isabelle: src/ZF/Zorn.ML@1957113f0d7d (annotated)

485 5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	1	(* Title: ZF/Zorn.ML
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	2	ID: $Id$
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	4	Copyright 1994 University of Cambridge
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	5
516 1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	6	Proofs from the paper
485 5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	7	Abrial & Laffitte,
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	8	Towards the Mechanization of the Proofs of Some
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	9	Classical Theorems of Set Theory.
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	10	*)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	11
516 1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	12	open Zorn;
485 5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	13
516 1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	14	(* Section 1. Mathematical Preamble *)
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	15
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	16	goal ZF.thy "!!A B C. (ALL x:C. x<=A \| B<=x) ==> Union(C)<=A \| B<=Union(C)";
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	17	by (fast_tac ZF_cs 1);
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	18	val Union_lemma0 = result();
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	19
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	20	goal ZF.thy
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	21	"!!A B C. [\| c:C; ALL x:C. A<=x \| x<=B \|] ==> A<=Inter(C) \| Inter(C)<=B";
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	22	by (fast_tac ZF_cs 1);
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	23	val Inter_lemma0 = result();
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	24
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	25
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	26	(* Section 2. The Transfinite Construction *)
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	27
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	28	goalw Zorn.thy [increasing_def]
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	29	"!!f A. f: increasing(A) ==> f: Pow(A)->Pow(A)";
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	30	by (eresolve_tac [CollectD1] 1);
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	31	val increasingD1 = result();
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	32
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	33	goalw Zorn.thy [increasing_def]
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	34	"!!f A. [\| f: increasing(A); x<=A \|] ==> x <= f`x";
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	35	by (eresolve_tac [CollectD2 RS spec RS mp] 1);
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	36	by (assume_tac 1);
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	37	val increasingD2 = result();
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	38
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	39	(*????????????????????????????????????????????????????????????????
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	40	goal Zorn.thy
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	41	"!!next S. [\| X : Pow(S); next: increasing(S) \|] ==> next`X : Pow(S)";
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	42	by (eresolve_tac [increasingD1 RS apply_type] 1);
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	43	by (assume_tac 1);
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	44	val next_bounded = result();
1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	45	*)
485 5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	46
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	47	(Introduction rules)
516 1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	48	val [TFin_nextI, Pow_TFin_UnionI] = TFin.intrs;
485 5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	49	val TFin_UnionI = PowI RS Pow_TFin_UnionI;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	50
516 1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	51	val TFin_is_subset = TFin.dom_subset RS subsetD RS PowD;
485 5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	52
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	53
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	54	( Structural induction on TFin(S,next) )
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	55
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	56	val major::prems = goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	57	"[\| n: TFin(S,next); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	58	\ !!x. [\| x : TFin(S,next); P(x); next: increasing(S) \|] ==> P(next`x); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	59	\ !!Y. [\| Y <= TFin(S,next); ALL y:Y. P(y) \|] ==> P(Union(Y)) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	60	\ \|] ==> P(n)";
516 1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	61	by (rtac (major RS TFin.induct) 1);
485 5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	62	by (ALLGOALS (fast_tac (ZF_cs addIs prems)));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	63	val TFin_induct = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	64
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	65	(Perform induction on n, then prove the major premise using prems. )
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	66	fun TFin_ind_tac a prems i =
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	67	EVERY [res_inst_tac [("n",a)] TFin_induct i,
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	68	rename_last_tac a ["1"] (i+1),
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	69	rename_last_tac a ["2"] (i+2),
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	70	ares_tac prems i];
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	71
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	72	(* Section 3. Some Properties of the Transfinite Construction *)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	73
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	74	val increasing_trans =
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	75	TFin_is_subset RSN (3, increasingD2 RSN (2,subset_trans)) \|> standard;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	76
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	77	(Lemma 1 of section 3.1)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	78	val major::prems = goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	79	"[\| n: TFin(S,next); m: TFin(S,next); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	80	\ ALL x: TFin(S,next) . x<=m --> x=m \| next`x<=m \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	81	\ \|] ==> n<=m \| next`m<=n";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	82	by (cut_facts_tac prems 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	83	br (major RS TFin_induct) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	84	by (etac Union_lemma0 2); (or just fast_tac ZF_cs)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	85	by (fast_tac (subset_cs addIs [increasing_trans]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	86	val TFin_linear_lemma1 = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	87
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	88	(*Lemma 2 of section 3.2. Interesting in its own right!
