| author | paulson |
| Tue, 29 Mar 2005 12:30:48 +0200 | |
| changeset 15635 | 8408a06590a6 |
| parent 13630 | a013a9dd370f |
| child 16417 | 9bc16273c2d4 |
| permissions | -rw-r--r-- |
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
1 |
(* Title: HOL/NumberTheory/BijectionRel.thy |
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9508
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
2 |
ID: $Id$ |
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11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
3 |
Author: Thomas M. Rasmussen |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
4 |
Copyright 2000 University of Cambridge |
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9508
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
5 |
*) |
|
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
6 |
|
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
7 |
header {* Bijections between sets *}
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
8 |
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|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
9 |
theory BijectionRel = Main: |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
10 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
11 |
text {*
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
12 |
Inductive definitions of bijections between two different sets and |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
13 |
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
|
14 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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diff
changeset
|
15 |
\bigskip |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
16 |
*} |
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9508
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
17 |
|
|
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
18 |
consts |
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
19 |
bijR :: "('a => 'b => bool) => ('a set * 'b set) set"
|
|
9508
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
20 |
|
|
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
21 |
inductive "bijR P" |
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
22 |
intros |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
23 |
empty [simp]: "({}, {}) \<in> bijR P"
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
24 |
insert: "P a b ==> a \<notin> A ==> b \<notin> B ==> (A, B) \<in> bijR P |
|
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;
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parents:
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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 |
|
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11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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diff
changeset
|
32 |
constdefs |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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diff
changeset
|
33 |
bijP :: "('a => 'a => bool) => 'a set => bool"
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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diff
changeset
|
34 |
"bijP P F == \<forall>a b. a \<in> F \<and> P a b --> b \<in> F" |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
35 |
|
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
36 |
uniqP :: "('a => 'a => bool) => bool"
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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diff
changeset
|
37 |
"uniqP P == \<forall>a b c d. P a b \<and> P c d --> (a = c) = (b = d)" |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
38 |
|
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
39 |
symP :: "('a => 'a => bool) => bool"
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
40 |
"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
|
41 |
|
|
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
42 |
consts |
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
43 |
bijER :: "('a => 'a => bool) => 'a set set"
|
|
9508
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
44 |
|
|
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
45 |
inductive "bijER P" |
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
46 |
intros |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
47 |
empty [simp]: "{} \<in> bijER P"
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
48 |
insert1: "P a a ==> a \<notin> A ==> A \<in> bijER P ==> insert a A \<in> bijER P" |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
49 |
insert2: "P a b ==> a \<noteq> b ==> a \<notin> A ==> b \<notin> A ==> A \<in> bijER P |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
50 |
==> insert a (insert b A) \<in> bijER P" |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
51 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
52 |
|
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
53 |
text {* \medskip @{term bijR} *}
|
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
54 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
55 |
lemma fin_bijRl: "(A, B) \<in> bijR P ==> finite A" |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
56 |
apply (erule bijR.induct) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
57 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
58 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
59 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
60 |
lemma fin_bijRr: "(A, B) \<in> bijR P ==> finite B" |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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diff
changeset
|
61 |
apply (erule bijR.induct) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
62 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
63 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
64 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
65 |
lemma aux_induct: |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
66 |
"finite F ==> F \<subseteq> A ==> P {} ==>
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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diff
changeset
|
67 |
(!!F a. F \<subseteq> A ==> a \<in> A ==> a \<notin> F ==> P F ==> P (insert a F)) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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diff
changeset
|
68 |
==> P F" |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
69 |
proof - |
| 11549 | 70 |
case rule_context |
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11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
diff
changeset
|
71 |
assume major: "finite F" |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
72 |
and subs: "F \<subseteq> A" |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
73 |
show ?thesis |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
74 |
apply (rule subs [THEN rev_mp]) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
75 |
apply (rule major [THEN finite_induct]) |
| 11549 | 76 |
apply (blast intro: rule_context)+ |
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
77 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
78 |
qed |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
79 |
|
| 13524 | 80 |
lemma inj_func_bijR_aux1: |
81 |
"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
|
82 |
apply (unfold inj_on_def) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
83 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
84 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
85 |
|
| 13524 | 86 |
lemma inj_func_bijR_aux2: |
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
87 |
"\<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
|
88 |
==> (F, f ` F) \<in> bijR P" |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
89 |
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
|
90 |
apply (rule finite_subset) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
91 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
92 |
apply (rule bijR.insert) |
| 13524 | 93 |
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
|
94 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
95 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
96 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
97 |
lemma inj_func_bijR: |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
98 |
"\<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
|
99 |
==> (A, f ` A) \<in> bijR P" |
| 13524 | 100 |
apply (rule inj_func_bijR_aux2) |
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
101 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
102 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
103 |
|
|
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 |
text {* \medskip @{term bijER} *}
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
106 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
107 |
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
|
108 |
