| author | oheimb |
| Fri, 02 Jun 2000 17:46:32 +0200 | |
| changeset 9020 | 1056cbbaeb29 |
| parent 9002 | a752f2499dae |
| child 9074 | 2313ddc415a1 |
| permissions | -rw-r--r-- |
| 1465 | 1 |
(* Title: HOL/Finite.thy |
| 923 | 2 |
ID: $Id$ |
| 1531 | 3 |
Author: Lawrence C Paulson & Tobias Nipkow |
4 |
Copyright 1995 University of Cambridge & TU Muenchen |
|
| 923 | 5 |
|
| 1531 | 6 |
Finite sets and their cardinality |
| 923 | 7 |
*) |
8 |
||
|
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Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
9 |
section "finite"; |
| 1531 | 10 |
|
| 923 | 11 |
(*Discharging ~ x:y entails extra work*) |
| 5316 | 12 |
val major::prems = Goal |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
13 |
"[| finite F; P({}); \
|
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
14 |
\ !!F x. [| finite F; x ~: F; P(F) |] ==> P(insert x F) \ |
| 923 | 15 |
\ |] ==> P(F)"; |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
16 |
by (rtac (major RS Finites.induct) 1); |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
17 |
by (excluded_middle_tac "a:A" 2); |
| 923 | 18 |
by (etac (insert_absorb RS ssubst) 3 THEN assume_tac 3); (*backtracking!*) |
19 |
by (REPEAT (ares_tac prems 1)); |
|
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
20 |
qed "finite_induct"; |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
21 |
|
| 5316 | 22 |
val major::subs::prems = Goal |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
23 |
"[| finite F; F <= A; \ |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
24 |
\ P({}); \
|
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
25 |
\ !!F a. [| finite F; a:A; a ~: F; P(F) |] ==> P(insert a F) \ |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
26 |
\ |] ==> P(F)"; |
| 4386 | 27 |
by (rtac (subs RS rev_mp) 1); |
28 |
by (rtac (major RS finite_induct) 1); |
|
29 |
by (ALLGOALS (blast_tac (claset() addIs prems))); |
|
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
30 |
qed "finite_subset_induct"; |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
31 |
|
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
32 |
Addsimps Finites.intrs; |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
33 |
AddSIs Finites.intrs; |
| 923 | 34 |
|
35 |
(*The union of two finite sets is finite*) |
|
| 5316 | 36 |
Goal "[| finite F; finite G |] ==> finite(F Un G)"; |
37 |
by (etac finite_induct 1); |
|
38 |
by (ALLGOALS Asm_simp_tac); |
|
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
39 |
qed "finite_UnI"; |
| 923 | 40 |
|
41 |
(*Every subset of a finite set is finite*) |
|
|
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b94cd208f073
Removal of leading "\!\!..." from most Goal commands
paulson
parents:
5069
diff
changeset
|
42 |
Goal "finite B ==> ALL A. A<=B --> finite A"; |
| 4304 | 43 |
by (etac finite_induct 1); |
44 |
by (Simp_tac 1); |
|
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by (safe_tac (claset() addSDs [subset_insert_iff RS iffD1])); |
| 4304 | 46 |
by (eres_inst_tac [("t","A")] (insert_Diff RS subst) 2);
|
| 1264 | 47 |
by (ALLGOALS Asm_simp_tac); |
| 4304 | 48 |
val lemma = result(); |
49 |
||
|
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paulson
parents:
5069
diff
changeset
|
50 |
Goal "[| A<=B; finite B |] ==> finite A"; |
| 4423 | 51 |
by (dtac lemma 1); |
| 4304 | 52 |
by (Blast_tac 1); |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
53 |
qed "finite_subset"; |
| 923 | 54 |
|
| 5069 | 55 |
Goal "finite(F Un G) = (finite F & finite G)"; |
| 4304 | 56 |
by (blast_tac (claset() |
|
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combined finite_Int1/2 as finite_Int. Deleted the awful "lemma" from the
paulson
parents:
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diff
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|
57 |
addIs [inst "B" "?X Un ?Y" finite_subset, finite_UnI]) 1); |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
58 |
qed "finite_Un"; |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
59 |
AddIffs[finite_Un]; |
| 1531 | 60 |
|
|
8554
ba33995b87ff
combined finite_Int1/2 as finite_Int. Deleted the awful "lemma" from the
paulson
parents:
8442
diff
changeset
|
61 |
(*The converse obviously fails*) |
|
ba33995b87ff
combined finite_Int1/2 as finite_Int. Deleted the awful "lemma" from the
paulson
parents:
8442
diff
changeset
|
62 |
Goal "finite F | finite G ==> finite(F Int G)"; |
| 5413 | 63 |
by (blast_tac (claset() addIs [finite_subset]) 1); |
|
8554
ba33995b87ff
combined finite_Int1/2 as finite_Int. Deleted the awful "lemma" from the
paulson
parents:
8442
diff
changeset
|
64 |
qed "finite_Int"; |
| 5413 | 65 |
|
|
8554
ba33995b87ff
combined finite_Int1/2 as finite_Int. Deleted the awful "lemma" from the
paulson
parents:
8442
diff
changeset
|
66 |
Addsimps [finite_Int]; |
|
ba33995b87ff
combined finite_Int1/2 as finite_Int. Deleted the awful "lemma" from the
paulson
parents:
8442
diff
changeset
|
67 |
AddIs [finite_Int]; |
| 5413 | 68 |
|
| 5069 | 69 |
Goal "finite(insert a A) = finite A"; |
| 1553 | 70 |
by (stac insert_is_Un 1); |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
71 |
by (simp_tac (HOL_ss addsimps [finite_Un]) 1); |
|
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Removed a few redundant additions of simprules or classical rules
paulson
parents:
3416
diff
changeset
|
72 |
by (Blast_tac 1); |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
73 |
qed "finite_insert"; |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
74 |
Addsimps[finite_insert]; |
| 1531 | 75 |
|
|
3413
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Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
76 |
(*The image of a finite set is finite *) |
|
5143
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paulson
parents:
5069
diff
changeset
|
77 |
Goal "finite F ==> finite(h``F)"; |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
78 |
by (etac finite_induct 1); |
| 1264 | 79 |
by (Simp_tac 1); |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
80 |
by (Asm_simp_tac 1); |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
81 |
qed "finite_imageI"; |
| 923 | 82 |
|
| 8155 | 83 |
Goal "finite (range g) ==> finite (range (%x. f (g x)))"; |
84 |
by (Simp_tac 1); |
|
85 |
by (etac finite_imageI 1); |
|
86 |
qed "finite_range_imageI"; |
