isabelle: src/HOL/Old_Number_Theory/Quadratic_Reciprocity.thy@1c93cfa807bc (annotated)

32479 521cc9bf2958 some reorganization of number theory haftmann parents: 30034 diff changeset	1	(* Authors: Jeremy Avigad, David Gray, and Adam Kramer
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	2	*)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	3
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	4	header {* The law of Quadratic reciprocity *}
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	5
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	6	theory Quadratic_Reciprocity
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	7	imports Gauss
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	8	begin
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	9
19670 2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	10	text {*
2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	11	Lemmas leading up to the proof of theorem 3.3 in Niven and
2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	12	Zuckerman's presentation.
2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	13	*}
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	14
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	15	context GAUSS
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	16	begin
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	17
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	18	lemma QRLemma1: "a * setsum id A =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	19	p * setsum (%x. ((x * a) div p)) A + setsum id D + setsum id E"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	20	proof -
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	21	from finite_A have "a * setsum id A = setsum (%x. a * x) A"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	22	by (auto simp add: setsum_const_mult id_def)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	23	also have "setsum (%x. a * x) = setsum (%x. x * a)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	24	by (auto simp add: zmult_commute)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	25	also have "setsum (%x. x * a) A = setsum id B"
16733 236dfafbeb63 linear arithmetic now takes "&" in assumptions apart. nipkow parents: 16663 diff changeset	26	by (simp add: B_def setsum_reindex_id[OF inj_on_xa_A])
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	27	also have "... = setsum (%x. p * (x div p) + StandardRes p x) B"
16733 236dfafbeb63 linear arithmetic now takes "&" in assumptions apart. nipkow parents: 16663 diff changeset	28	by (auto simp add: StandardRes_def zmod_zdiv_equality)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	29	also have "... = setsum (%x. p * (x div p)) B + setsum (StandardRes p) B"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	30	by (rule setsum_addf)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	31	also have "setsum (StandardRes p) B = setsum id C"
16733 236dfafbeb63 linear arithmetic now takes "&" in assumptions apart. nipkow parents: 16663 diff changeset	32	by (auto simp add: C_def setsum_reindex_id[OF SR_B_inj])
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	33	also from C_eq have "... = setsum id (D \<union> E)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	34	by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	35	also from finite_D finite_E have "... = setsum id D + setsum id E"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	36	by (rule setsum_Un_disjoint) (auto simp add: D_def E_def)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	37	also have "setsum (%x. p * (x div p)) B =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	38	setsum ((%x. p * (x div p)) o (%x. (x * a))) A"
16733 236dfafbeb63 linear arithmetic now takes "&" in assumptions apart. nipkow parents: 16663 diff changeset	39	by (auto simp add: B_def setsum_reindex inj_on_xa_A)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	40	also have "... = setsum (%x. p * ((x * a) div p)) A"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	41	by (auto simp add: o_def)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	42	also from finite_A have "setsum (%x. p * ((x * a) div p)) A =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	43	p * setsum (%x. ((x * a) div p)) A"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	44	by (auto simp add: setsum_const_mult)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	45	finally show ?thesis by arith
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	46	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	47
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	48	lemma QRLemma2: "setsum id A = p * int (card E) - setsum id E +
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	49	setsum id D"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	50	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	51	from F_Un_D_eq_A have "setsum id A = setsum id (D \<union> F)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	52	by (simp add: Un_commute)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	53	also from F_D_disj finite_D finite_F
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	54	have "... = setsum id D + setsum id F"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	55	by (auto simp add: Int_commute intro: setsum_Un_disjoint)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	56	also from F_def have "F = (%x. (p - x)) ` E"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	57	by auto
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	58	also from finite_E inj_on_pminusx_E have "setsum id ((%x. (p - x)) ` E) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	59	setsum (%x. (p - x)) E"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	60	by (auto simp add: setsum_reindex)
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	61	also from finite_E have "setsum (op - p) E = setsum (%x. p) E - setsum id E"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	62	by (auto simp add: setsum_subtractf id_def)
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	63	also from finite_E have "setsum (%x. p) E = p * int(card E)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	64	by (intro setsum_const)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	65	finally show ?thesis
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	66	by arith
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	67	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	68
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	69	lemma QRLemma3: "(a - 1) * setsum id A =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	70	p * (setsum (%x. ((x * a) div p)) A - int(card E)) + 2 * setsum id E"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	71	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	72	have "(a - 1) * setsum id A = a * setsum id A - setsum id A"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	73	by (auto simp add: zdiff_zmult_distrib)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	74	also note QRLemma1
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	75	also from QRLemma2 have "p * (\<Sum>x \<in> A. x * a div p) + setsum id D +
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	76	setsum id E - setsum id A =
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	77	p * (\<Sum>x \<in> A. x * a div p) + setsum id D +
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	78	setsum id E - (p * int (card E) - setsum id E + setsum id D)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	79	by auto
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	80	also have "... = p * (\<Sum>x \<in> A. x * a div p) -
