isabelle: src/ZF/Perm.ML@fb0655539d05 (annotated)

1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	1	(* Title: ZF/Perm.ML
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	2	ID: $Id$
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	4	Copyright 1991 University of Cambridge
a5a9c433f639 Initial revision clasohm parents: diff changeset	5
735 f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	6	The theory underlying permutation groups
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	7	-- Composition of relations, the identity relation
a5a9c433f639 Initial revision clasohm parents: diff changeset	8	-- Injections, surjections, bijections
a5a9c433f639 Initial revision clasohm parents: diff changeset	9	-- Lemmas for the Schroeder-Bernstein Theorem
a5a9c433f639 Initial revision clasohm parents: diff changeset	10	*)
a5a9c433f639 Initial revision clasohm parents: diff changeset	11
a5a9c433f639 Initial revision clasohm parents: diff changeset	12	open Perm;
a5a9c433f639 Initial revision clasohm parents: diff changeset	13
a5a9c433f639 Initial revision clasohm parents: diff changeset	14	( Surjective function space )
a5a9c433f639 Initial revision clasohm parents: diff changeset	15
a5a9c433f639 Initial revision clasohm parents: diff changeset	16	goalw Perm.thy [surj_def] "!!f A B. f: surj(A,B) ==> f: A->B";
a5a9c433f639 Initial revision clasohm parents: diff changeset	17	by (etac CollectD1 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	18	qed "surj_is_fun";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	19
a5a9c433f639 Initial revision clasohm parents: diff changeset	20	goalw Perm.thy [surj_def] "!!f A B. f : Pi(A,B) ==> f: surj(A,range(f))";
a5a9c433f639 Initial revision clasohm parents: diff changeset	21	by (fast_tac (ZF_cs addIs [apply_equality]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	22	addEs [range_of_fun,domain_type]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	23	qed "fun_is_surj";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	24
a5a9c433f639 Initial revision clasohm parents: diff changeset	25	goalw Perm.thy [surj_def] "!!f A B. f: surj(A,B) ==> range(f)=B";
a5a9c433f639 Initial revision clasohm parents: diff changeset	26	by (best_tac (ZF_cs addIs [equalityI,apply_Pair] addEs [range_type]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	27	qed "surj_range";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	28
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	29	( A function with a right inverse is a surjection )
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	30
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	31	val prems = goalw Perm.thy [surj_def]
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	32	"[\| f: A->B; !!y. y:B ==> d(y): A; !!y. y:B ==> f`d(y) = y \
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	33	\ \|] ==> f: surj(A,B)";
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	34	by (fast_tac (ZF_cs addIs prems) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	35	qed "f_imp_surjective";
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	36
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	37	val prems = goal Perm.thy
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	38	"[\| !!x. x:A ==> c(x): B; \
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	39	\ !!y. y:B ==> d(y): A; \
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	40	\ !!y. y:B ==> c(d(y)) = y \
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	41	\ \|] ==> (lam x:A.c(x)) : surj(A,B)";
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	42	by (res_inst_tac [("d", "d")] f_imp_surjective 1);
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	43	by (ALLGOALS (asm_simp_tac (ZF_ss addsimps ([lam_type]@prems)) ));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	44	qed "lam_surjective";
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	45
735 f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	46	(Cantor's theorem revisited)
f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	47	goalw Perm.thy [surj_def] "f ~: surj(A,Pow(A))";
f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	48	by (safe_tac ZF_cs);
f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	49	by (cut_facts_tac [cantor] 1);
f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	50	by (fast_tac subset_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	51	qed "cantor_surj";
735 f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	52
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	53
a5a9c433f639 Initial revision clasohm parents: diff changeset	54	( Injective function space )
a5a9c433f639 Initial revision clasohm parents: diff changeset	55
a5a9c433f639 Initial revision clasohm parents: diff changeset	56	goalw Perm.thy [inj_def] "!!f A B. f: inj(A,B) ==> f: A->B";
a5a9c433f639 Initial revision clasohm parents: diff changeset	57	by (etac CollectD1 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	58	qed "inj_is_fun";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	59
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	60	(Good for dealing with sets of pairs, but a bit ugly in use [used in AC])
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	61	goalw Perm.thy [inj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	62	"!!f A B. [\| <a,b>:f; <c,b>:f; f: inj(A,B) \|] ==> a=c";
a5a9c433f639 Initial revision clasohm parents: diff changeset	63	by (REPEAT (eresolve_tac [asm_rl, Pair_mem_PiE, CollectE] 1));
a5a9c433f639 Initial revision clasohm parents: diff changeset	64	by (fast_tac ZF_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	65	qed "inj_equality";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	66
826 190974c664a3 inj_apply_equality: new lcp parents: 791 diff changeset	67	goalw thy [inj_def] "!!A B f. [\| f:inj(A,B); a:A; b:A; f`a=f`b \|] ==> a=b";
190974c664a3 inj_apply_equality: new lcp parents: 791 diff changeset	68	by (fast_tac ZF_cs 1);
190974c664a3 inj_apply_equality: new lcp parents: 791 diff changeset	69	val inj_apply_equality = result();
190974c664a3 inj_apply_equality: new lcp parents: 791 diff changeset	70
484 70b789956bd3 Axiom of choice, cardinality results, etc. lcp parents: 437 diff changeset	71	( A function with a left inverse is an injection )
70b789956bd3 Axiom of choice, cardinality results, etc. lcp parents: 437 diff changeset	72
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	73	goal Perm.thy "!!f. [\| f: A->B; ALL x:A. d(f`x)=x \|] ==> f: inj(A,B)";