|
87 |
||
| 5316 | 88 |
val major::prems = Goal |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
89 |
"[| finite c; finite b; \ |
| 1465 | 90 |
\ P(b); \ |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
91 |
\ !!x y. [| finite y; x:y; P(y) |] ==> P(y-{x}) \
|
| 923 | 92 |
\ |] ==> c<=b --> P(b-c)"; |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
93 |
by (rtac (major RS finite_induct) 1); |
| 2031 | 94 |
by (stac Diff_insert 2); |
| 923 | 95 |
by (ALLGOALS (asm_simp_tac |
| 5537 | 96 |
(simpset() addsimps prems@[Diff_subset RS finite_subset]))); |
| 1531 | 97 |
val lemma = result(); |
| 923 | 98 |
|
| 5316 | 99 |
val prems = Goal |
|
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Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
100 |
"[| finite A; \ |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
101 |
\ P(A); \ |
|
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
102 |
\ !!a A. [| finite A; a:A; P(A) |] ==> P(A-{a}) \
|
| 923 | 103 |
\ |] ==> P({})";
|
104 |
by (rtac (Diff_cancel RS subst) 1); |
|
| 1531 | 105 |
by (rtac (lemma RS mp) 1); |
| 923 | 106 |
by (REPEAT (ares_tac (subset_refl::prems) 1)); |
|
3413
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Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
107 |
qed "finite_empty_induct"; |
| 1531 | 108 |
|
109 |
||
| 1618 | 110 |
(* finite B ==> finite (B - Ba) *) |
111 |
bind_thm ("finite_Diff", Diff_subset RS finite_subset);
|
|
| 1531 | 112 |
Addsimps [finite_Diff]; |
113 |
||
| 5626 | 114 |
Goal "finite(A - insert a B) = finite(A-B)"; |
| 6162 | 115 |
by (stac Diff_insert 1); |
| 5626 | 116 |
by (case_tac "a : A-B" 1); |
| 3457 | 117 |
by (rtac (finite_insert RS sym RS trans) 1); |
| 3368 | 118 |
by (stac insert_Diff 1); |
| 5626 | 119 |
by (ALLGOALS Asm_full_simp_tac); |
120 |
qed "finite_Diff_insert"; |
|
121 |
AddIffs [finite_Diff_insert]; |
|
122 |
||
|
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combined finite_Int1/2 as finite_Int. Deleted the awful "lemma" from the
paulson
parents:
8442
diff
changeset
|
123 |
(*lemma merely for classical reasoner in the proof below: force_tac can't |
|
ba33995b87ff
combined finite_Int1/2 as finite_Int. Deleted the awful "lemma" from the
paulson
parents:
8442
diff
changeset
|
124 |
prove it.*) |
| 5626 | 125 |
Goal "finite(A-{}) = finite A";
|
126 |
by (Simp_tac 1); |
|
127 |
val lemma = result(); |
|
| 3368 | 128 |
|
| 4059 | 129 |
(*Lemma for proving finite_imageD*) |
|
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changeset
|
130 |
Goal "finite B ==> !A. f``A = B --> inj_on f A --> finite A"; |
| 1553 | 131 |
by (etac finite_induct 1); |
|
3413
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nipkow
parents:
3389
diff
changeset
|
132 |
by (ALLGOALS Asm_simp_tac); |
| 3708 | 133 |
by (Clarify_tac 1); |
|
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parents:
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diff
changeset
|
134 |
by (subgoal_tac "EX y:A. f y = x & F = f``(A-{y})" 1);
|
| 3708 | 135 |
by (Clarify_tac 1); |
| 8081 | 136 |
by (full_simp_tac (simpset() addsimps [inj_on_def]) 1); |
|
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paulson
parents:
8442
diff
changeset
|
137 |
by (blast_tac (claset() addSDs [lemma RS iffD1]) 1); |
| 3368 | 138 |
by (thin_tac "ALL A. ?PP(A)" 1); |
|
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parents:
3389
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|
139 |
by (forward_tac [[equalityD2, insertI1] MRS subsetD] 1); |
| 3708 | 140 |
by (Clarify_tac 1); |
| 3368 | 141 |
by (res_inst_tac [("x","xa")] bexI 1);
|
| 4059 | 142 |
by (ALLGOALS |
| 4830 | 143 |
(asm_full_simp_tac (simpset() addsimps [inj_on_image_set_diff]))); |
| 3368 | 144 |
val lemma = result(); |
145 |
||
|
5143
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Removal of leading "\!\!..." from most Goal commands
paulson
parents:
5069
diff
changeset
|
146 |
Goal "[| finite(f``A); inj_on f A |] ==> finite A"; |
| 3457 | 147 |
by (dtac lemma 1); |
| 3368 | 148 |
by (Blast_tac 1); |
149 |
qed "finite_imageD"; |
|
150 |
||
| 4014 | 151 |
(** The finite UNION of finite sets **) |
152 |
||
| 5316 | 153 |
Goal "finite A ==> (!a:A. finite(B a)) --> finite(UN a:A. B a)"; |
154 |
by (etac finite_induct 1); |
|
| 4153 | 155 |
by (ALLGOALS Asm_simp_tac); |
| 4014 | 156 |
bind_thm("finite_UnionI", ballI RSN (2, result() RS mp));
|
157 |
Addsimps [finite_UnionI]; |
|
158 |
||
159 |
(** Sigma of finite sets **) |
|
160 |
||
| 5069 | 161 |
Goalw [Sigma_def] |
|
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|
162 |
"[| finite A; !a:A. finite(B a) |] ==> finite(SIGMA a:A. B a)"; |
| 4153 | 163 |
by (blast_tac (claset() addSIs [finite_UnionI]) 1); |
| 4014 | 164 |
bind_thm("finite_SigmaI", ballI RSN (2,result()));
|
165 |
Addsimps [finite_SigmaI]; |
|
| 3368 | 166 |
|
| 8262 | 167 |
Goal "[| finite (UNIV::'a set); finite (UNIV::'b set)|] ==> finite (UNIV::('a * 'b) set)";
|
168 |
by (subgoal_tac "(UNIV::('a * 'b) set) = Sigma UNIV (%x. UNIV)" 1);
|
|
169 |
by (etac ssubst 1); |
|
170 |
by (etac finite_SigmaI 1); |
|
171 |
by Auto_tac; |
|
172 |
qed "finite_Prod_UNIV"; |
|
173 |
||
174 |
Goal "finite (UNIV :: ('a::finite * 'b::finite) set)";
|
|
| 8320 | 175 |
by (rtac (finite_Prod_UNIV) 1); |
176 |
by (rtac finite 1); |
|
177 |
by (rtac finite 1); |
|
| 8262 | 178 |
qed "finite_Prod"; |
179 |
||
| 3368 | 180 |
(** The powerset of a finite set **) |
181 |
||
|
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changeset
|
182 |
Goal "finite(Pow A) ==> finite A"; |
| 3368 | 183 |
by (subgoal_tac "finite ((%x.{x})``A)" 1);
|
| 3457 | 184 |
by (rtac finite_subset 2); |
185 |
by (assume_tac 3); |
|
| 3368 | 186 |
by (ALLGOALS |
| 4830 | 187 |
(fast_tac (claset() addSDs [rewrite_rule [inj_on_def] finite_imageD]))); |
| 3368 | 188 |
val lemma = result(); |
189 |
||
| 5069 | 190 |
Goal "finite(Pow A) = finite A"; |
| 3457 | 191 |
by (rtac iffI 1); |
192 |
by (etac lemma 1); |
|
| 3368 | 193 |
(*Opposite inclusion: finite A ==> finite (Pow A) *) |
| 3340 | 194 |
by (etac finite_induct 1); |
195 |
by (ALLGOALS |
|
196 |
(asm_simp_tac |
|
| 4089 | 197 |
(simpset() addsimps [finite_UnI, finite_imageI, Pow_insert]))); |
| 3368 | 198 |
qed "finite_Pow_iff"; |
199 |
AddIffs [finite_Pow_iff]; |
|
| 3340 | 200 |
|
| 5069 | 201 |
Goal "finite(r^-1) = finite r"; |
