isabelle: src/HOL/NumberTheory/WilsonRuss.thy@b1fcade3880b (annotated)

11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	1	(* Title: HOL/NumberTheory/WilsonRuss.thy
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	2	ID: $Id$
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm 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
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	5
f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	6	Changes by Jeremy Avigad, 2003/02/21:
f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	7	repaired proof of prime_g_5
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	8	*)
4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	9
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	10	header {* Wilson's Theorem according to Russinoff *}
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	11
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	12	theory WilsonRuss = EulerFermat:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	13
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	14	text {*
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	15	Wilson's Theorem following quite closely Russinoff's approach
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	16	using Boyer-Moore (using finite sets instead of lists, though).
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	17	*}
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	18
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	19	subsection {* Definitions and lemmas *}
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	consts
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	22	inv :: "int => int => int"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	23	wset :: "int * int => int set"
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	24
4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	25	defs
11704 3c50a2cd6f00 * sane numerals (stage 2): plain "num" syntax (removed "#"); wenzelm parents: 11701 diff changeset	26	inv_def: "inv p a == (a^(nat (p - 2))) mod p"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	27
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	28	recdef wset
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	29	"measure ((\<lambda>(a, p). nat a) :: int * int => nat)"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	30	"wset (a, p) =
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	31	(if 1 < a then
56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	32	let ws = wset (a - 1, p)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	33	in (if a \<in> ws then ws else insert a (insert (inv p a) ws)) else {})"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	34
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	35
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	36	text {* \medskip @{term [source] inv} *}
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	37
13524 604d0f3622d6 * empty log message * wenzelm parents: 13187 diff changeset	38	lemma inv_is_inv_aux: "1 < m ==> Suc (nat (m - 2)) = nat (m - 1)"
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	39	by (subst int_int_eq [symmetric], auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	40
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	41	lemma inv_is_inv:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	42	"p \<in> zprime \<Longrightarrow> 0 < a \<Longrightarrow> a < p ==> [a * inv p a = 1] (mod p)"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	43	apply (unfold inv_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	44	apply (subst zcong_zmod)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	45	apply (subst zmod_zmult1_eq [symmetric])
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	46	apply (subst zcong_zmod [symmetric])
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	47	apply (subst power_Suc [symmetric])
13524 604d0f3622d6 * empty log message * wenzelm parents: 13187 diff changeset	48	apply (subst inv_is_inv_aux)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	49	apply (erule_tac [2] Little_Fermat)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	50	apply (erule_tac [2] zdvd_not_zless)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	51	apply (unfold zprime_def, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	52	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	53
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	54	lemma inv_distinct:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	55	"p \<in> zprime \<Longrightarrow> 1 < a \<Longrightarrow> a < p - 1 ==> a \<noteq> inv p a"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	56	apply safe
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	57	apply (cut_tac a = a and p = p in zcong_square)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	58	apply (cut_tac [3] a = a and p = p in inv_is_inv, auto)
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	59	apply (subgoal_tac "a = 1")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	60	apply (rule_tac [2] m = p in zcong_zless_imp_eq)
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	61	apply (subgoal_tac [7] "a = p - 1")
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	62	apply (rule_tac [8] m = p in zcong_zless_imp_eq, auto)
11049 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 inv_not_0:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	66	"p \<in> zprime \<Longrightarrow> 1 < a \<Longrightarrow> a < p - 1 ==> inv p a \<noteq> 0"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	67	apply safe
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	68	apply (cut_tac a = a and p = p in inv_is_inv)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	69	apply (unfold zcong_def, auto)
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	70	apply (subgoal_tac "\<not> p dvd 1")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	71	apply (rule_tac [2] zdvd_not_zless)
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	72	apply (subgoal_tac "p dvd 1")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	73	prefer 2
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	74	apply (subst zdvd_zminus_iff [symmetric], auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	75	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	76
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	77	lemma inv_not_1:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	78	"p \<in> zprime \<Longrightarrow> 1 < a \<Longrightarrow> a < p - 1 ==> inv p a \<noteq> 1"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	79	apply safe
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	80	apply (cut_tac a = a and p = p in inv_is_inv)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	81	prefer 4
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	82	apply simp
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	83	apply (subgoal_tac "a = 1")
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	84	apply (rule_tac [2] zcong_zless_imp_eq, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	85	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	86
13524 604d0f3622d6 * empty log message * wenzelm parents: 13187 diff changeset	87	lemma inv_not_p_minus_1_aux: "[a * (p - 1) = 1] (mod p) = [a = p - 1] (mod p)"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	88	apply (unfold zcong_def)