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	89	Requires next: increasing(S) in the second induction step. *)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	90	val [major,ninc] = goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	91	"[\| m: TFin(S,next); next: increasing(S) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	92	\ \|] ==> ALL n: TFin(S,next) . n<=m --> n=m \| next`n<=m";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	93	br (major RS TFin_induct) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	94	br (impI RS ballI) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	95	(case split using TFin_linear_lemma1)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	96	by (res_inst_tac [("n1","n"), ("m1","x")]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	97	(TFin_linear_lemma1 RS disjE) 1 THEN REPEAT (assume_tac 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	98	by (dres_inst_tac [("x","n")] bspec 1 THEN assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	99	by (fast_tac (subset_cs addIs [increasing_trans]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	100	by (REPEAT (ares_tac [disjI1,equalityI] 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	101	(second induction step)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	102	br (impI RS ballI) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	103	br (Union_lemma0 RS disjE) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	104	be disjI2 3;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	105	by (REPEAT (ares_tac [disjI1,equalityI] 2));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	106	br ballI 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	107	by (ball_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	108	by (set_mp_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	109	by (res_inst_tac [("n1","n"), ("m1","x")]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	110	(TFin_linear_lemma1 RS disjE) 1 THEN REPEAT (assume_tac 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	111	by (fast_tac subset_cs 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	112	br (ninc RS increasingD2 RS subset_trans RS disjI1) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	113	by (REPEAT (ares_tac [TFin_is_subset] 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	114	val TFin_linear_lemma2 = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	115
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	116	(a more convenient form for Lemma 2)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	117	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	118	"!!m n. [\| n<=m; m: TFin(S,next); n: TFin(S,next); next: increasing(S) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	119	\ \|] ==> n=m \| next`n<=m";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	120	br (TFin_linear_lemma2 RS bspec RS mp) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	121	by (REPEAT (assume_tac 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	122	val TFin_subsetD = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	123
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	124	(Consequences from section 3.3 -- Property 3.2, the ordering is total)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	125	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	126	"!!m n. [\| m: TFin(S,next); n: TFin(S,next); next: increasing(S) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	127	\ \|] ==> n<=m \| m<=n";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	128	br (TFin_linear_lemma2 RSN (3,TFin_linear_lemma1) RS disjE) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	129	by (REPEAT (assume_tac 1) THEN etac disjI2 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	130	by (fast_tac (subset_cs addIs [increasingD2 RS subset_trans,
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	131	TFin_is_subset]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	132	val TFin_subset_linear = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	133
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	134
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	135	(Lemma 3 of section 3.3)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	136	val major::prems = goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	137	"[\| n: TFin(S,next); m: TFin(S,next); m = next`m \|] ==> n<=m";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	138	by (cut_facts_tac prems 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	139	br (major RS TFin_induct) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	140	bd TFin_subsetD 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	141	by (REPEAT (assume_tac 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	142	by (fast_tac (ZF_cs addEs [ssubst]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	143	by (fast_tac (subset_cs addIs [TFin_is_subset]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	144	val equal_next_upper = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	145
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	146	(Property 3.3 of section 3.3)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	147	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	148	"!!m. [\| m: TFin(S,next); next: increasing(S) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	149	\ \|] ==> m = next`m <-> m = Union(TFin(S,next))";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	150	br iffI 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	151	br (Union_upper RS equalityI) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	152	br (equal_next_upper RS Union_least) 2;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	153	by (REPEAT (assume_tac 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	154	be ssubst 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	155	by (rtac (increasingD2 RS equalityI) 1 THEN assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	156	by (ALLGOALS
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	157	(fast_tac (subset_cs addIs [TFin_UnionI, TFin_nextI, TFin_is_subset])));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	158	val equal_next_Union = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	159
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	160
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	161	(* Section 4. Hausdorff's Theorem: every set contains a maximal chain *)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	162	(* NB: We assume the partial ordering is <=, the subset relation! )
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	163
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	164	( Defining the "next" operation for Hausdorff's Theorem )
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	165
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	166	goalw Zorn.thy [chain_def] "chain(A) <= Pow(A)";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	167	by (resolve_tac [Collect_subset] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	168	val chain_subset_Pow = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	169
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	170	goalw Zorn.thy [super_def] "super(A,c) <= chain(A)";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	171	by (resolve_tac [Collect_subset] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	172	val super_subset_chain = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	173