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	74	by (asm_simp_tac (ZF_ss addsimps [inj_def]) 1);
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	75	by (deepen_tac (ZF_cs addEs [subst_context RS box_equals]) 0 1);
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	76	bind_thm ("f_imp_injective", ballI RSN (2,result()));
484 70b789956bd3 Axiom of choice, cardinality results, etc. lcp parents: 437 diff changeset	77
70b789956bd3 Axiom of choice, cardinality results, etc. lcp parents: 437 diff changeset	78	val prems = goal Perm.thy
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	79	"[\| !!x. x:A ==> c(x): B; \
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	80	\ !!x. x:A ==> d(c(x)) = x \
484 70b789956bd3 Axiom of choice, cardinality results, etc. lcp parents: 437 diff changeset	81	\ \|] ==> (lam x:A.c(x)) : inj(A,B)";
70b789956bd3 Axiom of choice, cardinality results, etc. lcp parents: 437 diff changeset	82	by (res_inst_tac [("d", "d")] f_imp_injective 1);
70b789956bd3 Axiom of choice, cardinality results, etc. lcp parents: 437 diff changeset	83	by (ALLGOALS (asm_simp_tac (ZF_ss addsimps ([lam_type]@prems)) ));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	84	qed "lam_injective";
484 70b789956bd3 Axiom of choice, cardinality results, etc. lcp parents: 437 diff changeset	85
70b789956bd3 Axiom of choice, cardinality results, etc. lcp parents: 437 diff changeset	86	( Bijections )
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	87
a5a9c433f639 Initial revision clasohm parents: diff changeset	88	goalw Perm.thy [bij_def] "!!f A B. f: bij(A,B) ==> f: inj(A,B)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	89	by (etac IntD1 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	90	qed "bij_is_inj";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	91
a5a9c433f639 Initial revision clasohm parents: diff changeset	92	goalw Perm.thy [bij_def] "!!f A B. f: bij(A,B) ==> f: surj(A,B)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	93	by (etac IntD2 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	94	qed "bij_is_surj";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	95
a5a9c433f639 Initial revision clasohm parents: diff changeset	96	(* f: bij(A,B) ==> f: A->B *)
782 200a16083201 added bind_thm for theorems defined by "standard ..." clasohm parents: 760 diff changeset	97	bind_thm ("bij_is_fun", (bij_is_inj RS inj_is_fun));
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	98
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	99	val prems = goalw Perm.thy [bij_def]
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	100	"[\| !!x. x:A ==> c(x): B; \
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	101	\ !!y. y:B ==> d(y): A; \
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	102	\ !!x. x:A ==> d(c(x)) = x; \
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	103	\ !!y. y:B ==> c(d(y)) = y \
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	104	\ \|] ==> (lam x:A.c(x)) : bij(A,B)";
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	105	by (REPEAT (ares_tac (prems @ [IntI, lam_injective, lam_surjective]) 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	106	qed "lam_bijective";
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	107
6 8ce8c4d13d4d Installation of new simplifier for ZF. Deleted all congruence rules not lcp parents: 0 diff changeset	108
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	109	( Identity function )
a5a9c433f639 Initial revision clasohm parents: diff changeset	110
a5a9c433f639 Initial revision clasohm parents: diff changeset	111	val [prem] = goalw Perm.thy [id_def] "a:A ==> <a,a> : id(A)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	112	by (rtac (prem RS lamI) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	113	qed "idI";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	114
a5a9c433f639 Initial revision clasohm parents: diff changeset	115	val major::prems = goalw Perm.thy [id_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	116	"[\| p: id(A); !!x.[\| x:A; p=<x,x> \|] ==> P \
a5a9c433f639 Initial revision clasohm parents: diff changeset	117	\ \|] ==> P";
a5a9c433f639 Initial revision clasohm parents: diff changeset	118	by (rtac (major RS lamE) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	119	by (REPEAT (ares_tac prems 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	120	qed "idE";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	121
a5a9c433f639 Initial revision clasohm parents: diff changeset	122	goalw Perm.thy [id_def] "id(A) : A->A";
a5a9c433f639 Initial revision clasohm parents: diff changeset	123	by (rtac lam_type 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	124	by (assume_tac 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	125	qed "id_type";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	126
826 190974c664a3 inj_apply_equality: new lcp parents: 791 diff changeset	127	goalw Perm.thy [id_def] "!!A x. x:A ==> id(A)`x = x";
190974c664a3 inj_apply_equality: new lcp parents: 791 diff changeset	128	by (asm_simp_tac ZF_ss 1);
190974c664a3 inj_apply_equality: new lcp parents: 791 diff changeset	129	val id_conv = result();
190974c664a3 inj_apply_equality: new lcp parents: 791 diff changeset	130
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	131	val [prem] = goalw Perm.thy [id_def] "A<=B ==> id(A) <= id(B)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	132	by (rtac (prem RS lam_mono) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	133	qed "id_mono";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	134
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	135	goalw Perm.thy [inj_def,id_def] "!!A B. A<=B ==> id(A): inj(A,B)";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	136	by (REPEAT (ares_tac [CollectI,lam_type] 1));
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	137	by (etac subsetD 1 THEN assume_tac 1);
6 8ce8c4d13d4d Installation of new simplifier for ZF. Deleted all congruence rules not lcp parents: 0 diff changeset	138	by (simp_tac ZF_ss 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	139	qed "id_subset_inj";
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	140
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	141	val id_inj = subset_refl RS id_subset_inj;
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	142