| 3457 | 202 |
by (subgoal_tac "r^-1 = (%(x,y).(y,x))``r" 1); |
203 |
by (Asm_simp_tac 1); |
|
204 |
by (rtac iffI 1); |
|
| 4830 | 205 |
by (etac (rewrite_rule [inj_on_def] finite_imageD) 1); |
206 |
by (simp_tac (simpset() addsplits [split_split]) 1); |
|
| 3457 | 207 |
by (etac finite_imageI 1); |
| 4746 | 208 |
by (simp_tac (simpset() addsimps [converse_def,image_def]) 1); |
|
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parents:
4423
diff
changeset
|
209 |
by Auto_tac; |
| 5516 | 210 |
by (rtac bexI 1); |
211 |
by (assume_tac 2); |
|
| 4763 | 212 |
by (Simp_tac 1); |
| 4746 | 213 |
qed "finite_converse"; |
214 |
AddIffs [finite_converse]; |
|
| 1531 | 215 |
|
|
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setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
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diff
changeset
|
216 |
Goal "finite (lessThan (k::nat))"; |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
217 |
by (induct_tac "k" 1); |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
218 |
by (simp_tac (simpset() addsimps [lessThan_Suc]) 2); |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
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parents:
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diff
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|
219 |
by Auto_tac; |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
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parents:
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changeset
|
220 |
qed "finite_lessThan"; |
|
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8911
diff
changeset
|
221 |
|
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
222 |
Goal "finite (atMost (k::nat))"; |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
223 |
by (induct_tac "k" 1); |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
224 |
by (simp_tac (simpset() addsimps [atMost_Suc]) 2); |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
225 |
by Auto_tac; |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
226 |
qed "finite_atMost"; |
| 8971 | 227 |
AddIffs [finite_lessThan, finite_atMost]; |
|
8963
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
228 |
|
| 8889 | 229 |
(* A bounded set of natural numbers is finite *) |
|
8963
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
230 |
Goal "(!i:N. i<(n::nat)) ==> finite N"; |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
231 |
by (rtac finite_subset 1); |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
232 |
by (rtac finite_lessThan 2); |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
233 |
by Auto_tac; |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
234 |
qed "bounded_nat_set_is_finite"; |
| 8889 | 235 |
|
236 |
||
| 1548 | 237 |
section "Finite cardinality -- 'card'"; |
| 1531 | 238 |
|
| 8981 | 239 |
val cardR_emptyE = cardR.mk_cases "({},n) : cardR";
|
240 |
val cardR_insertE = cardR.mk_cases "(insert a A,n) : cardR"; |
|
| 1531 | 241 |
|
| 5626 | 242 |
AddSEs [cardR_emptyE]; |
243 |
AddSIs cardR.intrs; |
|
244 |
||
245 |
Goal "[| (A,n) : cardR |] ==> a : A --> (? m. n = Suc m)"; |
|
| 6162 | 246 |
by (etac cardR.induct 1); |
247 |
by (Blast_tac 1); |
|
248 |
by (Blast_tac 1); |
|
| 5626 | 249 |
qed "cardR_SucD"; |
250 |
||
251 |
Goal "(A,m): cardR ==> (!n a. m = Suc n --> a:A --> (A-{a},n) : cardR)";
|
|
| 6162 | 252 |
by (etac cardR.induct 1); |
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
253 |
by Auto_tac; |
| 6162 | 254 |
by (asm_simp_tac (simpset() addsimps [insert_Diff_if]) 1); |
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
255 |
by Auto_tac; |
| 7499 | 256 |
by (ftac cardR_SucD 1); |
| 6162 | 257 |
by (Blast_tac 1); |
| 5626 | 258 |
val lemma = result(); |
259 |
||
260 |
Goal "[| (insert a A, Suc m) : cardR; a ~: A |] ==> (A,m) : cardR"; |
|
| 6162 | 261 |
by (dtac lemma 1); |
262 |
by (Asm_full_simp_tac 1); |
|
| 5626 | 263 |
val lemma = result(); |
264 |
||
265 |
Goal "(A,m): cardR ==> (!n. (A,n) : cardR --> n=m)"; |
|
| 6162 | 266 |
by (etac cardR.induct 1); |
267 |
by (safe_tac (claset() addSEs [cardR_insertE])); |
|
268 |
by (rename_tac "B b m" 1); |
|
269 |
by (case_tac "a = b" 1); |
|
270 |
by (subgoal_tac "A = B" 1); |
|
271 |
by (blast_tac (claset() addEs [equalityE]) 2); |
|
272 |
by (Blast_tac 1); |
|
273 |
by (subgoal_tac "? C. A = insert b C & B = insert a C" 1); |
|
274 |
by (res_inst_tac [("x","A Int B")] exI 2);
|
|
275 |
by (blast_tac (claset() addEs [equalityE]) 2); |
|
276 |
by (forw_inst_tac [("A","B")] cardR_SucD 1);
|
|
277 |
by (blast_tac (claset() addDs [lemma]) 1); |
|
| 5626 | 278 |
qed_spec_mp "cardR_determ"; |
279 |
||
280 |
Goal "(A,n) : cardR ==> finite(A)"; |
|
281 |
by (etac cardR.induct 1); |
|
282 |
by Auto_tac; |
|
283 |
qed "cardR_imp_finite"; |
|
284 |
||
285 |
Goal "finite(A) ==> EX n. (A, n) : cardR"; |
|
286 |
by (etac finite_induct 1); |
|
287 |
by Auto_tac; |
|
288 |
qed "finite_imp_cardR"; |
|
289 |
||
290 |
Goalw [card_def] "(A,n) : cardR ==> card A = n"; |
|
291 |
by (blast_tac (claset() addIs [cardR_determ]) 1); |
|
292 |
qed "card_equality"; |
|
293 |
||
294 |
Goalw [card_def] "card {} = 0";
|
|
295 |
by (Blast_tac 1); |
|
296 |
qed "card_empty"; |
|
297 |
Addsimps [card_empty]; |
|
298 |
||
299 |
Goal "x ~: A ==> \ |
|
300 |
\ ((insert x A, n) : cardR) = \ |
|
301 |
\ (EX m. (A, m) : cardR & n = Suc m)"; |
|
302 |
by Auto_tac; |
|
303 |
by (res_inst_tac [("A1", "A")] (finite_imp_cardR RS exE) 1);
|
|
304 |
by (force_tac (claset() addDs [cardR_imp_finite], simpset()) 1); |
|
305 |
by (blast_tac (claset() addIs [cardR_determ]) 1); |
|
306 |
val lemma = result(); |
|
307 |
||
308 |
Goalw [card_def] |
|
309 |
"[| finite A; x ~: A |] ==> card (insert x A) = Suc(card A)"; |
|
310 |
by (asm_simp_tac (simpset() addsimps [lemma]) 1); |
|
311 |
by (rtac select_equality 1); |
|
312 |
by (auto_tac (claset() addIs [finite_imp_cardR], |
|
313 |
simpset() addcongs [conj_cong] |
|
314 |
addsimps [symmetric card_def, |
|
315 |
card_equality])); |
|
316 |
qed "card_insert_disjoint"; |
|
317 |
Addsimps [card_insert_disjoint]; |
|
318 |
||
319 |
(* Delete rules to do with cardR relation: obsolete *) |
|
320 |
Delrules [cardR_emptyE]; |
|
321 |
Delrules cardR.intrs; |
|
322 |
||
| 7958 | 323 |
Goal "finite A ==> (card A = 0) = (A = {})";
|
324 |