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	174	goalw Zorn.thy [maxchain_def] "maxchain(A) <= chain(A)";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	175	by (resolve_tac [Collect_subset] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	176	val maxchain_subset_chain = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	177
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	178	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	179	"!!S. [\| ch : (PROD X:Pow(chain(S)) - {0}. X); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	180	\ X : chain(S); X ~: maxchain(S) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	181	\ \|] ==> ch ` super(S,X) : super(S,X)";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	182	by (eresolve_tac [apply_type] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	183	by (rewrite_goals_tac [super_def, maxchain_def]);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	184	by (fast_tac ZF_cs 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	185	val choice_super = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	186
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	187	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	188	"!!S. [\| ch : (PROD X:Pow(chain(S)) - {0}. X); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	189	\ X : chain(S); X ~: maxchain(S) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	190	\ \|] ==> ch ` super(S,X) ~= X";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	191	by (resolve_tac [notI] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	192	by (dresolve_tac [choice_super] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	193	by (assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	194	by (assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	195	by (asm_full_simp_tac (ZF_ss addsimps [super_def]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	196	val choice_not_equals = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	197
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	198	(This justifies Definition 4.4)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	199	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	200	"!!S. ch: (PROD X: Pow(chain(S))-{0}. X) ==> \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	201	\ EX next: increasing(S). ALL X: Pow(S). \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	202	\ next`X = if(X: chain(S)-maxchain(S), ch`super(S,X), X)";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	203	by (rtac bexI 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	204	by (rtac ballI 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	205	by (resolve_tac [beta] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	206	by (assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	207	bw increasing_def;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	208	by (rtac CollectI 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	209	by (rtac lam_type 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	210	by (asm_simp_tac (ZF_ss setloop split_tac [expand_if]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	211	by (fast_tac (ZF_cs addSIs [super_subset_chain RS subsetD,
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	212	chain_subset_Pow RS subsetD,
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	213	choice_super]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	214	(Now, verify that it increases)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	215	by (resolve_tac [allI] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	216	by (resolve_tac [impI] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	217	by (asm_simp_tac (ZF_ss addsimps [Pow_iff, subset_refl]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	218	setloop split_tac [expand_if]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	219	by (safe_tac ZF_cs);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	220	by (dresolve_tac [choice_super] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	221	by (REPEAT (assume_tac 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	222	bw super_def;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	223	by (fast_tac ZF_cs 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	224	val Hausdorff_next_exists = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	225
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	226	(Lemma 4)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	227	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	228	"!!S. [\| c: TFin(S,next); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	229	\ ch: (PROD X: Pow(chain(S))-{0}. X); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	230	\ next: increasing(S); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	231	\ ALL X: Pow(S). next`X = \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	232	\ if(X: chain(S)-maxchain(S), ch`super(S,X), X) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	233	\ \|] ==> c: chain(S)";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	234	by (eresolve_tac [TFin_induct] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	235	by (asm_simp_tac
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	236	(ZF_ss addsimps [chain_subset_Pow RS subsetD,
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	237	choice_super RS (super_subset_chain RS subsetD)]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	238	setloop split_tac [expand_if]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	239	bw chain_def;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	240	by (rtac CollectI 1 THEN fast_tac ZF_cs 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	241	(Cannot use safe_tac: the disjunction must be left alone)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	242	by (REPEAT (rtac ballI 1 ORELSE etac UnionE 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	243	by (res_inst_tac [("m1","B"), ("n1","Ba")] (TFin_subset_linear RS disjE) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	244	(fast_tac is just too slow here!)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	245	by (DEPTH_SOLVE (eresolve_tac [asm_rl, subsetD] 1
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	246	ORELSE ball_tac 1 THEN etac (CollectD2 RS bspec RS bspec) 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	247	val TFin_chain_lemma4 = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	248
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	249	goal Zorn.thy "EX c. c : maxchain(S)";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	250	by (rtac (AC_Pi_Pow RS exE) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	251	by (rtac (Hausdorff_next_exists RS bexE) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	252	by (assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	253	by (rename_tac "ch next" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	254	by (subgoal_tac "Union(TFin(S,next)) : chain(S)" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	255	by (REPEAT (ares_tac [TFin_chain_lemma4, subset_refl RS TFin_UnionI] 2));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	256	by (res_inst_tac [("x", "Union(TFin(S,next))")] exI 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	257	by (resolve_tac [classical] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	258	by (subgoal_tac "next ` Union(TFin(S,next)) = Union(TFin(S,next))" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	259	by (resolve_tac [equal_next_Union RS iffD2 RS sym] 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	260	by (resolve_tac [subset_refl RS TFin_UnionI] 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	261	by (assume_tac 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	262	by (resolve_tac [refl] 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	263	by (asm_full_simp_tac