a5a9c433f639 Initial revision clasohm parents: diff changeset	143	goalw Perm.thy [id_def,surj_def] "id(A): surj(A,A)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	144	by (fast_tac (ZF_cs addIs [lam_type,beta]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	145	qed "id_surj";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	146
a5a9c433f639 Initial revision clasohm parents: diff changeset	147	goalw Perm.thy [bij_def] "id(A): bij(A,A)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	148	by (fast_tac (ZF_cs addIs [id_inj,id_surj]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	149	qed "id_bij";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	150
517 a9f93400f307 for infinite datatypes with arbitrary index sets lcp parents: 502 diff changeset	151	goalw Perm.thy [id_def] "A <= B <-> id(A) : A->B";
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	152	by (fast_tac (ZF_cs addSIs [lam_type] addDs [apply_type] addss ZF_ss) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	153	qed "subset_iff_id";
517 a9f93400f307 for infinite datatypes with arbitrary index sets lcp parents: 502 diff changeset	154
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	155
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	156	(* Converse of a function *)
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	157
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	158	goalw Perm.thy [inj_def] "!!f. f: inj(A,B) ==> converse(f) : range(f)->A";
1791 6b38717439c6 Addition of converse_iff, domain_converse, range_converse as rewrites paulson parents: 1787 diff changeset	159	by (asm_simp_tac (ZF_ss addsimps [Pi_iff, function_def]) 1);
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1791 diff changeset	160	by (etac CollectE 1);
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	161	by (asm_simp_tac (ZF_ss addsimps [apply_iff]) 1);
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	162	by (fast_tac (ZF_cs addDs [fun_is_rel]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	163	qed "inj_converse_fun";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	164
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	165	( Equations for converse(f) )
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	166
a5a9c433f639 Initial revision clasohm parents: diff changeset	167	(The premises are equivalent to saying that f is injective...)
a5a9c433f639 Initial revision clasohm parents: diff changeset	168	val prems = goal Perm.thy
a5a9c433f639 Initial revision clasohm parents: diff changeset	169	"[\| f: A->B; converse(f): C->A; a: A \|] ==> converse(f)`(f`a) = a";
a5a9c433f639 Initial revision clasohm parents: diff changeset	170	by (fast_tac (ZF_cs addIs (prems@[apply_Pair,apply_equality,converseI])) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	171	qed "left_inverse_lemma";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	172
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	173	goal Perm.thy
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	174	"!!f. [\| f: inj(A,B); a: A \|] ==> converse(f)`(f`a) = a";
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	175	by (fast_tac (ZF_cs addIs [left_inverse_lemma,inj_converse_fun,inj_is_fun]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	176	qed "left_inverse";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	177
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	178	val left_inverse_bij = bij_is_inj RS left_inverse;
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	179
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	180	val prems = goal Perm.thy
a5a9c433f639 Initial revision clasohm parents: diff changeset	181	"[\| f: A->B; converse(f): C->A; b: C \|] ==> f`(converse(f)`b) = b";
a5a9c433f639 Initial revision clasohm parents: diff changeset	182	by (rtac (apply_Pair RS (converseD RS apply_equality)) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	183	by (REPEAT (resolve_tac prems 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	184	qed "right_inverse_lemma";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	185
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	186	(*Should the premises be f:surj(A,B), b:B for symmetry with left_inverse?
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	187	No: they would not imply that converse(f) was a function! *)
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	188	goal Perm.thy "!!f. [\| f: inj(A,B); b: range(f) \|] ==> f`(converse(f)`b) = b";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	189	by (rtac right_inverse_lemma 1);
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	190	by (REPEAT (ares_tac [inj_converse_fun,inj_is_fun] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	191	qed "right_inverse";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	192
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	193	goal Perm.thy "!!f. [\| f: bij(A,B); b: B \|] ==> f`(converse(f)`b) = b";
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	194	by (fast_tac (ZF_cs addss
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1791 diff changeset	195	(ZF_ss addsimps [bij_def, right_inverse, surj_range])) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	196	qed "right_inverse_bij";
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	197
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	198	( Converses of injections, surjections, bijections )
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	199
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	200	goal Perm.thy "!!f A B. f: inj(A,B) ==> converse(f): inj(range(f), A)";
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	201	by (rtac f_imp_injective 1);
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	202	by (etac inj_converse_fun 1);
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	203	by (rtac right_inverse 1);
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	204	by (REPEAT (assume_tac 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	205	qed "inj_converse_inj";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	206
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	207	goal Perm.thy "!!f A B. f: inj(A,B) ==> converse(f): surj(range(f), A)";
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	208	by (ITER_DEEPEN (has_fewer_prems 1)
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	209	(ares_tac [f_imp_surjective, inj_converse_fun, left_inverse,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1791 diff changeset	210	inj_is_fun, range_of_fun RS apply_type]));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	211	qed "inj_converse_surj";