apply (erule bijER.induct) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
109 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
110 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
111 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
112 |
lemma aux1: |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
113 |
"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
|
114 |
==> \<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
|
115 |
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
|
116 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
117 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
118 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
119 |
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
|
120 |
==> 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
|
121 |
==> \<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
|
122 |
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
|
123 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
124 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
125 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
126 |
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
|
127 |
apply (unfold uniqP_def) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
128 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
129 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
130 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
131 |
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
|
132 |
apply (unfold symP_def) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
133 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
134 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
135 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
136 |
lemma aux_in1: |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
137 |
"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
|
138 |
apply (unfold bijP_def) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
139 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
140 |
apply (subgoal_tac "b \<noteq> a") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
141 |
prefer 2 |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
142 |
apply clarify |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
143 |
apply (simp add: aux_uniq) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
144 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
145 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
146 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
147 |
lemma aux_in2: |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
148 |
"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
|
149 |
==> 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
|
150 |
apply (unfold bijP_def) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
151 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
152 |
apply (subgoal_tac "aa \<noteq> a") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
153 |
prefer 2 |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
154 |
apply clarify |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
155 |
apply (subgoal_tac "aa \<noteq> b") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
156 |
prefer 2 |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
157 |
apply clarify |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
158 |
apply (simp add: aux_uniq) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
159 |
apply (subgoal_tac "ba \<noteq> a") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
160 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
161 |
apply (subgoal_tac "P a aa") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
162 |
prefer 2 |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
163 |
apply (simp add: aux_sym) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
164 |
apply (subgoal_tac "b = aa") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
165 |
apply (rule_tac [2] iffD1) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
166 |
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
|
167 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
168 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
169 |
|
| 13524 | 170 |
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
|
171 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
172 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
173 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
174 |
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
|
175 |
apply (unfold bijP_def) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
176 |
apply (rule iffI) |
| 13524 | 177 |
apply (erule_tac [!] aux_foo) |
|
11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
178 |
apply simp_all |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
179 |
apply (rule iffD2) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
180 |
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
|
181 |
apply simp_all |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
182 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
183 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
184 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
185 |
lemma aux_bijRER: |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
186 |
"(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
|
187 |
==> \<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
|
188 |
apply (erule bijR.induct) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
189 |
apply simp |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
190 |
apply (case_tac "a = b") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
191 |
apply clarify |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
192 |
apply (case_tac "b \<in> F") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
193 |
prefer 2 |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
194 |
apply (simp add: subset_insert) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
195 |
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
|
196 |
prefer 6 |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
197 |
apply clarify |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
198 |
apply (rule bijER.insert1) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
199 |
apply simp_all |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
200 |
apply (subgoal_tac "bijP P C") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
201 |
apply simp |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
202 |
apply (rule aux_in1) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
203 |
apply simp_all |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
204 |
apply clarify |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
205 |
apply (case_tac "a \<in> F") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
206 |
apply (case_tac [!] "b \<in> F") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
207 |
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
|
208 |
in aux2) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
209 |
apply (simp_all add: subset_insert) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
210 |
apply clarify |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
211 |
apply (rule bijER.insert2) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
212 |
apply simp_all |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
213 |
apply (subgoal_tac "bijP P C") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
214 |
apply simp |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
215 |
apply (rule aux_in2) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
216 |
apply simp_all |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
217 |
apply (subgoal_tac "b \<in> F") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
218 |
apply (rule_tac [2] iffD1) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
219 |
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
|
220 |
apply (simp_all (no_asm_simp)) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
221 |
apply (subgoal_tac [2] "a \<in> F") |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
222 |
apply (rule_tac [3] iffD2) |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
223 |
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
|
224 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
225 |
done |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
226 |
|
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
227 |
lemma bijR_bijER: |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
228 |
"(A, A) \<in> bijR P ==> |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
229 |
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
|
230 |
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
|
231 |
apply auto |
|
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
232 |
done |
|
9508
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
233 |
|
|
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
234 |
end |