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	264	(ZF_ss addsimps [subset_refl RS TFin_UnionI RS
516 1957113f0d7d installation of new inductive/datatype sections lcp parents: 485 diff changeset	265	(TFin.dom_subset RS subsetD)]
485 5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	266	setloop split_tac [expand_if]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	267	by (eresolve_tac [choice_not_equals RS notE] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	268	by (REPEAT (assume_tac 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	269	val Hausdorff = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	270
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	271
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	272	(*** Section 5. Zorn's Lemma: if all chains in S have upper bounds in S
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	273	then S contains a maximal element ***)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	274
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	275	(Used in the proof of Zorn's Lemma)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	276	goalw Zorn.thy [chain_def]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	277	"!!c. [\| c: chain(A); z: A; ALL x:c. x<=z \|] ==> cons(z,c) : chain(A)";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	278	by (fast_tac ZF_cs 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	279	val chain_extend = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	280
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	281	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	282	"!!S. ALL c: chain(S). Union(c) : S ==> EX y:S. ALL z:S. y<=z --> y=z";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	283	by (resolve_tac [Hausdorff RS exE] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	284	by (asm_full_simp_tac (ZF_ss addsimps [maxchain_def]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	285	by (rename_tac "c" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	286	by (res_inst_tac [("x", "Union(c)")] bexI 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	287	by (fast_tac ZF_cs 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	288	by (safe_tac ZF_cs);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	289	by (rename_tac "z" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	290	by (resolve_tac [classical] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	291	by (subgoal_tac "cons(z,c): super(S,c)" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	292	by (fast_tac (ZF_cs addEs [equalityE]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	293	bw super_def;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	294	by (safe_tac eq_cs);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	295	by (fast_tac (ZF_cs addEs [chain_extend]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	296	by (best_tac (ZF_cs addEs [equalityE]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	297	val Zorn = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	298
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	299
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	300	(* Section 6. Zermelo's Theorem: every set can be well-ordered *)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	301
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	302	(Lemma 5)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	303	val major::prems = goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	304	"[\| n: TFin(S,next); Z <= TFin(S,next); z:Z; ~ Inter(Z) : Z \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	305	\ \|] ==> ALL m:Z. n<=m";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	306	by (cut_facts_tac prems 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	307	br (major RS TFin_induct) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	308	by (fast_tac ZF_cs 2); (second induction step is easy)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	309	br ballI 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	310	br (bspec RS TFin_subsetD RS disjE) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	311	by (REPEAT_SOME (eresolve_tac [asm_rl,subsetD]));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	312	by (subgoal_tac "x = Inter(Z)" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	313	by (fast_tac ZF_cs 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	314	by (fast_tac eq_cs 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	315	val TFin_well_lemma5 = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	316
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	317	(Well-ordering of TFin(S,next))
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	318	goal Zorn.thy "!!Z. [\| Z <= TFin(S,next); z:Z \|] ==> Inter(Z) : Z";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	319	br classical 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	320	by (subgoal_tac "Z = {Union(TFin(S,next))}" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	321	by (asm_simp_tac (ZF_ss addsimps [Inter_singleton]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	322	be equal_singleton 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	323	br (Union_upper RS equalityI) 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	324	br (subset_refl RS TFin_UnionI RS TFin_well_lemma5 RS bspec) 2;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	325	by (REPEAT_SOME (eresolve_tac [asm_rl,subsetD]));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	326	val well_ord_TFin_lemma = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	327
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	328	(This theorem just packages the previous result)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	329	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	330	"!!S. next: increasing(S) ==> \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	331	\ well_ord(TFin(S,next), Subset_rel(TFin(S,next)))";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	332	by (resolve_tac [well_ordI] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	333	by (rewrite_goals_tac [Subset_rel_def, linear_def]);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	334	(Prove the linearity goal first)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	335	by (REPEAT (rtac ballI 2));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	336	by (excluded_middle_tac "x=y" 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	337	by (fast_tac ZF_cs 3);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	338	(The x~=y case remains)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	339	by (res_inst_tac [("n1","x"), ("m1","y")]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	340	(TFin_subset_linear RS disjE) 2 THEN REPEAT (assume_tac 2));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	341	by (fast_tac ZF_cs 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	342	by (fast_tac ZF_cs 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	343	(Now prove the well_foundedness goal)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	344	by (resolve_tac [wf_onI] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	345	by (forward_tac [well_ord_TFin_lemma] 1 THEN assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	346	by (dres_inst_tac [("x","Inter(Z)")] bspec 1 THEN assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	347	by (fast_tac eq_cs 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	348	val well_ord_TFin = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	349