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	212
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	213	goalw Perm.thy [bij_def] "!!f A B. f: bij(A,B) ==> converse(f): bij(B,A)";
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	214	by (fast_tac (ZF_cs addEs [surj_range RS subst, inj_converse_inj,
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1791 diff changeset	215	inj_converse_surj]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	216	qed "bij_converse_bij";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	217
a5a9c433f639 Initial revision clasohm parents: diff changeset	218
a5a9c433f639 Initial revision clasohm parents: diff changeset	219	( Composition of two relations )
a5a9c433f639 Initial revision clasohm parents: diff changeset	220
791 354a56e923ff updated comment; lcp parents: 782 diff changeset	221	(The inductive definition package could derive these theorems for (r O s))
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	222
a5a9c433f639 Initial revision clasohm parents: diff changeset	223	goalw Perm.thy [comp_def] "!!r s. [\| <a,b>:s; <b,c>:r \|] ==> <a,c> : r O s";
a5a9c433f639 Initial revision clasohm parents: diff changeset	224	by (fast_tac ZF_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	225	qed "compI";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	226
a5a9c433f639 Initial revision clasohm parents: diff changeset	227	val prems = goalw Perm.thy [comp_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	228	"[\| xz : r O s; \
a5a9c433f639 Initial revision clasohm parents: diff changeset	229	\ !!x y z. [\| xz=<x,z>; <x,y>:s; <y,z>:r \|] ==> P \
a5a9c433f639 Initial revision clasohm parents: diff changeset	230	\ \|] ==> P";
a5a9c433f639 Initial revision clasohm parents: diff changeset	231	by (cut_facts_tac prems 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	232	by (REPEAT (eresolve_tac [CollectE, exE, conjE] 1 ORELSE ares_tac prems 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	233	qed "compE";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	234
a5a9c433f639 Initial revision clasohm parents: diff changeset	235	val compEpair =
a5a9c433f639 Initial revision clasohm parents: diff changeset	236	rule_by_tactic (REPEAT_FIRST (etac Pair_inject ORELSE' bound_hyp_subst_tac)
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	237	THEN prune_params_tac)
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	238	(read_instantiate [("xz","<a,c>")] compE);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	239
735 f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	240	val comp_cs = ZF_cs addSIs [idI] addIs [compI] addSEs [compE,idE];
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	241
a5a9c433f639 Initial revision clasohm parents: diff changeset	242	( Domain and Range -- see Suppes, section 3.1 )
a5a9c433f639 Initial revision clasohm parents: diff changeset	243
a5a9c433f639 Initial revision clasohm parents: diff changeset	244	(Boyer et al., Set Theory in First-Order Logic, JAR 2 (1986), 287-327)
a5a9c433f639 Initial revision clasohm parents: diff changeset	245	goal Perm.thy "range(r O s) <= range(r)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	246	by (fast_tac comp_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	247	qed "range_comp";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	248
a5a9c433f639 Initial revision clasohm parents: diff changeset	249	goal Perm.thy "!!r s. domain(r) <= range(s) ==> range(r O s) = range(r)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	250	by (rtac (range_comp RS equalityI) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	251	by (fast_tac comp_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	252	qed "range_comp_eq";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	253
a5a9c433f639 Initial revision clasohm parents: diff changeset	254	goal Perm.thy "domain(r O s) <= domain(s)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	255	by (fast_tac comp_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	256	qed "domain_comp";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	257
a5a9c433f639 Initial revision clasohm parents: diff changeset	258	goal Perm.thy "!!r s. range(s) <= domain(r) ==> domain(r O s) = domain(s)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	259	by (rtac (domain_comp RS equalityI) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	260	by (fast_tac comp_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	261	qed "domain_comp_eq";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	262
218 be834b9a0c72 ZF/perm/image_comp: new lcp parents: 37 diff changeset	263	goal Perm.thy "(r O s)``A = r``(s``A)";
be834b9a0c72 ZF/perm/image_comp: new lcp parents: 37 diff changeset	264	by (fast_tac (comp_cs addIs [equalityI]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	265	qed "image_comp";
218 be834b9a0c72 ZF/perm/image_comp: new lcp parents: 37 diff changeset	266
be834b9a0c72 ZF/perm/image_comp: new lcp parents: 37 diff changeset	267
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	268	( Other results )
a5a9c433f639 Initial revision clasohm parents: diff changeset	269
a5a9c433f639 Initial revision clasohm parents: diff changeset	270	goal Perm.thy "!!r s. [\| r'<=r; s'<=s \|] ==> (r' O s') <= (r O s)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	271	by (fast_tac comp_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	272	qed "comp_mono";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	273
a5a9c433f639 Initial revision clasohm parents: diff changeset	274	(composition preserves relations)
a5a9c433f639 Initial revision clasohm parents: diff changeset	275	goal Perm.thy "!!r s. [\| s<=AB; r<=BC \|] ==> (r O s) <= A*C";
a5a9c433f639 Initial revision clasohm parents: diff changeset	276	by (fast_tac comp_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	277	qed "comp_rel";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	278
a5a9c433f639 Initial revision clasohm parents: diff changeset	279	(associative law for composition)
a5a9c433f639 Initial revision clasohm parents: diff changeset	280	goal Perm.thy "(r O s) O t = r O (s O t)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	281	by (fast_tac (comp_cs addIs [equalityI]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	282	qed "comp_assoc";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	283
a5a9c433f639 Initial revision clasohm parents: diff changeset	284	(*left identity of composition; provable inclusions are