by Auto_tac; |
|
325 |
by (dres_inst_tac [("a","x")] mk_disjoint_insert 1);
|
|
326 |
by (Clarify_tac 1); |
|
327 |
by (rotate_tac ~1 1); |
|
328 |
by Auto_tac; |
|
329 |
qed "card_0_eq"; |
|
330 |
Addsimps[card_0_eq]; |
|
331 |
||
| 5626 | 332 |
Goal "finite A ==> card(insert x A) = (if x:A then card A else Suc(card(A)))"; |
333 |
by (asm_simp_tac (simpset() addsimps [insert_absorb]) 1); |
|
334 |
qed "card_insert_if"; |
|
335 |
||
| 7821 | 336 |
Goal "[| finite A; x: A |] ==> Suc (card (A-{x})) = card A";
|
| 5626 | 337 |
by (res_inst_tac [("t", "A")] (insert_Diff RS subst) 1);
|
338 |
by (assume_tac 1); |
|
339 |
by (Asm_simp_tac 1); |
|
340 |
qed "card_Suc_Diff1"; |
|
341 |
||
| 7821 | 342 |
Goal "[| finite A; x: A |] ==> card (A-{x}) = card A - 1";
|
343 |
by (asm_simp_tac (simpset() addsimps [card_Suc_Diff1 RS sym]) 1); |
|
344 |
qed "card_Diff_singleton"; |
|
345 |
||
| 5626 | 346 |
Goal "finite A ==> card(insert x A) = Suc(card(A-{x}))";
|
347 |
by (asm_simp_tac (simpset() addsimps [card_insert_if,card_Suc_Diff1]) 1); |
|
348 |
qed "card_insert"; |
|
| 3352 | 349 |
|
|
5143
b94cd208f073
Removal of leading "\!\!..." from most Goal commands
paulson
parents:
5069
diff
changeset
|
350 |
Goal "finite A ==> card A <= card (insert x A)"; |
| 5626 | 351 |
by (asm_simp_tac (simpset() addsimps [card_insert_if]) 1); |
|
4768
c342d63173e9
New theorems card_Diff_le and card_insert_le; tidied
paulson
parents:
4763
diff
changeset
|
352 |
qed "card_insert_le"; |
|
c342d63173e9
New theorems card_Diff_le and card_insert_le; tidied
paulson
parents:
4763
diff
changeset
|
353 |
|
|
5143
b94cd208f073
Removal of leading "\!\!..." from most Goal commands
paulson
parents:
5069
diff
changeset
|
354 |
Goal "finite A ==> !B. B <= A --> card(B) <= card(A)"; |
| 3352 | 355 |
by (etac finite_induct 1); |
356 |
by (Simp_tac 1); |
|
| 3708 | 357 |
by (Clarify_tac 1); |
| 3352 | 358 |
by (case_tac "x:B" 1); |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
359 |
by (dres_inst_tac [("A","B")] mk_disjoint_insert 1);
|
|
8741
61bc5ed22b62
removal of less_SucI, le_SucI from default simpset
paulson
parents:
8554
diff
changeset
|
360 |
by (asm_full_simp_tac (simpset() addsimps [le_SucI, subset_insert_iff]) 2); |
|
61bc5ed22b62
removal of less_SucI, le_SucI from default simpset
paulson
parents:
8554
diff
changeset
|
361 |
by (force_tac (claset(), |
|
61bc5ed22b62
removal of less_SucI, le_SucI from default simpset
paulson
parents:
8554
diff
changeset
|
362 |
simpset() addsimps [subset_insert_iff, finite_subset] |
|
61bc5ed22b62
removal of less_SucI, le_SucI from default simpset
paulson
parents:
8554
diff
changeset
|
363 |
delsimps [insert_subset]) 1); |
| 3352 | 364 |
qed_spec_mp "card_mono"; |
365 |
||
|
5416
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
366 |
|
|
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
367 |
Goal "[| finite A; finite B |] \ |
|
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
368 |
\ ==> card A + card B = card (A Un B) + card (A Int B)"; |
| 3352 | 369 |
by (etac finite_induct 1); |
|
5416
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
370 |
by (Simp_tac 1); |
|
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
371 |
by (asm_simp_tac (simpset() addsimps [insert_absorb, Int_insert_left]) 1); |
|
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
372 |
qed "card_Un_Int"; |
|
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
373 |
|
|
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
374 |
Goal "[| finite A; finite B; A Int B = {} |] \
|
|
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
375 |
\ ==> card (A Un B) = card A + card B"; |
|
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
376 |
by (asm_simp_tac (simpset() addsimps [card_Un_Int]) 1); |
|
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
377 |
qed "card_Un_disjoint"; |
| 3352 | 378 |
|
|
5143
b94cd208f073
Removal of leading "\!\!..." from most Goal commands
paulson
parents:
5069
diff
changeset
|
379 |
Goal "[| finite A; B<=A |] ==> card A - card B = card (A - B)"; |
| 3352 | 380 |
by (subgoal_tac "(A-B) Un B = A" 1); |
381 |
by (Blast_tac 2); |
|
| 3457 | 382 |
by (rtac (add_right_cancel RS iffD1) 1); |
383 |
by (rtac (card_Un_disjoint RS subst) 1); |
|
384 |
by (etac ssubst 4); |
|
| 3352 | 385 |
by (Blast_tac 3); |
386 |
by (ALLGOALS |
|
387 |
(asm_simp_tac |
|
| 4089 | 388 |
(simpset() addsimps [add_commute, not_less_iff_le, |
|
5416
9f029e382b5d
New law card_Un_Int. Removed card_insert from simpset
paulson
parents:
5413
diff
changeset
|
389 |
add_diff_inverse, card_mono, finite_subset]))); |
| 3352 | 390 |
qed "card_Diff_subset"; |
| 1531 | 391 |
|
|
5143
b94cd208f073
Removal of leading "\!\!..." from most Goal commands
paulson
parents:
5069
diff
changeset
|
392 |
Goal "[| finite A; x: A |] ==> card(A-{x}) < card A";
|
| 2031 | 393 |
by (rtac Suc_less_SucD 1); |
| 5626 | 394 |
by (asm_simp_tac (simpset() addsimps [card_Suc_Diff1]) 1); |
395 |
qed "card_Diff1_less"; |
|
| 1618 | 396 |
|
|
5143
b94cd208f073
Removal of leading "\!\!..." from most Goal commands
paulson
parents:
5069
diff
changeset
|
397 |
Goal "finite A ==> card(A-{x}) <= card A";
|
|
4768
c342d63173e9
New theorems card_Diff_le and card_insert_le; tidied
paulson
parents:
4763
diff
changeset
|
398 |
by (case_tac "x: A" 1); |
| 5626 | 399 |
by (ALLGOALS (asm_simp_tac (simpset() addsimps [card_Diff1_less, less_imp_le]))); |
400 |
qed "card_Diff1_le"; |
|
| 1531 | 401 |
|
|
5148
74919e8f221c
More tidying and removal of "\!\!... from Goal commands
paulson
parents:
5143
diff
changeset
|
402 |
Goalw [psubset_def] "finite B ==> !A. A < B --> card(A) < card(B)"; |
|
3222
726a9b069947
Distributed Psubset stuff to basic set theory files, incl Finite.
nipkow
parents:
2922
diff
changeset
|
403 |
by (etac finite_induct 1); |
|
726a9b069947
Distributed Psubset stuff to basic set theory files, incl Finite.
nipkow
parents:
2922
diff
changeset
|
404 |
by (Simp_tac 1); |
| 3708 | 405 |
by (Clarify_tac 1); |
|
3222
726a9b069947
Distributed Psubset stuff to basic set theory files, incl Finite.
nipkow
parents:
2922
diff
changeset
|
406 |
by (case_tac "x:A" 1); |
|
726a9b069947
Distributed Psubset stuff to basic set theory files, incl Finite.
nipkow
parents:
2922
diff
changeset
|
407 |
(*1*) |
|
3413
c1f63cc3a768
Finite.ML Finite.thy: Replaced `finite subset of' by mere `finite'.
