isabelle: src/HOL/Old_Number_Theory/BijectionRel.thy@cb5b1e85b32e (annotated)

38159 e9b4835a54ee modernized specifications; wenzelm parents: 32479 diff changeset	1	(* Title: HOL/Old_Number_Theory/BijectionRel.thy
e9b4835a54ee modernized specifications; wenzelm parents: 32479 diff changeset	2	Author: Thomas M. Rasmussen
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	3	Copyright 2000 University of Cambridge
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	4	*)
4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	5
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	6	header {* Bijections between sets *}
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	7
38159 e9b4835a54ee modernized specifications; wenzelm parents: 32479 diff changeset	8	theory BijectionRel
e9b4835a54ee modernized specifications; wenzelm parents: 32479 diff changeset	9	imports Main
e9b4835a54ee modernized specifications; wenzelm parents: 32479 diff changeset	10	begin
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	11
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	12	text {*
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	13	Inductive definitions of bijections between two different sets and
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	14	between the same set. Theorem for relating the two definitions.
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	15
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	16	\bigskip
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	17	*}
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	18
23755 1c4672d130b1 Adapted to new inductive definition package. berghofe parents: 22274 diff changeset	19	inductive_set
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	20	bijR :: "('a => 'b => bool) => ('a set * 'b set) set"
23755 1c4672d130b1 Adapted to new inductive definition package. berghofe parents: 22274 diff changeset	21	for P :: "'a => 'b => bool"
1c4672d130b1 Adapted to new inductive definition package. berghofe parents: 22274 diff changeset	22	where
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	23	empty [simp]: "({}, {}) \<in> bijR P"
23755 1c4672d130b1 Adapted to new inductive definition package. berghofe parents: 22274 diff changeset	24	\| insert: "P a b ==> a \<notin> A ==> b \<notin> B ==> (A, B) \<in> bijR P
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	25	==> (insert a A, insert b B) \<in> bijR P"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	26
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	27	text {*
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	28	Add extra condition to @{term insert}: @{term "\<forall>b \<in> B. \<not> P a b"}
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	29	(and similar for @{term A}).
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	30	*}
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	31
19670 2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	32	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 19670 diff changeset	33	bijP :: "('a => 'a => bool) => 'a set => bool" where
19670 2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	34	"bijP P F = (\<forall>a b. a \<in> F \<and> P a b --> b \<in> F)"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	35
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 19670 diff changeset	36	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 19670 diff changeset	37	uniqP :: "('a => 'a => bool) => bool" where
19670 2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	38	"uniqP P = (\<forall>a b c d. P a b \<and> P c d --> (a = c) = (b = d))"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	39
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 19670 diff changeset	40	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 19670 diff changeset	41	symP :: "('a => 'a => bool) => bool" where
19670 2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	42	"symP P = (\<forall>a b. P a b = P b a)"
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	43
23755 1c4672d130b1 Adapted to new inductive definition package. berghofe parents: 22274 diff changeset	44	inductive_set
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	45	bijER :: "('a => 'a => bool) => 'a set set"
23755 1c4672d130b1 Adapted to new inductive definition package. berghofe parents: 22274 diff changeset	46	for P :: "'a => 'a => bool"
1c4672d130b1 Adapted to new inductive definition package. berghofe parents: 22274 diff changeset	47	where
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	48	empty [simp]: "{} \<in> bijER P"
23755 1c4672d130b1 Adapted to new inductive definition package. berghofe parents: 22274 diff changeset	49	\| insert1: "P a a ==> a \<notin> A ==> A \<in> bijER P ==> insert a A \<in> bijER P"
1c4672d130b1 Adapted to new inductive definition package. berghofe parents: 22274 diff changeset	50	\| insert2: "P a b ==> a \<noteq> b ==> a \<notin> A ==> b \<notin> A ==> A \<in> bijER P
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	51	==> insert a (insert b A) \<in> bijER P"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	52
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	53
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	54	text {* \medskip @{term bijR} *}
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	55
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	56	lemma fin_bijRl: "(A, B) \<in> bijR P ==> finite A"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	57	apply (erule bijR.induct)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	58	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	59	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	60
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	61	lemma fin_bijRr: "(A, B) \<in> bijR P ==> finite B"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	62	apply (erule bijR.induct)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	63	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	64	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	65
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	66	lemma aux_induct:
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16417 diff changeset	67	assumes major: "finite F"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	68	and subs: "F \<subseteq> A"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16417 diff changeset	69	and cases: "P {}"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16417 diff changeset	70	"!!F a. F \<subseteq> A ==> a \<in> A ==> a \<notin> F ==> P F ==> P (insert a F)"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16417 diff changeset	71	shows "P F"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16417 diff changeset	72	using major subs