a5a9c433f639 Initial revision clasohm parents: diff changeset	285	id(A) O r <= r
a5a9c433f639 Initial revision clasohm parents: diff changeset	286	and [\| r<=AB; B<=C \|] ==> r <= id(C) O r )
a5a9c433f639 Initial revision clasohm parents: diff changeset	287	goal Perm.thy "!!r A B. r<=A*B ==> id(B) O r = r";
a5a9c433f639 Initial revision clasohm parents: diff changeset	288	by (fast_tac (comp_cs addIs [equalityI]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	289	qed "left_comp_id";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	290
a5a9c433f639 Initial revision clasohm parents: diff changeset	291	(*right identity of composition; provable inclusions are
a5a9c433f639 Initial revision clasohm parents: diff changeset	292	r O id(A) <= r
a5a9c433f639 Initial revision clasohm parents: diff changeset	293	and [\| r<=AB; A<=C \|] ==> r <= r O id(C) )
a5a9c433f639 Initial revision clasohm parents: diff changeset	294	goal Perm.thy "!!r A B. r<=A*B ==> r O id(A) = r";
a5a9c433f639 Initial revision clasohm parents: diff changeset	295	by (fast_tac (comp_cs addIs [equalityI]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	296	qed "right_comp_id";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	297
a5a9c433f639 Initial revision clasohm parents: diff changeset	298
a5a9c433f639 Initial revision clasohm parents: diff changeset	299	( Composition preserves functions, injections, and surjections )
a5a9c433f639 Initial revision clasohm parents: diff changeset	300
693 b89939545725 ZF/Perm/inj_converse_fun: tidied; removed uses of PiI/E lcp parents: 517 diff changeset	301	goalw Perm.thy [function_def]
b89939545725 ZF/Perm/inj_converse_fun: tidied; removed uses of PiI/E lcp parents: 517 diff changeset	302	"!!f g. [\| function(g); function(f) \|] ==> function(f O g)";
735 f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	303	by (fast_tac (ZF_cs addIs [compI] addSEs [compE, Pair_inject]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	304	qed "comp_function";
693 b89939545725 ZF/Perm/inj_converse_fun: tidied; removed uses of PiI/E lcp parents: 517 diff changeset	305
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	306	goal Perm.thy "!!f g. [\| g: A->B; f: B->C \|] ==> (f O g) : A->C";
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	307	by (asm_full_simp_tac
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	308	(ZF_ss addsimps [Pi_def, comp_function, Pow_iff, comp_rel]
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	309	setloop etac conjE) 1);
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1791 diff changeset	310	by (stac (range_rel_subset RS domain_comp_eq) 1 THEN assume_tac 2);
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	311	by (fast_tac ZF_cs 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	312	qed "comp_fun";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	313
a5a9c433f639 Initial revision clasohm parents: diff changeset	314	goal Perm.thy "!!f g. [\| g: A->B; f: B->C; a:A \|] ==> (f O g)`a = f`(g`a)";
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	315	by (REPEAT (ares_tac [comp_fun,apply_equality,compI,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	316	apply_Pair,apply_type] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	317	qed "comp_fun_apply";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	318
862 ce99db6728ba Proved comp_lam. lcp parents: 826 diff changeset	319	(Simplifies compositions of lambda-abstractions)
ce99db6728ba Proved comp_lam. lcp parents: 826 diff changeset	320	val [prem] = goal Perm.thy
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	321	"[\| !!x. x:A ==> b(x): B \
862 ce99db6728ba Proved comp_lam. lcp parents: 826 diff changeset	322	\ \|] ==> (lam y:B.c(y)) O (lam x:A. b(x)) = (lam x:A. c(b(x)))";
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	323	by (rtac fun_extension 1);
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	324	by (rtac comp_fun 1);
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	325	by (rtac lam_funtype 2);
862 ce99db6728ba Proved comp_lam. lcp parents: 826 diff changeset	326	by (typechk_tac (prem::ZF_typechecks));
ce99db6728ba Proved comp_lam. lcp parents: 826 diff changeset	327	by (asm_simp_tac (ZF_ss addsimps [comp_fun_apply]
ce99db6728ba Proved comp_lam. lcp parents: 826 diff changeset	328	setsolver type_auto_tac [lam_type, lam_funtype, prem]) 1);
ce99db6728ba Proved comp_lam. lcp parents: 826 diff changeset	329	qed "comp_lam";
ce99db6728ba Proved comp_lam. lcp parents: 826 diff changeset	330
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	331	goal Perm.thy "!!f g. [\| g: inj(A,B); f: inj(B,C) \|] ==> (f O g) : inj(A,C)";
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	332	by (res_inst_tac [("d", "%y. converse(g) ` (converse(f) ` y)")]
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	333	f_imp_injective 1);
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	334	by (REPEAT (ares_tac [comp_fun, inj_is_fun] 1));
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	335	by (asm_simp_tac (ZF_ss addsimps [comp_fun_apply, left_inverse]
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	336	setsolver type_auto_tac [inj_is_fun, apply_type]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	337	qed "comp_inj";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	338
a5a9c433f639 Initial revision clasohm parents: diff changeset	339	goalw Perm.thy [surj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	340	"!!f g. [\| g: surj(A,B); f: surj(B,C) \|] ==> (f O g) : surj(A,C)";
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	341	by (best_tac (ZF_cs addSIs [comp_fun,comp_fun_apply]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	342	qed "comp_surj";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	343
a5a9c433f639 Initial revision clasohm parents: diff changeset	344	goalw Perm.thy [bij_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	345	"!!f g. [\| g: bij(A,B); f: bij(B,C) \|] ==> (f O g) : bij(A,C)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	346	by (fast_tac (ZF_cs addIs [comp_inj,comp_surj]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	347	qed "comp_bij";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	348
a5a9c433f639 Initial revision clasohm parents: diff changeset	349
a5a9c433f639 Initial revision clasohm parents: diff changeset	350	(** Dual properties of inj and surj -- useful for proofs from
a5a9c433f639 Initial revision clasohm parents: diff changeset	351	D Pastre. Automatic theorem proving in set theory.