nipkow
parents:
3389
diff
changeset
|
408 |
by (dres_inst_tac [("A","A")]mk_disjoint_insert 1);
|
| 4775 | 409 |
by (Clarify_tac 1); |
410 |
by (rotate_tac ~3 1); |
|
411 |
by (asm_full_simp_tac (simpset() addsimps [finite_subset]) 1); |
|
| 3708 | 412 |
by (Blast_tac 1); |
|
3222
726a9b069947
Distributed Psubset stuff to basic set theory files, incl Finite.
nipkow
parents:
2922
diff
changeset
|
413 |
(*2*) |
| 3708 | 414 |
by (eres_inst_tac [("P","?a<?b")] notE 1);
|
| 4775 | 415 |
by (asm_full_simp_tac (simpset() addsimps [subset_insert_iff]) 1); |
|
3222
726a9b069947
Distributed Psubset stuff to basic set theory files, incl Finite.
nipkow
parents:
2922
diff
changeset
|
416 |
by (case_tac "A=F" 1); |
|
8741
61bc5ed22b62
removal of less_SucI, le_SucI from default simpset
paulson
parents:
8554
diff
changeset
|
417 |
by (ALLGOALS (asm_simp_tac (simpset() addsimps [less_SucI]))); |
|
3222
726a9b069947
Distributed Psubset stuff to basic set theory files, incl Finite.
nipkow
parents:
2922
diff
changeset
|
418 |
qed_spec_mp "psubset_card" ; |
| 3368 | 419 |
|
| 7821 | 420 |
Goal "[| A <= B; card B <= card A; finite B |] ==> A = B"; |
| 5626 | 421 |
by (case_tac "A < B" 1); |
| 7497 | 422 |
by (datac psubset_card 1 1); |
| 5626 | 423 |
by (ALLGOALS (asm_full_simp_tac (simpset() addsimps [psubset_eq]))); |
424 |
qed "card_seteq"; |
|
425 |
||
426 |
Goal "[| finite B; A <= B; card A < card B |] ==> A < B"; |
|
427 |
by (etac psubsetI 1); |
|
428 |
by (Blast_tac 1); |
|
429 |
qed "card_psubset"; |
|
430 |
||
431 |
(*** Cardinality of image ***) |
|
432 |
||
433 |
Goal "finite A ==> card (f `` A) <= card A"; |
|
434 |
by (etac finite_induct 1); |
|
435 |
by (Simp_tac 1); |
|
|
8741
61bc5ed22b62
removal of less_SucI, le_SucI from default simpset
paulson
parents:
8554
diff
changeset
|
436 |
by (asm_simp_tac (simpset() addsimps [le_SucI,finite_imageI,card_insert_if]) 1); |
| 5626 | 437 |
qed "card_image_le"; |
438 |
||
439 |
Goal "finite(A) ==> inj_on f A --> card (f `` A) = card A"; |
|
440 |
by (etac finite_induct 1); |
|
441 |
by (ALLGOALS Asm_simp_tac); |
|
442 |
by Safe_tac; |
|
443 |
by (rewtac inj_on_def); |
|
444 |
by (Blast_tac 1); |
|
445 |
by (stac card_insert_disjoint 1); |
|
446 |
by (etac finite_imageI 1); |
|
447 |
by (Blast_tac 1); |
|
448 |
by (Blast_tac 1); |
|
449 |
qed_spec_mp "card_image"; |
|
450 |
||
451 |
Goal "[| finite A; f``A <= A; inj_on f A |] ==> f``A = A"; |
|
| 7497 | 452 |
by (etac card_seteq 1); |
453 |
by (dtac (card_image RS sym) 1); |
|
454 |
by Auto_tac; |
|
| 5626 | 455 |
qed "endo_inj_surj"; |
456 |
||
457 |
(*** Cardinality of the Powerset ***) |
|
458 |
||
459 |
Goal "finite A ==> card (Pow A) = 2 ^ card A"; |
|
460 |
by (etac finite_induct 1); |
|
461 |
by (ALLGOALS (asm_simp_tac (simpset() addsimps [Pow_insert]))); |
|
462 |
by (stac card_Un_disjoint 1); |
|
463 |
by (EVERY (map (blast_tac (claset() addIs [finite_imageI])) [3,2,1])); |
|
464 |
by (subgoal_tac "inj_on (insert x) (Pow F)" 1); |
|
465 |
by (asm_simp_tac (simpset() addsimps [card_image, Pow_insert]) 1); |
|
466 |
by (rewtac inj_on_def); |
|
467 |
by (blast_tac (claset() addSEs [equalityE]) 1); |
|
468 |
qed "card_Pow"; |
|
469 |
||
| 3368 | 470 |
|
| 3430 | 471 |
(*Relates to equivalence classes. Based on a theorem of F. Kammueller's. |
| 3368 | 472 |
The "finite C" premise is redundant*) |
|
5143
b94cd208f073
Removal of leading "\!\!..." from most Goal commands
paulson
parents:
5069
diff
changeset
|
473 |
Goal "finite C ==> finite (Union C) --> \ |
| 3368 | 474 |
\ (! c : C. k dvd card c) --> \ |
475 |
\ (! c1: C. ! c2: C. c1 ~= c2 --> c1 Int c2 = {}) \
|
|
476 |
\ --> k dvd card(Union C)"; |
|
477 |
by (etac finite_induct 1); |
|
478 |
by (ALLGOALS Asm_simp_tac); |
|
| 3708 | 479 |
by (Clarify_tac 1); |
| 3368 | 480 |
by (stac card_Un_disjoint 1); |
481 |
by (ALLGOALS |
|
| 4089 | 482 |
(asm_full_simp_tac (simpset() |
| 3368 | 483 |
addsimps [dvd_add, disjoint_eq_subset_Compl]))); |
484 |
by (thin_tac "!c:F. ?PP(c)" 1); |
|
485 |
by (thin_tac "!c:F. ?PP(c) & ?QQ(c)" 1); |
|
| 3708 | 486 |
by (Clarify_tac 1); |
| 3368 | 487 |
by (ball_tac 1); |
488 |
by (Blast_tac 1); |
|
489 |
qed_spec_mp "dvd_partition"; |
|
490 |
||
| 5616 | 491 |
|
492 |
(*** foldSet ***) |
|
493 |
||
| 6141 | 494 |
val empty_foldSetE = foldSet.mk_cases "({}, x) : foldSet f e";
|
| 5616 | 495 |
|
496 |
AddSEs [empty_foldSetE]; |
|
497 |
AddIs foldSet.intrs; |
|
498 |
||
499 |
Goal "[| (A-{x},y) : foldSet f e; x: A |] ==> (A, f x y) : foldSet f e";
|
|
500 |
by (etac (insert_Diff RS subst) 1 THEN resolve_tac foldSet.intrs 1); |
|
501 |
by Auto_tac; |
|
| 5626 | 502 |
qed "Diff1_foldSet"; |
| 5616 | 503 |
|
504 |
Goal "(A, x) : foldSet f e ==> finite(A)"; |
|
505 |
by (eresolve_tac [foldSet.induct] 1); |
|
506 |
by Auto_tac; |
|
507 |
qed "foldSet_imp_finite"; |
|
508 |
||
509 |
Addsimps [foldSet_imp_finite]; |
|
510 |
||
511 |
||
512 |
Goal "finite(A) ==> EX x. (A, x) : foldSet f e"; |
|
513 |
by (etac finite_induct 1); |
|
514 |
by Auto_tac; |
|
515 |
qed "finite_imp_foldSet"; |
|
516 |
||
517 |
||
518 |
Open_locale "LC"; |
|
519 |
||
|
5782
7559f116cb10
locales now implicitly quantify over free variables
paulson
parents:
5626
diff
changeset
|
520 |
val f_lcomm = thm "lcomm"; |
| 5616 | 521 |
|
522 |
||
523 |
Goal "ALL A x. card(A) < n --> (A, x) : foldSet f e --> \ |
|
524 |
\ (ALL y. (A, y) : foldSet f e --> y=x)"; |
|
525 |
by (induct_tac "n" 1); |
|
526 |
by (auto_tac (claset(), simpset() addsimps [less_Suc_eq])); |
|
527 |
by (etac foldSet.elim 1); |
|
528 |
by (Blast_tac 1); |
|
529 |
by (etac foldSet.elim 1); |
|
530 |
by (Blast_tac 1); |
|
531 |
by (Clarify_tac 1); |
|
532 |
(*force simplification of "card A < card (insert ...)"*) |
|
533 |
by (etac rev_mp 1); |
|
534 |
by (asm_simp_tac (simpset() addsimps [less_Suc_eq_le]) 1); |
|
535 |
by (rtac impI 1); |