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14271 diff changeset	89	apply (simp add: OrderedGroup.diff_diff_eq diff_diff_eq2 zdiff_zmult_distrib2)
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	90	apply (rule_tac s = "p dvd -((a + 1) + (p * -a))" in trans)
14271 8ed6989228bb Simplification of the development of Integers paulson parents: 13833 diff changeset	91	apply (simp add: mult_commute)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	92	apply (subst zdvd_zminus_iff)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	93	apply (subst zdvd_reduce)
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	94	apply (rule_tac s = "p dvd (a + 1) + (p * -1)" in trans)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	95	apply (subst zdvd_reduce, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	96	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	97
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	98	lemma inv_not_p_minus_1:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	99	"p \<in> zprime \<Longrightarrow> 1 < a \<Longrightarrow> a < p - 1 ==> inv p a \<noteq> p - 1"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	100	apply safe
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	101	apply (cut_tac a = a and p = p in inv_is_inv, auto)
13524 604d0f3622d6 * empty log message * wenzelm parents: 13187 diff changeset	102	apply (simp add: inv_not_p_minus_1_aux)
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	103	apply (subgoal_tac "a = p - 1")
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	104	apply (rule_tac [2] zcong_zless_imp_eq, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	105	done
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 inv_g_1:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	108	"p \<in> zprime \<Longrightarrow> 1 < a \<Longrightarrow> a < p - 1 ==> 1 < inv p a"
56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	109	apply (case_tac "0\<le> inv p a")
56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	110	apply (subgoal_tac "inv p a \<noteq> 1")
56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	111	apply (subgoal_tac "inv p a \<noteq> 0")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	112	apply (subst order_less_le)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	113	apply (subst zle_add1_eq_le [symmetric])
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	114	apply (subst order_less_le)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	115	apply (rule_tac [2] inv_not_0)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	116	apply (rule_tac [5] inv_not_1, auto)
f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	117	apply (unfold inv_def zprime_def, simp)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	118	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	119
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	120	lemma inv_less_p_minus_1:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	121	"p \<in> zprime \<Longrightarrow> 1 < a \<Longrightarrow> a < p - 1 ==> inv p a < p - 1"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	122	apply (case_tac "inv p a < p")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	123	apply (subst order_less_le)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	124	apply (simp add: inv_not_p_minus_1, auto)
f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	125	apply (unfold inv_def zprime_def, simp)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	126	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	127
13524 604d0f3622d6 * empty log message * wenzelm parents: 13187 diff changeset	128	lemma inv_inv_aux: "5 \<le> p ==>
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	129	nat (p - 2) * nat (p - 2) = Suc (nat (p - 1) * nat (p - 3))"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	130	apply (subst int_int_eq [symmetric])
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	131	apply (simp add: zmult_int [symmetric])
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	132	apply (simp add: zdiff_zmult_distrib zdiff_zmult_distrib2)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	133	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	134
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	135	lemma zcong_zpower_zmult:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	136	"[x^y = 1] (mod p) \<Longrightarrow> [x^(y * z) = 1] (mod p)"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	137	apply (induct z)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	138	apply (auto simp add: zpower_zadd_distrib)
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	139	apply (subgoal_tac "zcong (x^y * x^(y * n)) (1 * 1) p")
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	140	apply (rule_tac [2] zcong_zmult, simp_all)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	141	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	142
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	143	lemma inv_inv: "p \<in> zprime \<Longrightarrow>
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	144	5 \<le> p \<Longrightarrow> 0 < a \<Longrightarrow> a < p ==> inv p (inv p a) = a"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	145	apply (unfold inv_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	146	apply (subst zpower_zmod)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	147	apply (subst zpower_zpower)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	148	apply (rule zcong_zless_imp_eq)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	149	prefer 5
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	150	apply (subst zcong_zmod)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	151	apply (subst mod_mod_trivial)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	152	apply (subst zcong_zmod [symmetric])
13524 604d0f3622d6 * empty log message * wenzelm parents: 13187 diff changeset	153	apply (subst inv_inv_aux)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	154	apply (subgoal_tac [2]
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	155	"zcong (a * a^(nat (p - 1) * nat (p - 3))) (a * 1) p")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	156	apply (rule_tac [3] zcong_zmult)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	157	apply (rule_tac [4] zcong_zpower_zmult)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	158	apply (erule_tac [4] Little_Fermat)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	159	apply (rule_tac [4] zdvd_not_zless, simp_all)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	160	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	161
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	162
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	163	text {* \medskip @{term wset} *}
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	164
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	165	declare wset.simps [simp del]
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	166
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	167	lemma wset_induct:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	168	"(!!a p. P {} a p) \<Longrightarrow>
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	169	(!!a p. 1 < (a::int) \<Longrightarrow> P (wset (a - 1, p)) (a - 1) p