a5a9c433f639 Initial revision clasohm parents: diff changeset	352	Artificial Intelligence, 10:1--27, 1978. **)
a5a9c433f639 Initial revision clasohm parents: diff changeset	353
a5a9c433f639 Initial revision clasohm parents: diff changeset	354	goalw Perm.thy [inj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	355	"!!f g. [\| (f O g): inj(A,C); g: A->B; f: B->C \|] ==> g: inj(A,B)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	356	by (safe_tac comp_cs);
a5a9c433f639 Initial revision clasohm parents: diff changeset	357	by (REPEAT (eresolve_tac [asm_rl, bspec RS bspec RS mp] 1));
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	358	by (asm_simp_tac (FOL_ss addsimps [comp_fun_apply]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	359	qed "comp_mem_injD1";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	360
a5a9c433f639 Initial revision clasohm parents: diff changeset	361	goalw Perm.thy [inj_def,surj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	362	"!!f g. [\| (f O g): inj(A,C); g: surj(A,B); f: B->C \|] ==> f: inj(B,C)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	363	by (safe_tac comp_cs);
a5a9c433f639 Initial revision clasohm parents: diff changeset	364	by (res_inst_tac [("x1", "x")] (bspec RS bexE) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	365	by (eres_inst_tac [("x1", "w")] (bspec RS bexE) 3);
a5a9c433f639 Initial revision clasohm parents: diff changeset	366	by (REPEAT (assume_tac 1));
6 8ce8c4d13d4d Installation of new simplifier for ZF. Deleted all congruence rules not lcp parents: 0 diff changeset	367	by (safe_tac comp_cs);
8ce8c4d13d4d Installation of new simplifier for ZF. Deleted all congruence rules not lcp parents: 0 diff changeset	368	by (res_inst_tac [("t", "op `(g)")] subst_context 1);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	369	by (REPEAT (eresolve_tac [asm_rl, bspec RS bspec RS mp] 1));
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	370	by (asm_simp_tac (FOL_ss addsimps [comp_fun_apply]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	371	qed "comp_mem_injD2";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	372
a5a9c433f639 Initial revision clasohm parents: diff changeset	373	goalw Perm.thy [surj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	374	"!!f g. [\| (f O g): surj(A,C); g: A->B; f: B->C \|] ==> f: surj(B,C)";
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	375	by (fast_tac (comp_cs addSIs [comp_fun_apply RS sym, apply_type]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	376	qed "comp_mem_surjD1";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	377
a5a9c433f639 Initial revision clasohm parents: diff changeset	378	goal Perm.thy
a5a9c433f639 Initial revision clasohm parents: diff changeset	379	"!!f g. [\| (f O g)`a = c; g: A->B; f: B->C; a:A \|] ==> f`(g`a) = c";
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	380	by (REPEAT (ares_tac [comp_fun_apply RS sym RS trans] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	381	qed "comp_fun_applyD";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	382
a5a9c433f639 Initial revision clasohm parents: diff changeset	383	goalw Perm.thy [inj_def,surj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	384	"!!f g. [\| (f O g): surj(A,C); g: A->B; f: inj(B,C) \|] ==> g: surj(A,B)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	385	by (safe_tac comp_cs);
a5a9c433f639 Initial revision clasohm parents: diff changeset	386	by (eres_inst_tac [("x1", "f`y")] (bspec RS bexE) 1);
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	387	by (REPEAT (ares_tac [apply_type] 1 ORELSE dtac comp_fun_applyD 1));
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	388	by (best_tac (comp_cs addSIs [apply_type]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	389	qed "comp_mem_surjD2";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	390
a5a9c433f639 Initial revision clasohm parents: diff changeset	391
a5a9c433f639 Initial revision clasohm parents: diff changeset	392	( inverses of composition )
a5a9c433f639 Initial revision clasohm parents: diff changeset	393
a5a9c433f639 Initial revision clasohm parents: diff changeset	394	(*left inverse of composition; one inclusion is
a5a9c433f639 Initial revision clasohm parents: diff changeset	395	f: A->B ==> id(A) <= converse(f) O f *)
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	396	goalw Perm.thy [inj_def] "!!f. f: inj(A,B) ==> converse(f) O f = id(A)";
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	397	by (fast_tac (comp_cs addIs [equalityI, apply_Pair]
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	398	addEs [domain_type]
9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	399	addss (ZF_ss addsimps [apply_iff])) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	400	qed "left_comp_inverse";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	401
a5a9c433f639 Initial revision clasohm parents: diff changeset	402	(*right inverse of composition; one inclusion is
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	403	f: A->B ==> f O converse(f) <= id(B)
735 f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	404	*)
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	405	val [prem] = goalw Perm.thy [surj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	406	"f: surj(A,B) ==> f O converse(f) = id(B)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	407	val appfD = (prem RS CollectD1) RSN (3,apply_equality2);
a5a9c433f639 Initial revision clasohm parents: diff changeset	408	by (cut_facts_tac [prem] 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	409	by (rtac equalityI 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	410	by (best_tac (comp_cs addEs [domain_type, range_type, make_elim appfD]) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	411	by (best_tac (comp_cs addIs [apply_Pair]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	412	qed "right_comp_inverse";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	413
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	414	( Proving that a function is a bijection )
