changeset	235	==> when(inr(b), %x. c(x), %y. d(y)) = d(b) : C(inr(b))"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	236
a5a9c433f639 Initial revision clasohm parents: diff changeset	237
a5a9c433f639 Initial revision clasohm parents: diff changeset	238	(The type Eq)
a5a9c433f639 Initial revision clasohm parents: diff changeset	239
a5a9c433f639 Initial revision clasohm parents: diff changeset	240	EqF "[\| A type; a : A; b : A \|] ==> Eq(A,a,b) type"
a5a9c433f639 Initial revision clasohm parents: diff changeset	241	EqFL "[\| A=B; a=c: A; b=d : A \|] ==> Eq(A,a,b) = Eq(B,c,d)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	242	EqI "a = b : A ==> eq : Eq(A,a,b)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	243	EqE "p : Eq(A,a,b) ==> a = b : A"
a5a9c433f639 Initial revision clasohm parents: diff changeset	244
a5a9c433f639 Initial revision clasohm parents: diff changeset	245	(By equality of types, can prove C(p) from C(eq), an elimination rule)
a5a9c433f639 Initial revision clasohm parents: diff changeset	246	EqC "p : Eq(A,a,b) ==> p = eq : Eq(A,a,b)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	247
a5a9c433f639 Initial revision clasohm parents: diff changeset	248	(The type F)
a5a9c433f639 Initial revision clasohm parents: diff changeset	249
a5a9c433f639 Initial revision clasohm parents: diff changeset	250	FF "F type"
a5a9c433f639 Initial revision clasohm parents: diff changeset	251	FE "[\| p: F; C type \|] ==> contr(p) : C"
a5a9c433f639 Initial revision clasohm parents: diff changeset	252	FEL "[\| p = q : F; C type \|] ==> contr(p) = contr(q) : C"
a5a9c433f639 Initial revision clasohm parents: diff changeset	253
a5a9c433f639 Initial revision clasohm parents: diff changeset	254	(*The type T
a5a9c433f639 Initial revision clasohm parents: diff changeset	255	Martin-Lof's book (page 68) discusses elimination and computation.
a5a9c433f639 Initial revision clasohm parents: diff changeset	256	Elimination can be derived by computation and equality of types,
a5a9c433f639 Initial revision clasohm parents: diff changeset	257	but with an extra premise C(x) type x:T.
a5a9c433f639 Initial revision clasohm parents: diff changeset	258	Also computation can be derived from elimination. *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	259
a5a9c433f639 Initial revision clasohm parents: diff changeset	260	TF "T type"
a5a9c433f639 Initial revision clasohm parents: diff changeset	261	TI "tt : T"
a5a9c433f639 Initial revision clasohm parents: diff changeset	262	TE "[\| p : T; c : C(tt) \|] ==> c : C(p)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	263	TEL "[\| p = q : T; c = d : C(tt) \|] ==> c = d : C(p)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	264	TC "p : T ==> p = tt : T"
a5a9c433f639 Initial revision clasohm parents: diff changeset	265	end
a5a9c433f639 Initial revision clasohm parents: diff changeset	266
a5a9c433f639 Initial revision clasohm parents: diff changeset	267
a5a9c433f639 Initial revision clasohm parents: diff changeset	268	ML
a5a9c433f639 Initial revision clasohm parents: diff changeset	269
a5a9c433f639 Initial revision clasohm parents: diff changeset	270	val print_translation =
a5a9c433f639 Initial revision clasohm parents: diff changeset	271	[("Prod", dependent_tr' ("@PROD", "@-->")),
a5a9c433f639 Initial revision clasohm parents: diff changeset	272	("Sum", dependent_tr' ("@SUM", "@*"))];
a5a9c433f639 Initial revision clasohm parents: diff changeset	273

author	wenzelm
	Tue, 13 Sep 2005 22:19:23 +0200
changeset 17339	ab97ccef124a
parent 14854	61bdf2ae4dc5
child 17441	5b5feca0344a
permissions	-rw-r--r--