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	81	p * int (card E) + 2 * setsum id E"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	82	by arith
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	83	finally show ?thesis
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	84	by (auto simp only: zdiff_zmult_distrib2)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	85	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	86
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	87	lemma QRLemma4: "a \<in> zOdd ==>
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	88	(setsum (%x. ((x * a) div p)) A \<in> zEven) = (int(card E): zEven)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	89	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	90	assume a_odd: "a \<in> zOdd"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	91	from QRLemma3 have a: "p * (setsum (%x. ((x * a) div p)) A - int(card E)) =
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	92	(a - 1) * setsum id A - 2 * setsum id E"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	93	by arith
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	94	from a_odd have "a - 1 \<in> zEven"
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	95	by (rule odd_minus_one_even)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	96	hence "(a - 1) * setsum id A \<in> zEven"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	97	by (rule even_times_either)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	98	moreover have "2 * setsum id E \<in> zEven"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	99	by (auto simp add: zEven_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	100	ultimately have "(a - 1) * setsum id A - 2 * setsum id E \<in> zEven"
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	101	by (rule even_minus_even)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	102	with a have "p * (setsum (%x. ((x * a) div p)) A - int(card E)): zEven"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	103	by simp
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	104	hence "p \<in> zEven \| (setsum (%x. ((x * a) div p)) A - int(card E)): zEven"
14434 5f14c1207499 patch to NumberTheory problems caused by Parity paulson parents: 14387 diff changeset	105	by (rule EvenOdd.even_product)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	106	with p_odd have "(setsum (%x. ((x * a) div p)) A - int(card E)): zEven"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	107	by (auto simp add: odd_iff_not_even)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	108	thus ?thesis
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	109	by (auto simp only: even_diff [symmetric])
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	110	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	111
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	112	lemma QRLemma5: "a \<in> zOdd ==>
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	113	(-1::int)^(card E) = (-1::int)^(nat(setsum (%x. ((x * a) div p)) A))"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	114	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	115	assume "a \<in> zOdd"
23373 ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 23365 diff changeset	116	from QRLemma4 [OF this] have
ead82c82da9e tuned proofs: avoid implicit prems; wenzelm parents: 23365 diff changeset	117	"(int(card E): zEven) = (setsum (%x. ((x * a) div p)) A \<in> zEven)" ..
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	118	moreover have "0 \<le> int(card E)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	119	by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	120	moreover have "0 \<le> setsum (%x. ((x * a) div p)) A"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	121	proof (intro setsum_nonneg)
15537 5538d3244b4d continued eliminating sumr nipkow parents: 15402 diff changeset	122	show "\<forall>x \<in> A. 0 \<le> x * a div p"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	123	proof
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	124	fix x
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	125	assume "x \<in> A"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	126	then have "0 \<le> x"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	127	by (auto simp add: A_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	128	with a_nonzero have "0 \<le> x * a"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 13871 diff changeset	129	by (auto simp add: zero_le_mult_iff)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	130	with p_g_2 show "0 \<le> x * a div p"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	131	by (auto simp add: pos_imp_zdiv_nonneg_iff)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	132	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	133	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	134	ultimately have "(-1::int)^nat((int (card E))) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	135	(-1)^nat(((\<Sum>x \<in> A. x * a div p)))"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	136	by (intro neg_one_power_parity, auto)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	137	also have "nat (int(card E)) = card E"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	138	by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	139	finally show ?thesis .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	140	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	141
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	142	end
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	143
16663 13e9c402308b prime is a predicate now. nipkow parents: 15541 diff changeset	144	lemma MainQRLemma: "[\| a \<in> zOdd; 0 < a; ~([a = 0] (mod p)); zprime p; 2 < p;
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	145	A = {x. 0 < x & x \<le> (p - 1) div 2} \|] ==>
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	146	(Legendre a p) = (-1::int)^(nat(setsum (%x. ((x * a) div p)) A))"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	147	apply (subst GAUSS.gauss_lemma)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	148	apply (auto simp add: GAUSS_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	149	apply (subst GAUSS.QRLemma5)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	150	apply (auto simp add: GAUSS_def)
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	151	apply (simp add: GAUSS.A_def [OF GAUSS.intro] GAUSS_def)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	152	done
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	153
19670 2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	154
2e4a143c73c5 prefer 'definition' over low-level defs; wenzelm parents: 18369 diff changeset	155	subsection {* Stuff about S, S1 and S2 *}
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	156
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	157	locale QRTEMP =
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	158	fixes p :: "int"
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	159	fixes q :: "int"
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	160
16663 13e9c402308b prime is a predicate now. nipkow parents: 15541 diff changeset	161	assumes p_prime: "zprime p"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	162	assumes p_g_2: "2 < p"
16663 13e9c402308b prime is a predicate now. nipkow parents: 15541 diff changeset	163	assumes q_prime: "zprime q"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	164	assumes q_g_2: "2 < q"
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	165	assumes p_neq_q: "p \<noteq> q"
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	166	begin
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	167
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	168	definition