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	350	( Defining the "next" operation for Zermelo's Theorem )
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	351
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	352	goal AC.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	353	"!!S. [\| ch : (PROD X:Pow(S) - {0}. X); X<=S; X~=S \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	354	\ \|] ==> ch ` (S-X) : S-X";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	355	by (eresolve_tac [apply_type] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	356	by (fast_tac (eq_cs addEs [equalityE]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	357	val choice_Diff = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	358
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	359	(This justifies Definition 6.1)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	360	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	361	"!!S. ch: (PROD X: Pow(S)-{0}. X) ==> \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	362	\ EX next: increasing(S). ALL X: Pow(S). \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	363	\ next`X = if(X=S, S, cons(ch`(S-X), X))";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	364	by (rtac bexI 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	365	by (rtac ballI 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	366	by (resolve_tac [beta] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	367	by (assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	368	bw increasing_def;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	369	by (rtac CollectI 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	370	by (rtac lam_type 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	371	(Verify that it increases)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	372	by (resolve_tac [allI] 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	373	by (resolve_tac [impI] 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	374	by (asm_simp_tac (ZF_ss addsimps [Pow_iff, subset_consI, subset_refl]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	375	setloop split_tac [expand_if]) 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	376	(Type checking is surprisingly hard!)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	377	by (asm_simp_tac (ZF_ss addsimps [Pow_iff, cons_subset_iff, subset_refl]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	378	setloop split_tac [expand_if]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	379	by (fast_tac (ZF_cs addSIs [choice_Diff RS DiffD1]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	380	val Zermelo_next_exists = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	381
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	382
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	383	(The construction of the injection)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	384	goal Zorn.thy
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	385	"!!S. [\| ch: (PROD X: Pow(S)-{0}. X); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	386	\ next: increasing(S); \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	387	\ ALL X: Pow(S). next`X = if(X=S, S, cons(ch`(S-X), X)) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	388	\ \|] ==> (lam x:S. Union({y: TFin(S,next). x~: y})) \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	389	\ : inj(S, TFin(S,next) - {S})";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	390	by (res_inst_tac [("d", "%y. ch`(S-y)")] lam_injective 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	391	by (rtac DiffI 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	392	by (resolve_tac [Collect_subset RS TFin_UnionI] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	393	by (fast_tac (ZF_cs addSIs [Collect_subset RS TFin_UnionI]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	394	addEs [equalityE]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	395	by (subgoal_tac "x ~: Union({y: TFin(S,next). x~: y})" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	396	by (fast_tac (ZF_cs addEs [equalityE]) 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	397	by (subgoal_tac "Union({y: TFin(S,next). x~: y}) ~= S" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	398	by (fast_tac (ZF_cs addEs [equalityE]) 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	399	(*For proving x : next`Union(...);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	400	Abrial & Laffitte's justification appears to be faulty.*)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	401	by (subgoal_tac "~ next ` Union({y: TFin(S,next). x~: y}) <= \
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	402	\ Union({y: TFin(S,next). x~: y})" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	403	by (asm_simp_tac
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	404	(ZF_ss addsimps [Collect_subset RS TFin_UnionI RS TFin_is_subset,
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	405	Pow_iff, cons_subset_iff, subset_refl,
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	406	choice_Diff RS DiffD2]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	407	setloop split_tac [expand_if]) 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	408	by (subgoal_tac "x : next ` Union({y: TFin(S,next). x~: y})" 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	409	by (fast_tac (subset_cs addSIs [Collect_subset RS TFin_UnionI, TFin_nextI]) 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	410	(End of the lemmas!)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	411	by (asm_full_simp_tac
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	412	(ZF_ss addsimps [Collect_subset RS TFin_UnionI RS TFin_is_subset,
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	413	Pow_iff, cons_subset_iff, subset_refl]
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	414	setloop split_tac [expand_if]) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	415	by (REPEAT (eresolve_tac [asm_rl, consE, sym, notE] 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	416	val choice_imp_injection = result();
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	417
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	418	(The wellordering theorem)
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	419	goal Zorn.thy "EX r. well_ord(S,r)";
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	420	by (rtac (AC_Pi_Pow RS exE) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	421	by (rtac (Zermelo_next_exists RS bexE) 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	422	by (assume_tac 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	423	br exI 1;
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	424	by (resolve_tac [well_ord_rvimage] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	425	by (eresolve_tac [well_ord_TFin] 2);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	426	by (resolve_tac [choice_imp_injection RS inj_weaken_type] 1);
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	427	by (REPEAT (ares_tac [Diff_subset] 1));
5e00a676a211 Axiom of choice, cardinality results, etc. lcp parents: diff changeset	428	val AC_well_ord = result();

author	lcp
	Fri, 12 Aug 1994 12:51:34 +0200
changeset 516	1957113f0d7d
parent 485	5e00a676a211
child 593	d4c6e2bdde59
permissions	-rw-r--r--