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	415
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	416	goalw Perm.thy [id_def]
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	417	"!!f A B. [\| f: A->B; g: B->A \|] ==> \
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	418	\ f O g = id(B) <-> (ALL y:B. f`(g`y)=y)";
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	419	by (safe_tac ZF_cs);
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	420	by (dres_inst_tac [("t", "%h.h`y ")] subst_context 1);
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	421	by (asm_full_simp_tac (ZF_ss addsimps [comp_fun_apply]) 1);
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	422	by (rtac fun_extension 1);
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	423	by (REPEAT (ares_tac [comp_fun, lam_type] 1));
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	424	by (asm_simp_tac (ZF_ss addsimps [comp_fun_apply]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	425	qed "comp_eq_id_iff";
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	426
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	427	goalw Perm.thy [bij_def]
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	428	"!!f A B. [\| f: A->B; g: B->A; f O g = id(B); g O f = id(A) \
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	429	\ \|] ==> f : bij(A,B)";
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	430	by (asm_full_simp_tac (ZF_ss addsimps [comp_eq_id_iff]) 1);
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	431	by (REPEAT (ares_tac [conjI, f_imp_injective, f_imp_surjective] 1
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	432	ORELSE eresolve_tac [bspec, apply_type] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	433	qed "fg_imp_bijective";
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	434
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	435	goal Perm.thy "!!f A. [\| f: A->A; f O f = id(A) \|] ==> f : bij(A,A)";
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	436	by (REPEAT (ares_tac [fg_imp_bijective] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	437	qed "nilpotent_imp_bijective";
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 218 diff changeset	438
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	439	goal Perm.thy "!!f A B. [\| converse(f): B->A; f: A->B \|] ==> f : bij(A,B)";
77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	440	by (asm_simp_tac (ZF_ss addsimps [fg_imp_bijective, comp_eq_id_iff,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	441	left_inverse_lemma, right_inverse_lemma]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	442	qed "invertible_imp_bijective";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	443
a5a9c433f639 Initial revision clasohm parents: diff changeset	444	( Unions of functions -- cf similar theorems on func.ML )
a5a9c433f639 Initial revision clasohm parents: diff changeset	445
1709 220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	446	(Theorem by KG, proof by LCP)
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	447	goal Perm.thy
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	448	"!!f g. [\| f: inj(A,B); g: inj(C,D); B Int D = 0 \|] ==> \
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	449	\ (lam a: A Un C. if(a:A, f`a, g`a)) : inj(A Un C, B Un D)";
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	450	by (res_inst_tac [("d","%z. if(z:B, converse(f)`z, converse(g)`z)")]
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	451	lam_injective 1);
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	452	by (ALLGOALS
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	453	(asm_simp_tac (ZF_ss addsimps [inj_is_fun RS apply_type, left_inverse]
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	454	setloop (split_tac [expand_if] ORELSE' etac UnE))));
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	455	by (fast_tac (ZF_cs addSEs [inj_is_fun RS apply_type] addDs [equals0D]) 1);
220dd588bfc9 New lemma inspired by KG paulson parents: 1610 diff changeset	456	qed "inj_disjoint_Un";
1610 60ab5844fe81 Updated comments paulson parents: 1461 diff changeset	457
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	458	goalw Perm.thy [surj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	459	"!!f g. [\| f: surj(A,B); g: surj(C,D); A Int C = 0 \|] ==> \
a5a9c433f639 Initial revision clasohm parents: diff changeset	460	\ (f Un g) : surj(A Un C, B Un D)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	461	by (DEPTH_SOLVE_1 (eresolve_tac [fun_disjoint_apply1, fun_disjoint_apply2] 1
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	462	ORELSE ball_tac 1
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	463	ORELSE (rtac trans 1 THEN atac 2)
6bcb44e4d6e5 expanded tabs clasohm parents: 1248 diff changeset	464	ORELSE step_tac (ZF_cs addIs [fun_disjoint_Un]) 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	465	qed "surj_disjoint_Un";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	466
a5a9c433f639 Initial revision clasohm parents: diff changeset	467	(*A simple, high-level proof; the version for injections follows from it,
502 77e36960fd9e ZF/Perm.ML/inj_converse_inj, comp_inj: simpler proofs using f_imp_injective lcp parents: 484 diff changeset	468	using f:inj(A,B) <-> f:bij(A,range(f)) *)
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	469	goal Perm.thy
a5a9c433f639 Initial revision clasohm parents: diff changeset	470	"!!f g. [\| f: bij(A,B); g: bij(C,D); A Int C = 0; B Int D = 0 \|] ==> \
a5a9c433f639 Initial revision clasohm parents: diff changeset	471	\ (f Un g) : bij(A Un C, B Un D)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	472	by (rtac invertible_imp_bijective 1);
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1791 diff changeset	473	by (stac converse_Un 1);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	474	by (REPEAT (ares_tac [fun_disjoint_Un, bij_is_fun, bij_converse_bij] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	475	qed "bij_disjoint_Un";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	476