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	169	P_set :: "int set" where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	170	"P_set = {x. 0 < x & x \<le> ((p - 1) div 2) }"
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	171
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	172	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	173	Q_set :: "int set" where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	174	"Q_set = {x. 0 < x & x \<le> ((q - 1) div 2) }"
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	175
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	176	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	177	S :: "(int * int) set" where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	178	"S = P_set <*> Q_set"
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	179
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	180	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	181	S1 :: "(int * int) set" where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	182	"S1 = { (x, y). (x, y):S & ((p * y) < (q * x)) }"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	183
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	184	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	185	S2 :: "(int * int) set" where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	186	"S2 = { (x, y). (x, y):S & ((q * x) < (p * y)) }"
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	187
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	188	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	189	f1 :: "int => (int * int) set" where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	190	"f1 j = { (j1, y). (j1, y):S & j1 = j & (y \<le> (q * j) div p) }"
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	191
21404 eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	192	definition
eb85850d3eb7 more robust syntax for definition/abbreviation/notation; wenzelm parents: 21288 diff changeset	193	f2 :: "int => (int * int) set" where
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	194	"f2 j = { (x, j1). (x, j1):S & j1 = j & (x \<le> (p * j) div q) }"
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	195
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	196	lemma p_fact: "0 < (p - 1) div 2"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	197	proof -
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	198	from p_g_2 have "2 \<le> p - 1" by arith
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	199	then have "2 div 2 \<le> (p - 1) div 2" by (rule zdiv_mono1, auto)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	200	then show ?thesis by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	201	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	202
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	203	lemma q_fact: "0 < (q - 1) div 2"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	204	proof -
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	205	from q_g_2 have "2 \<le> q - 1" by arith
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	206	then have "2 div 2 \<le> (q - 1) div 2" by (rule zdiv_mono1, auto)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	207	then show ?thesis by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	208	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	209
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	210	lemma pb_neq_qa: "[\|1 \<le> b; b \<le> (q - 1) div 2 \|] ==>
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	211	(p * b \<noteq> q * a)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	212	proof
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	213	assume "p * b = q * a" and "1 \<le> b" and "b \<le> (q - 1) div 2"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	214	then have "q dvd (p * b)" by (auto simp add: dvd_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	215	with q_prime p_g_2 have "q dvd p \| q dvd b"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	216	by (auto simp add: zprime_zdvd_zmult)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	217	moreover have "~ (q dvd p)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	218	proof
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	219	assume "q dvd p"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	220	with p_prime have "q = 1 \| q = p"
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	221	apply (auto simp add: zprime_def QRTEMP_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	222	apply (drule_tac x = q and R = False in allE)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	223	apply (simp add: QRTEMP_def)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	224	apply (subgoal_tac "0 \<le> q", simp add: QRTEMP_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	225	apply (insert prems)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	226	apply (auto simp add: QRTEMP_def)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	227	done
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	228	with q_g_2 p_neq_q show False by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	229	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	230	ultimately have "q dvd b" by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	231	then have "q \<le> b"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	232	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	233	assume "q dvd b"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	234	moreover from prems have "0 < b" by auto
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	235	ultimately show ?thesis using zdvd_bounds [of q b] by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	236	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	237	with prems have "q \<le> (q - 1) div 2" by auto
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	238	then have "2 * q \<le> 2 * ((q - 1) div 2)" by arith
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	239	then have "2 * q \<le> q - 1"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	240	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	241	assume "2 * q \<le> 2 * ((q - 1) div 2)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	242	with prems have "q \<in> zOdd" by (auto simp add: QRTEMP_def zprime_zOdd_eq_grt_2)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	243	with odd_minus_one_even have "(q - 1):zEven" by auto
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	244	with even_div_2_prop2 have "(q - 1) = 2 * ((q - 1) div 2)" by auto
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	245	with prems show ?thesis by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	246	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	247	then have p1: "q \<le> -1" by arith
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	248	with q_g_2 show False by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	249	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	250
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	251	lemma P_set_finite: "finite (P_set)"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	252	using p_fact by (auto simp add: P_set_def bdd_int_set_l_le_finite)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	253
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	254	lemma Q_set_finite: "finite (Q_set)"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	255	using q_fact by (auto simp add: Q_set_def bdd_int_set_l_le_finite)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	256
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	257	lemma S_finite: "finite S"
15402 97204f3b4705 REorganized Finite_Set nipkow parents: 15392 diff changeset	258	by (auto simp add: S_def P_set_finite Q_set_finite finite_cartesian_product)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	259