|
536 |
(** LEVEL 10 **) |
|
537 |
by (rename_tac "Aa xa ya Ab xb yb" 1); |
|
538 |
by (case_tac "xa=xb" 1); |
|
539 |
by (subgoal_tac "Aa = Ab" 1); |
|
540 |
by (blast_tac (claset() addEs [equalityE]) 2); |
|
541 |
by (Blast_tac 1); |
|
542 |
(*case xa ~= xb*) |
|
543 |
by (subgoal_tac "Aa-{xb} = Ab-{xa} & xb : Aa & xa : Ab" 1);
|
|
544 |
by (blast_tac (claset() addEs [equalityE]) 2); |
|
545 |
by (Clarify_tac 1); |
|
546 |
by (subgoal_tac "Aa = insert xb Ab - {xa}" 1);
|
|
547 |
by (blast_tac (claset() addEs [equalityE]) 2); |
|
548 |
(** LEVEL 20 **) |
|
549 |
by (subgoal_tac "card Aa <= card Ab" 1); |
|
550 |
by (rtac (Suc_le_mono RS subst) 2); |
|
| 5626 | 551 |
by (asm_simp_tac (simpset() addsimps [card_Suc_Diff1]) 2); |
| 5616 | 552 |
by (res_inst_tac [("A1", "Aa-{xb}"), ("f1","f")]
|
553 |
(finite_imp_foldSet RS exE) 1); |
|
554 |
by (blast_tac (claset() addIs [foldSet_imp_finite, finite_Diff]) 1); |
|
| 7499 | 555 |
by (ftac Diff1_foldSet 1 THEN assume_tac 1); |
| 5616 | 556 |
by (subgoal_tac "ya = f xb x" 1); |
557 |
by (Blast_tac 2); |
|
558 |
by (subgoal_tac "(Ab - {xa}, x) : foldSet f e" 1);
|
|
559 |
by (Asm_full_simp_tac 2); |
|
560 |
by (subgoal_tac "yb = f xa x" 1); |
|
| 5626 | 561 |
by (blast_tac (claset() addDs [Diff1_foldSet]) 2); |
| 5616 | 562 |
by (asm_simp_tac (simpset() addsimps [f_lcomm]) 1); |
563 |
val lemma = result(); |
|
564 |
||
565 |
||
566 |
Goal "[| (A, x) : foldSet f e; (A, y) : foldSet f e |] ==> y=x"; |
|
567 |
by (blast_tac (claset() addIs [normalize_thm [RSspec, RSmp] lemma]) 1); |
|
568 |
qed "foldSet_determ"; |
|
569 |
||
570 |
Goalw [fold_def] "(A,y) : foldSet f e ==> fold f e A = y"; |
|
571 |
by (blast_tac (claset() addIs [foldSet_determ]) 1); |
|
572 |
qed "fold_equality"; |
|
573 |
||
574 |
Goalw [fold_def] "fold f e {} = e";
|
|
575 |
by (Blast_tac 1); |
|
576 |
qed "fold_empty"; |
|
577 |
Addsimps [fold_empty]; |
|
578 |
||
| 5626 | 579 |
|
| 5616 | 580 |
Goal "x ~: A ==> \ |
581 |
\ ((insert x A, v) : foldSet f e) = \ |
|
582 |
\ (EX y. (A, y) : foldSet f e & v = f x y)"; |
|
583 |
by Auto_tac; |
|
584 |
by (res_inst_tac [("A1", "A"), ("f1","f")] (finite_imp_foldSet RS exE) 1);
|
|
585 |
by (force_tac (claset() addDs [foldSet_imp_finite], simpset()) 1); |
|
586 |
by (blast_tac (claset() addIs [foldSet_determ]) 1); |
|
587 |
val lemma = result(); |
|
588 |
||
589 |
Goalw [fold_def] |
|
590 |
"[| finite A; x ~: A |] ==> fold f e (insert x A) = f x (fold f e A)"; |
|
591 |
by (asm_simp_tac (simpset() addsimps [lemma]) 1); |
|
592 |
by (rtac select_equality 1); |
|
593 |
by (auto_tac (claset() addIs [finite_imp_foldSet], |
|
594 |
simpset() addcongs [conj_cong] |
|
595 |
addsimps [symmetric fold_def, |
|
596 |
fold_equality])); |
|
597 |
qed "fold_insert"; |
|
598 |
||
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
599 |
Goal "finite A ==> ALL e. f x (fold f e A) = fold f (f x e) A"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
600 |
by (etac finite_induct 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
601 |
by (Simp_tac 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
602 |
by (asm_simp_tac (simpset() addsimps [f_lcomm, fold_insert]) 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
603 |
qed_spec_mp "fold_commute"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
604 |
|
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
605 |
Goal "[| finite A; finite B |] \ |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
606 |
\ ==> fold f (fold f e B) A = fold f (fold f e (A Int B)) (A Un B)"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
607 |
by (etac finite_induct 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
608 |
by (Simp_tac 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
609 |
by (asm_simp_tac (simpset() addsimps [fold_insert, fold_commute, |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
610 |
Int_insert_left, insert_absorb]) 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
611 |
qed "fold_nest_Un_Int"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
612 |
|
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
613 |
Goal "[| finite A; finite B; A Int B = {} |] \
|
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
614 |
\ ==> fold f e (A Un B) = fold f (fold f e B) A"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
615 |
by (asm_simp_tac (simpset() addsimps [fold_nest_Un_Int]) 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
616 |
qed "fold_nest_Un_disjoint"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
617 |
|
| 5626 | 618 |
(* Delete rules to do with foldSet relation: obsolete *) |
619 |
Delsimps [foldSet_imp_finite]; |
|
620 |
Delrules [empty_foldSetE]; |
|
621 |
Delrules foldSet.intrs; |
|
622 |
||
| 6024 | 623 |
Close_locale "LC"; |
| 5616 | 624 |
|
625 |
Open_locale "ACe"; |
|
626 |
||
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
627 |
(*We enter a more restrictive framework, with f :: ['a,'a] => 'a |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
628 |
instead of ['b,'a] => 'a |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
629 |
At present, none of these results are used!*) |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
630 |
|
|
5782
7559f116cb10
locales now implicitly quantify over free variables
paulson
parents:
5626
diff
changeset
|
631 |
val f_ident = thm "ident"; |
|
7559f116cb10
locales now implicitly quantify over free variables
paulson
parents:
5626
diff
changeset
|
632 |
val f_commute = thm "commute"; |
|
7559f116cb10
locales now implicitly quantify over free variables
paulson
parents:
5626
diff
changeset
|
633 |
val f_assoc = thm "assoc"; |
| 5616 | 634 |
|
635 |
||
636 |
Goal "f x (f y z) = f y (f x z)"; |
|
637 |
by (rtac (f_commute RS trans) 1); |
|
638 |
by (rtac (f_assoc RS trans) 1); |
|
639 |
by (rtac (f_commute RS arg_cong) 1); |