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	170	==> P (wset (a, p)) a p)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	171	==> P (wset (u, v)) u v"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	172	proof -
11549 e7265e70fd7c renamed "antecedent" case to "rule_context"; wenzelm parents: 11049 diff changeset	173	case rule_context
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	174	show ?thesis
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	175	apply (rule wset.induct, safe)
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	176	apply (case_tac [2] "1 < a")
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	177	apply (rule_tac [2] rule_context, simp_all)
11549 e7265e70fd7c renamed "antecedent" case to "rule_context"; wenzelm parents: 11049 diff changeset	178	apply (simp_all add: wset.simps rule_context)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	179	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	180	qed
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	181
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	182	lemma wset_mem_imp_or [rule_format]:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	183	"1 < a \<Longrightarrow> b \<notin> wset (a - 1, p)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	184	==> b \<in> wset (a, p) --> b = a \<or> b = inv p a"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	185	apply (subst wset.simps)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	186	apply (unfold Let_def, simp)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	187	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	188
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	189	lemma wset_mem_mem [simp]: "1 < a ==> a \<in> wset (a, p)"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	190	apply (subst wset.simps)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	191	apply (unfold Let_def, simp)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	192	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	193
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	194	lemma wset_subset: "1 < a \<Longrightarrow> b \<in> wset (a - 1, p) ==> b \<in> wset (a, p)"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	195	apply (subst wset.simps)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	196	apply (unfold Let_def, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	197	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	198
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	199	lemma wset_g_1 [rule_format]:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	200	"p \<in> zprime --> a < p - 1 --> b \<in> wset (a, p) --> 1 < b"
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	201	apply (induct a p rule: wset_induct, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	202	apply (case_tac "b = a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	203	apply (case_tac [2] "b = inv p a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	204	apply (subgoal_tac [3] "b = a \<or> b = inv p a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	205	apply (rule_tac [4] wset_mem_imp_or)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	206	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	207	apply simp
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	208	apply (rule inv_g_1, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	209	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	210
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	211	lemma wset_less [rule_format]:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	212	"p \<in> zprime --> a < p - 1 --> b \<in> wset (a, p) --> b < p - 1"
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	213	apply (induct a p rule: wset_induct, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	214	apply (case_tac "b = a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	215	apply (case_tac [2] "b = inv p a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	216	apply (subgoal_tac [3] "b = a \<or> b = inv p a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	217	apply (rule_tac [4] wset_mem_imp_or)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	218	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	219	apply simp
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	220	apply (rule inv_less_p_minus_1, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	221	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	222
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	223	lemma wset_mem [rule_format]:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	224	"p \<in> zprime -->
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	225	a < p - 1 --> 1 < b --> b \<le> a --> b \<in> wset (a, p)"
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	226	apply (induct a p rule: wset.induct, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	227	apply (subgoal_tac "b = a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	228	apply (rule_tac [2] zle_anti_sym)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	229	apply (rule_tac [4] wset_subset)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	230	apply (simp (no_asm_simp))
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
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	233
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	234	lemma wset_mem_inv_mem [rule_format]:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	235	"p \<in> zprime --> 5 \<le> p --> a < p - 1 --> b \<in> wset (a, p)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	236	--> inv p b \<in> wset (a, p)"
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	237	apply (induct a p rule: wset_induct, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	238	apply (case_tac "b = a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	239	apply (subst wset.simps)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	240	apply (unfold Let_def)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	241	apply (rule_tac [3] wset_subset, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	242	apply (case_tac "b = inv p a")
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	243	apply (simp (no_asm_simp))
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	244	apply (subst inv_inv)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	245	apply (subgoal_tac [6] "b = a \<or> b = inv p a")
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	246	apply (rule_tac [7] wset_mem_imp_or, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	247	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	248
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	249	lemma wset_inv_mem_mem:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	250	"p \<in> zprime \<Longrightarrow> 5 \<le> p \<Longrightarrow> a < p - 1 \<Longrightarrow> 1 < b \<Longrightarrow> b < p - 1
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	251	\<Longrightarrow> inv p b \<in> wset (a, p) \<Longrightarrow> b \<in> wset (a, p)"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	252	apply (rule_tac s = "inv p (inv p b)" and t = b in subst)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	253	apply (rule_tac [2] wset_mem_inv_mem)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	254	apply (rule inv_inv, simp_all)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	255	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	256
