| author | blanchet |
| Fri, 14 May 2010 16:15:10 +0200 | |
| changeset 36922 | 12f87df9c1a5 |
| parent 35440 | bdf8ad377877 |
| child 38159 | e9b4835a54ee |
| permissions | -rw-r--r-- |
| 32479 | 1 |
(* Author: Thomas M. Rasmussen |
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Copyright 2000 University of Cambridge |
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Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
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*) |
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4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
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HOL-NumberTheory: converted to new-style format and proper document setup;
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header {* Factorial on integers *}
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HOL-NumberTheory: converted to new-style format and proper document setup;
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theory IntFact imports IntPrimes begin |
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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text {*
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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Factorial on integers and recursively defined set including all |
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11701
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sane numerals (stage 1): added generic 1, removed 1' and 2 on nat,
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Integers from @{text 2} up to @{text a}. Plus definition of product
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HOL-NumberTheory: converted to new-style format and proper document setup;
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of finite set. |
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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\bigskip |
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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*} |
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Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
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| 35440 | 17 |
fun |
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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zfact :: "int => int" |
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where |
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Numerals now work for the integers: the binary numerals for 0 and 1 rewrite
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"zfact n = (if n \<le> 0 then 1 else n * zfact (n - 1))" |
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Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
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parents:
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fun |
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d22set :: "int => int set" |
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where |
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Numerals now work for the integers: the binary numerals for 0 and 1 rewrite
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parents:
11701
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"d22set a = (if 1 < a then insert a (d22set (a - 1)) else {})"
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11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
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changeset
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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changeset
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text {*
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\medskip @{term d22set} --- recursively defined set including all
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11701
3d51fbf81c17
sane numerals (stage 1): added generic 1, removed 1' and 2 on nat,
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parents:
11549
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integers from @{text 2} up to @{text a}
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11049
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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changeset
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*} |
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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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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declare d22set.simps [simp del] |
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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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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changeset
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lemma d22set_induct: |
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assumes "!!a. P {} a"
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and "!!a. 1 < (a::int) ==> P (d22set (a - 1)) (a - 1) ==> P (d22set a) a" |
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shows "P (d22set u) u" |
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apply (rule d22set.induct) |
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apply (case_tac "1 < a") |
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apply (rule_tac assms) |
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apply (simp_all (no_asm_simp)) |
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apply (simp_all (no_asm_simp) add: d22set.simps assms) |
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done |
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Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
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46 |
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11868
56db9f3a6b3e
Numerals now work for the integers: the binary numerals for 0 and 1 rewrite
paulson
parents:
11701
diff
changeset
|
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lemma d22set_g_1 [rule_format]: "b \<in> d22set a --> 1 < b" |
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11049
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
9508
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changeset
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apply (induct a rule: d22set_induct) |
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apply simp |
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apply (subst d22set.simps) |
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apply auto |
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11049
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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changeset
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done |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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lemma d22set_le [rule_format]: "b \<in> d22set a --> b \<le> a" |
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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apply (induct a rule: d22set_induct) |
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apply simp |
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11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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apply (subst d22set.simps) |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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changeset
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apply auto |
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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changeset
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done |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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lemma d22set_le_swap: "a < b ==> b \<notin> d22set a" |
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by (auto dest: d22set_le) |
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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diff
changeset
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lemma d22set_mem: "1 < b \<Longrightarrow> b \<le> a \<Longrightarrow> b \<in> d22set a" |
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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apply (induct a rule: d22set.induct) |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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apply auto |
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apply (subst d22set.simps) |
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apply (case_tac "b < a", auto) |
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11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
69 |
done |
|
9508
4d01dbf6ded7
Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen
paulson
parents:
diff
changeset
|
70 |
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11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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lemma d22set_fin: "finite (d22set a)" |
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parents:
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apply (induct a rule: d22set_induct) |
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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diff
changeset
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prefer 2 |
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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apply (subst d22set.simps) |
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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changeset
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apply auto |
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HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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done |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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77 |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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78 |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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declare zfact.simps [simp del] |
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HOL-NumberTheory: converted to new-style format and proper document setup;
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parents:
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diff
changeset
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80 |
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lemma d22set_prod_zfact: "\<Prod>(d22set a) = zfact a" |
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parents:
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changeset
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apply (induct a rule: d22set.induct) |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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apply (subst d22set.simps) |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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84 |
apply (subst zfact.simps) |
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11868
56db9f3a6b3e
Numerals now work for the integers: the binary numerals for 0 and 1 rewrite
paulson
parents:
11701
diff
changeset
|
85 |
apply (case_tac "1 < a") |
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11049
7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
86 |
prefer 2 |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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apply (simp add: d22set.simps zfact.simps) |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
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apply (simp add: d22set_fin d22set_le_swap) |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
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changeset
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89 |
done |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
diff
changeset
|
90 |
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7eef34adb852
HOL-NumberTheory: converted to new-style format and proper document setup;
wenzelm
parents:
9508
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91 |
end |