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	260	lemma S1_finite: "finite S1"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	261	proof -
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	262	have "finite S" by (auto simp add: S_finite)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	263	moreover have "S1 \<subseteq> S" by (auto simp add: S1_def S_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	264	ultimately show ?thesis by (auto simp add: finite_subset)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	265	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	266
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	267	lemma S2_finite: "finite S2"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	268	proof -
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	269	have "finite S" by (auto simp add: S_finite)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	270	moreover have "S2 \<subseteq> S" by (auto simp add: S2_def S_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	271	ultimately show ?thesis by (auto simp add: finite_subset)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	272	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	273
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	274	lemma P_set_card: "(p - 1) div 2 = int (card (P_set))"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	275	using p_fact by (auto simp add: P_set_def card_bdd_int_set_l_le)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	276
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	277	lemma Q_set_card: "(q - 1) div 2 = int (card (Q_set))"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	278	using q_fact by (auto simp add: Q_set_def card_bdd_int_set_l_le)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	279
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	280	lemma S_card: "((p - 1) div 2) * ((q - 1) div 2) = int (card(S))"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	281	using P_set_card Q_set_card P_set_finite Q_set_finite
23431 25ca91279a9b change simp rules for of_nat to work like int did previously (reorient of_nat_Suc, remove of_nat_mult [simp]); preserve original variable names in legacy int theorems huffman parents: 23373 diff changeset	282	by (auto simp add: S_def zmult_int setsum_constant)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	283
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	284	lemma S1_Int_S2_prop: "S1 \<inter> S2 = {}"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	285	by (auto simp add: S1_def S2_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	286
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	287	lemma S1_Union_S2_prop: "S = S1 \<union> S2"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	288	apply (auto simp add: S_def P_set_def Q_set_def S1_def S2_def)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	289	proof -
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	290	fix a and b
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	291	assume "~ q * a < p * b" and b1: "0 < b" and b2: "b \<le> (q - 1) div 2"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	292	with zless_linear have "(p * b < q * a) \| (p * b = q * a)" by auto
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	293	moreover from pb_neq_qa b1 b2 have "(p * b \<noteq> q * a)" by auto
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	294	ultimately show "p * b < q * a" by auto
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	295	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	296
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	297	lemma card_sum_S1_S2: "((p - 1) div 2) * ((q - 1) div 2) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	298	int(card(S1)) + int(card(S2))"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	299	proof -
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	300	have "((p - 1) div 2) * ((q - 1) div 2) = int (card(S))"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	301	by (auto simp add: S_card)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	302	also have "... = int( card(S1) + card(S2))"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	303	apply (insert S1_finite S2_finite S1_Int_S2_prop S1_Union_S2_prop)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	304	apply (drule card_Un_disjoint, auto)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	305	done
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	306	also have "... = int(card(S1)) + int(card(S2))" by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	307	finally show ?thesis .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	308	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	309
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	310	lemma aux1a: "[\| 0 < a; a \<le> (p - 1) div 2;
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	311	0 < b; b \<le> (q - 1) div 2 \|] ==>
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	312	(p * b < q * a) = (b \<le> q * a div p)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	313	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	314	assume "0 < a" and "a \<le> (p - 1) div 2" and "0 < b" and "b \<le> (q - 1) div 2"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	315	have "p * b < q * a ==> b \<le> q * a div p"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	316	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	317	assume "p * b < q * a"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	318	then have "p * b \<le> q * a" by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	319	then have "(p * b) div p \<le> (q * a) div p"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	320	by (rule zdiv_mono1) (insert p_g_2, auto)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	321	then show "b \<le> (q * a) div p"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	322	apply (subgoal_tac "p \<noteq> 0")
30034 60f64f112174 removed redundant thms nipkow parents: 23431 diff changeset	323	apply (frule div_mult_self1_is_id, force)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	324	apply (insert p_g_2, auto)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	325	done
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	326	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	327	moreover have "b \<le> q * a div p ==> p * b < q * a"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	328	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	329	assume "b \<le> q * a div p"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	330	then have "p * b \<le> p * ((q * a) div p)"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	331	using p_g_2 by (auto simp add: mult_le_cancel_left)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	332	also have "... \<le> q * a"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	333	by (rule zdiv_leq_prop) (insert p_g_2, auto)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	334	finally have "p * b \<le> q * a" .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	335	then have "p * b < q * a \| p * b = q * a"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	336	by (simp only: order_le_imp_less_or_eq)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	337	moreover have "p * b \<noteq> q * a"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	338	by (rule pb_neq_qa) (insert prems, auto)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	339	ultimately show ?thesis by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	340	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	341	ultimately show ?thesis ..