22274 ce1459004c8d Adapted to changes in Finite_Set theory. berghofe parents: 21404 diff changeset	73	apply (induct set: finite)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16417 diff changeset	74	apply (blast intro: cases)+
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16417 diff changeset	75	done
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16417 diff changeset	76
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	77
13524 604d0f3622d6 * empty log message * wenzelm parents: 11549 diff changeset	78	lemma inj_func_bijR_aux1:
604d0f3622d6 * empty log message * wenzelm parents: 11549 diff changeset	79	"A \<subseteq> B ==> a \<notin> A ==> a \<in> B ==> inj_on f B ==> f a \<notin> f ` A"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	80	apply (unfold inj_on_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	81	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	82	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	83
13524 604d0f3622d6 * empty log message * wenzelm parents: 11549 diff changeset	84	lemma inj_func_bijR_aux2:
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	85	"\<forall>a. a \<in> A --> P a (f a) ==> inj_on f A ==> finite A ==> F <= A
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	86	==> (F, f ` F) \<in> bijR P"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	87	apply (rule_tac F = F and A = A in aux_induct)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	88	apply (rule finite_subset)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	89	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	90	apply (rule bijR.insert)
13524 604d0f3622d6 * empty log message * wenzelm parents: 11549 diff changeset	91	apply (rule_tac [3] inj_func_bijR_aux1)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	92	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	93	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	94
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	95	lemma inj_func_bijR:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	96	"\<forall>a. a \<in> A --> P a (f a) ==> inj_on f A ==> finite A
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	97	==> (A, f ` A) \<in> bijR P"
13524 604d0f3622d6 * empty log message * wenzelm parents: 11549 diff changeset	98	apply (rule inj_func_bijR_aux2)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	99	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	100	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	101
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	102
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	103	text {* \medskip @{term bijER} *}
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	104
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	105	lemma fin_bijER: "A \<in> bijER P ==> finite A"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	106	apply (erule bijER.induct)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	107	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	108	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	109
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	110	lemma aux1:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	111	"a \<notin> A ==> a \<notin> B ==> F \<subseteq> insert a A ==> F \<subseteq> insert a B ==> a \<in> F
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	112	==> \<exists>C. F = insert a C \<and> a \<notin> C \<and> C <= A \<and> C <= B"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	113	apply (rule_tac x = "F - {a}" in exI)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	114	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	115	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	116
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	117	lemma aux2: "a \<noteq> b ==> a \<notin> A ==> b \<notin> B ==> a \<in> F ==> b \<in> F
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	118	==> F \<subseteq> insert a A ==> F \<subseteq> insert b B
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	119	==> \<exists>C. F = insert a (insert b C) \<and> a \<notin> C \<and> b \<notin> C \<and> C \<subseteq> A \<and> C \<subseteq> B"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	120	apply (rule_tac x = "F - {a, b}" in exI)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	121	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	122	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	123
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	124	lemma aux_uniq: "uniqP P ==> P a b ==> P c d ==> (a = c) = (b = d)"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	125	apply (unfold uniqP_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	126	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	127	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	128
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	129	lemma aux_sym: "symP P ==> P a b = P b a"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	130	apply (unfold symP_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	131	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	132	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	133
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	134	lemma aux_in1:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	135	"uniqP P ==> b \<notin> C ==> P b b ==> bijP P (insert b C) ==> bijP P C"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	136	apply (unfold bijP_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	137	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	138	apply (subgoal_tac "b \<noteq> a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	139	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	140	apply clarify
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	141	apply (simp add: aux_uniq)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	142	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	143	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	144
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	145	lemma aux_in2:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	146	"symP P ==> uniqP P ==> a \<notin> C ==> b \<notin> C ==> a \<noteq> b ==> P a b
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	147	==> bijP P (insert a (insert b C)) ==> bijP P C"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	148	apply (unfold bijP_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	149	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	150	apply (subgoal_tac "aa \<noteq> a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	151	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	152	apply clarify