|
640 |
qed "f_left_commute"; |
|
641 |
||
642 |
val f_ac = [f_assoc, f_commute, f_left_commute]; |
|
643 |
||
644 |
Goal "f e x = x"; |
|
645 |
by (stac f_commute 1); |
|
646 |
by (rtac f_ident 1); |
|
647 |
qed "f_left_ident"; |
|
648 |
||
649 |
val f_idents = [f_left_ident, f_ident]; |
|
650 |
||
651 |
Goal "[| finite A; finite B |] \ |
|
652 |
\ ==> f (fold f e A) (fold f e B) = \ |
|
653 |
\ f (fold f e (A Un B)) (fold f e (A Int B))"; |
|
654 |
by (etac finite_induct 1); |
|
655 |
by (simp_tac (simpset() addsimps f_idents) 1); |
|
656 |
by (asm_simp_tac (simpset() addsimps f_ac @ f_idents @ |
|
657 |
[export fold_insert,insert_absorb, Int_insert_left]) 1); |
|
658 |
qed "fold_Un_Int"; |
|
659 |
||
660 |
Goal "[| finite A; finite B; A Int B = {} |] \
|
|
661 |
\ ==> fold f e (A Un B) = f (fold f e A) (fold f e B)"; |
|
662 |
by (asm_simp_tac (simpset() addsimps fold_Un_Int::f_idents) 1); |
|
663 |
qed "fold_Un_disjoint"; |
|
664 |
||
665 |
Goal |
|
666 |
"[| finite A; finite B |] ==> A Int B = {} --> \
|
|
667 |
\ fold (f o g) e (A Un B) = f (fold (f o g) e A) (fold (f o g) e B)"; |
|
668 |
by (etac finite_induct 1); |
|
669 |
by (simp_tac (simpset() addsimps f_idents) 1); |
|
670 |
by (asm_full_simp_tac (simpset() addsimps f_ac @ f_idents @ |
|
671 |
[export fold_insert,insert_absorb, Int_insert_left]) 1); |
|
672 |
qed "fold_Un_disjoint2"; |
|
673 |
||
| 6024 | 674 |
Close_locale "ACe"; |
| 5616 | 675 |
|
676 |
||
| 8981 | 677 |
(*** setsum: generalized summation over a set ***) |
| 5616 | 678 |
|
679 |
Goalw [setsum_def] "setsum f {} = 0";
|
|
| 6162 | 680 |
by (Simp_tac 1); |
| 5616 | 681 |
qed "setsum_empty"; |
682 |
Addsimps [setsum_empty]; |
|
683 |
||
684 |
Goalw [setsum_def] |
|
685 |
"[| finite F; a ~: F |] ==> setsum f (insert a F) = f(a) + setsum f F"; |
|
|
8963
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
686 |
by (asm_simp_tac (simpset() addsimps [export fold_insert, |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
687 |
thm "plus_ac0_left_commute"]) 1); |
| 5616 | 688 |
qed "setsum_insert"; |
689 |
Addsimps [setsum_insert]; |
|
690 |
||
| 9002 | 691 |
Goal "finite A ==> setsum (%i. 0) A = 0"; |
692 |
by (etac finite_induct 1); |
|
693 |
by Auto_tac; |
|
694 |
qed "setsum_0"; |
|
695 |
||
696 |
Goal "finite F ==> (setsum f F = 0) = (! a:F. f a = (0::nat))"; |
|
697 |
by (etac finite_induct 1); |
|
698 |
by Auto_tac; |
|
699 |
qed "setsum_eq_0_iff"; |
|
700 |
Addsimps [setsum_eq_0_iff]; |
|
701 |
||
702 |
Goal "[| setsum f F = Suc n; finite F |] ==> EX a:F. 0 < f a"; |
|
703 |
by (etac rev_mp 1); |
|
704 |
by (etac finite_induct 1); |
|
705 |
by Auto_tac; |
|
706 |
qed "setsum_SucD"; |
|
707 |
||
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
708 |
(*Could allow many "card" proofs to be simplified*) |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
709 |
Goal "finite A ==> card A = setsum (%x. 1) A"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
710 |
by (etac finite_induct 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
711 |
by Auto_tac; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
712 |
qed "card_eq_setsum"; |
| 5616 | 713 |
|
| 9002 | 714 |
(*The reversed orientation looks more natural, but LOOPS as a simprule!*) |
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
715 |
Goal "[| finite A; finite B |] \ |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
716 |
\ ==> setsum g (A Un B) + setsum g (A Int B) = setsum g A + setsum g B"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
717 |
by (etac finite_induct 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
718 |
by (Simp_tac 1); |
|
8963
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
719 |
by (asm_full_simp_tac (simpset() addsimps (thms "plus_ac0") @ |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
720 |
[Int_insert_left, insert_absorb]) 1); |
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
721 |
qed "setsum_Un_Int"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
722 |
|
| 8981 | 723 |
Goal "[| finite A; finite B; A Int B = {} |] \
|
724 |
\ ==> setsum g (A Un B) = setsum g A + setsum g B"; |
|
725 |
by (stac (setsum_Un_Int RS sym) 1); |
|
726 |
by Auto_tac; |
|
727 |
qed "setsum_Un_disjoint"; |
|
728 |
||
729 |
Goal "[| finite I |] \ |
|
730 |
\ ==> (ALL i:I. finite (A i)) --> (ALL i:I. ALL j:I. A i Int A j = {}) \
|
|
731 |
\ --> setsum f (UNION I A) = setsum (%i. setsum f (A i)) I"; |
|
732 |
by (etac finite_induct 1); |
|
733 |
by (Simp_tac 1); |
|
734 |
by (asm_simp_tac (simpset() addsimps [setsum_Un_disjoint]) 1); |
|
735 |
qed_spec_mp "setsum_UN_disjoint"; |
|
736 |
||
737 |
Goal "finite A ==> setsum (%x. f x + g x) A = setsum f A + setsum g A"; |
|
738 |
by (etac finite_induct 1); |
|
739 |
by Auto_tac; |
|
740 |
by (simp_tac (simpset() addsimps (thms "plus_ac0")) 1); |
|
741 |
qed "setsum_addf"; |
|
742 |
||
743 |
(** For the natural numbers, we have subtraction **) |
|
744 |
||
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
745 |
Goal "[| finite A; finite B |] \ |
|
8963
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
746 |
\ ==> (setsum f (A Un B) :: nat) = \ |
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
747 |
\ setsum f A + setsum f B - setsum f (A Int B)"; |
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
748 |
by (stac (setsum_Un_Int RS sym) 1); |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
749 |
by Auto_tac; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
750 |
qed "setsum_Un"; |
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
751 |
|
|
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
752 |
Goal "finite F \ |
|
8963
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
753 |
\ ==> (setsum f (F-{a}) :: nat) = \
|
|
0d4abacae6aa
setsum is now overloaded on plus_ac0; lemmas about lessThan, etc.