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	257	lemma wset_fin: "finite (wset (a, p))"
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	258	apply (induct a p rule: wset_induct)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	259	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	260	apply (subst wset.simps)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	261	apply (unfold Let_def, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	262	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	263
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	264	lemma wset_zcong_prod_1 [rule_format]:
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	265	"p \<in> zprime -->
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	266	5 \<le> p --> a < p - 1 --> [setprod (wset (a, p)) = 1] (mod p)"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	267	apply (induct a p rule: wset_induct)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	268	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	269	apply (subst wset.simps)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	270	apply (unfold Let_def, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	271	apply (subst setprod_insert)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	272	apply (tactic {* stac (thm "setprod_insert") 3 *})
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	273	apply (subgoal_tac [5]
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	274	"zcong (a * inv p a * setprod (wset (a - 1, p))) (1 * 1) p")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	275	prefer 5
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	276	apply (simp add: zmult_assoc)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	277	apply (rule_tac [5] zcong_zmult)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	278	apply (rule_tac [5] inv_is_inv)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	279	apply (tactic "Clarify_tac 4")
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	280	apply (subgoal_tac [4] "a \<in> wset (a - 1, p)")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	281	apply (rule_tac [5] wset_inv_mem_mem)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	282	apply (simp_all add: wset_fin)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	283	apply (rule inv_distinct, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	284	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	285
11704 3c50a2cd6f00 * sane numerals (stage 2): plain "num" syntax (removed "#"); wenzelm parents: 11701 diff changeset	286	lemma d22set_eq_wset: "p \<in> zprime ==> d22set (p - 2) = wset (p - 2, p)"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	287	apply safe
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	288	apply (erule wset_mem)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	289	apply (rule_tac [2] d22set_g_1)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	290	apply (rule_tac [3] d22set_le)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	291	apply (rule_tac [4] d22set_mem)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	292	apply (erule_tac [4] wset_g_1)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	293	prefer 6
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	294	apply (subst zle_add1_eq_le [symmetric])
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	295	apply (subgoal_tac "p - 2 + 1 = p - 1")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	296	apply (simp (no_asm_simp))
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	297	apply (erule wset_less, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	298	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	299
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	300
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	301	subsection {* Wilson *}
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	302
11704 3c50a2cd6f00 * sane numerals (stage 2): plain "num" syntax (removed "#"); wenzelm parents: 11701 diff changeset	303	lemma prime_g_5: "p \<in> zprime \<Longrightarrow> p \<noteq> 2 \<Longrightarrow> p \<noteq> 3 ==> 5 \<le> p"
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	304	apply (unfold zprime_def dvd_def)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	305	apply (case_tac "p = 4", auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	306	apply (rule notE)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	307	prefer 2
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	308	apply assumption
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	309	apply (simp (no_asm))
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	310	apply (rule_tac x = 2 in exI)
f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	311	apply (safe, arith)
f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	312	apply (rule_tac x = 2 in exI, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	313	done
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	314
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	315	theorem Wilson_Russ:
11868 56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	316	"p \<in> zprime ==> [zfact (p - 1) = -1] (mod p)"
56db9f3a6b3e Numerals now work for the integers: the binary numerals for 0 and 1 rewrite paulson parents: 11704 diff changeset	317	apply (subgoal_tac "[(p - 1) * zfact (p - 2) = -1 * 1] (mod p)")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	318	apply (rule_tac [2] zcong_zmult)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	319	apply (simp only: zprime_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	320	apply (subst zfact.simps)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	321	apply (rule_tac t = "p - 1 - 1" and s = "p - 2" in subst, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	322	apply (simp only: zcong_def)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	323	apply (simp (no_asm_simp))
11704 3c50a2cd6f00 * sane numerals (stage 2): plain "num" syntax (removed "#"); wenzelm parents: 11701 diff changeset	324	apply (case_tac "p = 2")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	325	apply (simp add: zfact.simps)
11704 3c50a2cd6f00 * sane numerals (stage 2): plain "num" syntax (removed "#"); wenzelm parents: 11701 diff changeset	326	apply (case_tac "p = 3")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	327	apply (simp add: zfact.simps)
11704 3c50a2cd6f00 * sane numerals (stage 2): plain "num" syntax (removed "#"); wenzelm parents: 11701 diff changeset	328	apply (subgoal_tac "5 \<le> p")
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	329	apply (erule_tac [2] prime_g_5)
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	330	apply (subst d22set_prod_zfact [symmetric])
7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	331	apply (subst d22set_eq_wset)
13833 f8dcb1d9ea68 zprime_def fixes by Jeremy Avigad paulson parents: 13788 diff changeset	332	apply (rule_tac [2] wset_zcong_prod_1, auto)
11049 7eef34adb852 HOL-NumberTheory: converted to new-style format and proper document setup; wenzelm parents: 9508 diff changeset	333	done
9508 4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	334
4d01dbf6ded7 Chinese Remainder Theorem, Wilsons Theorem, etc., by T M Masmussen paulson parents: diff changeset	335	end

author	wenzelm
	Sat, 29 May 2004 16:47:06 +0200
changeset 14846	b1fcade3880b
parent 14738	83f1a514dcb4
child 15197	19e735596e51
permissions	-rw-r--r--