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	153	apply (subgoal_tac "aa \<noteq> b")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	154	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	155	apply clarify
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	156	apply (simp add: aux_uniq)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	157	apply (subgoal_tac "ba \<noteq> a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	158	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	159	apply (subgoal_tac "P a aa")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	160	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	161	apply (simp add: aux_sym)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	162	apply (subgoal_tac "b = aa")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	163	apply (rule_tac [2] iffD1)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	164	apply (rule_tac [2] a = a and c = a and P = P in aux_uniq)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	165	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	166	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	167
13524 604d0f3622d6 * empty log message * wenzelm parents: 11549 diff changeset	168	lemma aux_foo: "\<forall>a b. Q a \<and> P a b --> R b ==> P a b ==> Q a ==> R b"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	169	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	170	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	171
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	172	lemma aux_bij: "bijP P F ==> symP P ==> P a b ==> (a \<in> F) = (b \<in> F)"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	173	apply (unfold bijP_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	174	apply (rule iffI)
13524 604d0f3622d6 * empty log message * wenzelm parents: 11549 diff changeset	175	apply (erule_tac [!] aux_foo)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	176	apply simp_all
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	177	apply (rule iffD2)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	178	apply (rule_tac P = P in aux_sym)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	179	apply simp_all
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	180	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	181
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	182
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	183	lemma aux_bijRER:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	184	"(A, B) \<in> bijR P ==> uniqP P ==> symP P
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	185	==> \<forall>F. bijP P F \<and> F \<subseteq> A \<and> F \<subseteq> B --> F \<in> bijER P"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	186	apply (erule bijR.induct)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	187	apply simp
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	188	apply (case_tac "a = b")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	189	apply clarify
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	190	apply (case_tac "b \<in> F")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	191	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	192	apply (simp add: subset_insert)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	193	apply (cut_tac F = F and a = b and A = A and B = B in aux1)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	194	prefer 6
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	195	apply clarify
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	196	apply (rule bijER.insert1)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	197	apply simp_all
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	198	apply (subgoal_tac "bijP P C")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	199	apply simp
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	200	apply (rule aux_in1)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	201	apply simp_all
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	202	apply clarify
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	203	apply (case_tac "a \<in> F")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	204	apply (case_tac [!] "b \<in> F")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	205	apply (cut_tac F = F and a = a and b = b and A = A and B = B
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	206	in aux2)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	207	apply (simp_all add: subset_insert)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	208	apply clarify
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	209	apply (rule bijER.insert2)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	210	apply simp_all
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	211	apply (subgoal_tac "bijP P C")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	212	apply simp
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	213	apply (rule aux_in2)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	214	apply simp_all
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	215	apply (subgoal_tac "b \<in> F")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	216	apply (rule_tac [2] iffD1)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	217	apply (rule_tac [2] a = a and F = F and P = P in aux_bij)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	218	apply (simp_all (no_asm_simp))
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	219	apply (subgoal_tac [2] "a \<in> F")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	220	apply (rule_tac [3] iffD2)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	221	apply (rule_tac [3] b = b and F = F and P = P in aux_bij)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	222	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	223	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	224
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	225	lemma bijR_bijER:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	226	"(A, A) \<in> bijR P ==>
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	227	bijP P A ==> uniqP P ==> symP P ==> A \<in> bijER P"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	228	apply (cut_tac A = A and B = A and P = P in aux_bijRER)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	229	apply auto
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	230	done
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	231
4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	232	end

author	bulwahn
	Fri, 18 Mar 2011 18:19:42 +0100
changeset 42025	cb5b1e85b32e
parent 38159	e9b4835a54ee
child 58889	5b7a9633cfa8
permissions	-rw-r--r--