paulson
parents:
8911
diff
changeset
|
754 |
\ (if a:F then setsum f F - f a else setsum f F)"; |
| 6162 | 755 |
by (etac finite_induct 1); |
756 |
by (auto_tac (claset(), simpset() addsimps [insert_Diff_if])); |
|
757 |
by (dres_inst_tac [("a","a")] mk_disjoint_insert 1);
|
|
|
8911
c35b74bad518
fold_commute, fold_nest_Un_Int, setsum_Un and other new results
paulson
parents:
8889
diff
changeset
|
758 |
by Auto_tac; |
| 5616 | 759 |
qed_spec_mp "setsum_diff1"; |
| 7834 | 760 |
|
761 |
||
762 |
(*** Basic theorem about "choose". By Florian Kammueller, tidied by LCP ***) |
|
763 |
||
764 |
Goal "finite S ==> (card S = 0) = (S = {})";
|
|
765 |
by (auto_tac (claset() addDs [card_Suc_Diff1], |
|
766 |
simpset())); |
|
767 |
qed "card_0_empty_iff"; |
|
768 |
||
769 |
Goal "finite A ==> card {B. B <= A & card B = 0} = 1";
|
|
770 |
by (asm_simp_tac (simpset() addcongs [conj_cong] |
|
771 |
addsimps [finite_subset RS card_0_empty_iff]) 1); |
|
772 |
by (simp_tac (simpset() addcongs [rev_conj_cong]) 1); |
|
773 |
qed "card_s_0_eq_empty"; |
|
774 |
||
775 |
Goal "[| finite M; x ~: M |] \ |
|
776 |
\ ==> {s. s <= insert x M & card(s) = Suc k} \
|
|
777 |
\ = {s. s <= M & card(s) = Suc k} Un \
|
|
778 |
\ {s. EX t. t <= M & card(t) = k & s = insert x t}";
|
|
779 |
by Safe_tac; |
|
780 |
by (auto_tac (claset() addIs [finite_subset RS card_insert_disjoint], |
|
781 |
simpset())); |
|
782 |
by (dres_inst_tac [("x","xa - {x}")] spec 1);
|
|
783 |
by (subgoal_tac ("x ~: xa") 1);
|
|
784 |
by Auto_tac; |
|
785 |
by (etac rev_mp 1 THEN stac card_Diff_singleton 1); |
|
| 7958 | 786 |
by (auto_tac (claset() addIs [finite_subset], simpset())); |
| 7834 | 787 |
qed "choose_deconstruct"; |
788 |
||
| 8140 | 789 |
Goal "[| finite(A); finite(B); f``A <= B; inj_on f A |] \ |
| 7834 | 790 |
\ ==> card A <= card B"; |
791 |
by (auto_tac (claset() addIs [card_mono], |
|
| 8140 | 792 |
simpset() addsimps [card_image RS sym])); |
| 7834 | 793 |
qed "card_inj_on_le"; |
794 |
||
795 |
Goal "[| finite A; finite B; \ |
|
| 8140 | 796 |
\ f``A <= B; inj_on f A; g``B <= A; inj_on g B |] \ |
| 7834 | 797 |
\ ==> card(A) = card(B)"; |
798 |
by (auto_tac (claset() addIs [le_anti_sym,card_inj_on_le], simpset())); |
|
799 |
qed "card_bij_eq"; |
|
800 |
||
801 |
Goal "[| finite M; x ~: M |] \ |
|
802 |
\ ==> card{s. EX t. t <= M & card(t) = k & s = insert x t} = \
|
|
803 |
\ card {s. s <= M & card(s) = k}";
|
|
| 8140 | 804 |
by (res_inst_tac [("f", "%s. s - {x}"), ("g","insert x")] card_bij_eq 1);
|
| 7834 | 805 |
by (res_inst_tac [("B","Pow(insert x M)")] finite_subset 1);
|
806 |
by (res_inst_tac [("B","Pow(M)")] finite_subset 3);
|
|
| 8320 | 807 |
by (REPEAT(Fast_tac 1)); |
| 7834 | 808 |
(* arity *) |
| 8140 | 809 |
by (auto_tac (claset() addSEs [equalityE], simpset() addsimps [inj_on_def])); |
| 7834 | 810 |
by (stac Diff_insert0 1); |
811 |
by Auto_tac; |
|
812 |
qed "constr_bij"; |
|
813 |
||
814 |
(* Main theorem: combinatorial theorem about number of subsets of a set *) |
|
|
7842
6858c98385c3
simplified and generalized n_sub_lemma and n_subsets
paulson
parents:
7834
diff
changeset
|
815 |
Goal "(ALL A. finite A --> card {s. s <= A & card s = k} = (card A choose k))";
|
| 7834 | 816 |
by (induct_tac "k" 1); |
817 |
by (simp_tac (simpset() addsimps [card_s_0_eq_empty]) 1); |
|
818 |
(* first 0 case finished *) |
|
|
7842
6858c98385c3
simplified and generalized n_sub_lemma and n_subsets
paulson
parents:
7834
diff
changeset
|
819 |
(* prepare finite set induction *) |
|
6858c98385c3
simplified and generalized n_sub_lemma and n_subsets
paulson
parents:
7834
diff
changeset
|
820 |
by (rtac allI 1 THEN rtac impI 1); |
| 7834 | 821 |
(* second induction *) |
822 |
by (etac finite_induct 1); |
|
|
7842
6858c98385c3
simplified and generalized n_sub_lemma and n_subsets
paulson
parents:
7834
diff
changeset
|
823 |
by (ALLGOALS |
|
6858c98385c3
simplified and generalized n_sub_lemma and n_subsets
paulson
parents:
7834
diff
changeset
|
824 |
(simp_tac (simpset() addcongs [conj_cong] addsimps [card_s_0_eq_empty]))); |
| 7834 | 825 |
by (stac choose_deconstruct 1); |
826 |
by (assume_tac 1); |
|
827 |
by (assume_tac 1); |
|
828 |
by (stac card_Un_disjoint 1); |
|
829 |
by (Force_tac 3); |
|
|
7842
6858c98385c3
simplified and generalized n_sub_lemma and n_subsets
paulson
parents:
7834
diff
changeset
|
830 |
(** LEVEL 10 **) |
|
6858c98385c3
simplified and generalized n_sub_lemma and n_subsets
paulson
parents:
7834
diff
changeset
|
831 |
(* use bijection *) |
|
6858c98385c3
simplified and generalized n_sub_lemma and n_subsets
paulson
parents:
7834
diff
changeset
|
832 |
by (force_tac (claset(), simpset() addsimps [constr_bij]) 3); |
| 7834 | 833 |
(* finite goal *) |
834 |
by (res_inst_tac [("B","Pow F")] finite_subset 1);
|
|
835 |
by (Blast_tac 1); |
|
836 |
by (etac (finite_Pow_iff RS iffD2) 1); |
|
837 |
(* finite goal *) |
|
838 |
by (res_inst_tac [("B","Pow (insert x F)")] finite_subset 1);
|
|
839 |
by (Blast_tac 1); |
|
840 |
by (blast_tac (claset() addIs [finite_Pow_iff RS iffD2]) 1); |
|
841 |
qed "n_sub_lemma"; |
|
842 |
||
|
7842
6858c98385c3
simplified and generalized n_sub_lemma and n_subsets
paulson
parents:
7834
diff
changeset
|
843 |
Goal "finite M ==> card {s. s <= M & card(s) = k} = ((card M) choose k)";
|
| 7834 | 844 |
by (asm_simp_tac (simpset() addsimps [n_sub_lemma]) 1); |
845 |
qed "n_subsets"; |