a5a9c433f639 Initial revision clasohm parents: diff changeset	477
a5a9c433f639 Initial revision clasohm parents: diff changeset	478	(** Restrictions as surjections and bijections *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	479
a5a9c433f639 Initial revision clasohm parents: diff changeset	480	val prems = goalw Perm.thy [surj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	481	"f: Pi(A,B) ==> f: surj(A, f``A)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	482	val rls = apply_equality :: (prems RL [apply_Pair,Pi_type]);
a5a9c433f639 Initial revision clasohm parents: diff changeset	483	by (fast_tac (ZF_cs addIs rls) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	484	qed "surj_image";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	485
735 f99621230c2e moved version of Cantors theorem to ZF/Perm.ML lcp parents: 693 diff changeset	486	goal Perm.thy "!!f. [\| f: Pi(C,B); A<=C \|] ==> restrict(f,A)``A = f``A";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	487	by (rtac equalityI 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	488	by (SELECT_GOAL (rewtac restrict_def) 2);
a5a9c433f639 Initial revision clasohm parents: diff changeset	489	by (REPEAT (eresolve_tac [imageE, apply_equality RS subst] 2
a5a9c433f639 Initial revision clasohm parents: diff changeset	490	ORELSE ares_tac [subsetI,lamI,imageI] 2));
a5a9c433f639 Initial revision clasohm parents: diff changeset	491	by (REPEAT (ares_tac [image_mono,restrict_subset,subset_refl] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	492	qed "restrict_image";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	493
a5a9c433f639 Initial revision clasohm parents: diff changeset	494	goalw Perm.thy [inj_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	495	"!!f. [\| f: inj(A,B); C<=A \|] ==> restrict(f,C): inj(C,B)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	496	by (safe_tac (ZF_cs addSEs [restrict_type2]));
a5a9c433f639 Initial revision clasohm parents: diff changeset	497	by (REPEAT (eresolve_tac [asm_rl, bspec RS bspec RS mp, subsetD,
a5a9c433f639 Initial revision clasohm parents: diff changeset	498	box_equals, restrict] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	499	qed "restrict_inj";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	500
a5a9c433f639 Initial revision clasohm parents: diff changeset	501	val prems = goal Perm.thy
a5a9c433f639 Initial revision clasohm parents: diff changeset	502	"[\| f: Pi(A,B); C<=A \|] ==> restrict(f,C): surj(C, f``C)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	503	by (rtac (restrict_image RS subst) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	504	by (rtac (restrict_type2 RS surj_image) 3);
a5a9c433f639 Initial revision clasohm parents: diff changeset	505	by (REPEAT (resolve_tac prems 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	506	qed "restrict_surj";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	507
a5a9c433f639 Initial revision clasohm parents: diff changeset	508	goalw Perm.thy [inj_def,bij_def]
a5a9c433f639 Initial revision clasohm parents: diff changeset	509	"!!f. [\| f: inj(A,B); C<=A \|] ==> restrict(f,C): bij(C, f``C)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	510	by (safe_tac ZF_cs);
a5a9c433f639 Initial revision clasohm parents: diff changeset	511	by (REPEAT (eresolve_tac [bspec RS bspec RS mp, subsetD,
a5a9c433f639 Initial revision clasohm parents: diff changeset	512	box_equals, restrict] 1
a5a9c433f639 Initial revision clasohm parents: diff changeset	513	ORELSE ares_tac [surj_is_fun,restrict_surj] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	514	qed "restrict_bij";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	515
a5a9c433f639 Initial revision clasohm parents: diff changeset	516
a5a9c433f639 Initial revision clasohm parents: diff changeset	517	(* Lemmas for Ramsey's Theorem *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	518
a5a9c433f639 Initial revision clasohm parents: diff changeset	519	goalw Perm.thy [inj_def] "!!f. [\| f: inj(A,B); B<=D \|] ==> f: inj(A,D)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	520	by (fast_tac (ZF_cs addSEs [fun_weaken_type]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	521	qed "inj_weaken_type";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	522
a5a9c433f639 Initial revision clasohm parents: diff changeset	523	val [major] = goal Perm.thy
a5a9c433f639 Initial revision clasohm parents: diff changeset	524	"[\| f: inj(succ(m), A) \|] ==> restrict(f,m) : inj(m, A-{f`m})";
a5a9c433f639 Initial revision clasohm parents: diff changeset	525	by (rtac (major RS restrict_bij RS bij_is_inj RS inj_weaken_type) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	526	by (fast_tac ZF_cs 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	527	by (cut_facts_tac [major] 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	528	by (rewtac inj_def);
1782 ab45b881fa62 Shortened a proof paulson parents: 1709 diff changeset	529	by (fast_tac (ZF_cs addEs [range_type, mem_irrefl] addDs [apply_equality]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	530	qed "inj_succ_restrict";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	531
a5a9c433f639 Initial revision clasohm parents: diff changeset	532	goalw Perm.thy [inj_def]
37 cebe01deba80 added ~: for "not in" lcp parents: 6 diff changeset	533	"!!f. [\| f: inj(A,B); a~:A; b~:B \|] ==> \
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	534	\ cons(<a,b>,f) : inj(cons(a,A), cons(b,B))";
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	535	by (fast_tac (ZF_cs addIs [apply_type]
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1791 diff changeset	536	addss (ZF_ss addsimps [fun_extend, fun_extend_apply2,
639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1791 diff changeset	537	fun_extend_apply1]) ) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 735 diff changeset	538	qed "inj_extend";
1787 9246e236a57f Tidied some proofs paulson parents: 1782 diff changeset	539

author	paulson
	Wed, 09 Oct 1996 13:32:33 +0200
changeset 2073	fb0655539d05
parent 2033	639de962ded4
child 2469	b50b8c0eec01
permissions	-rw-r--r--