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	342	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	343
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	344	lemma aux1b: "[\| 0 < a; a \<le> (p - 1) div 2;
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	345	0 < b; b \<le> (q - 1) div 2 \|] ==>
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	346	(q * a < p * b) = (a \<le> p * b div q)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	347	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	348	assume "0 < a" and "a \<le> (p - 1) div 2" and "0 < b" and "b \<le> (q - 1) div 2"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	349	have "q * a < p * b ==> a \<le> p * b div q"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	350	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	351	assume "q * a < p * b"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	352	then have "q * a \<le> p * b" by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	353	then have "(q * a) div q \<le> (p * b) div q"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	354	by (rule zdiv_mono1) (insert q_g_2, auto)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	355	then show "a \<le> (p * b) div q"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	356	apply (subgoal_tac "q \<noteq> 0")
30034 60f64f112174 removed redundant thms nipkow parents: 23431 diff changeset	357	apply (frule div_mult_self1_is_id, force)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	358	apply (insert q_g_2, auto)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	359	done
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	360	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	361	moreover have "a \<le> p * b div q ==> q * a < p * b"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	362	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	363	assume "a \<le> p * b div q"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	364	then have "q * a \<le> q * ((p * b) div q)"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	365	using q_g_2 by (auto simp add: mult_le_cancel_left)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	366	also have "... \<le> p * b"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	367	by (rule zdiv_leq_prop) (insert q_g_2, auto)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	368	finally have "q * a \<le> p * b" .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	369	then have "q * a < p * b \| q * a = p * b"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	370	by (simp only: order_le_imp_less_or_eq)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	371	moreover have "p * b \<noteq> q * a"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	372	by (rule pb_neq_qa) (insert prems, auto)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	373	ultimately show ?thesis by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	374	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	375	ultimately show ?thesis ..
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	376	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	377
21288 2c7d3d120418 tuned; wenzelm parents: 21233 diff changeset	378	lemma (in -) aux2: "[\| zprime p; zprime q; 2 < p; 2 < q \|] ==>
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	379	(q * ((p - 1) div 2)) div p \<le> (q - 1) div 2"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	380	proof-
16663 13e9c402308b prime is a predicate now. nipkow parents: 15541 diff changeset	381	assume "zprime p" and "zprime q" and "2 < p" and "2 < q"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	382	(* Set up what's even and odd *)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	383	then have "p \<in> zOdd & q \<in> zOdd"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	384	by (auto simp add: zprime_zOdd_eq_grt_2)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	385	then have even1: "(p - 1):zEven & (q - 1):zEven"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	386	by (auto simp add: odd_minus_one_even)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	387	then have even2: "(2 * p):zEven & ((q - 1) * p):zEven"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	388	by (auto simp add: zEven_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	389	then have even3: "(((q - 1) * p) + (2 * p)):zEven"
14434 5f14c1207499 patch to NumberTheory problems caused by Parity paulson parents: 14387 diff changeset	390	by (auto simp: EvenOdd.even_plus_even)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	391	(* using these prove it *)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	392	from prems have "q * (p - 1) < ((q - 1) * p) + (2 * p)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	393	by (auto simp add: int_distrib)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	394	then have "((p - 1) * q) div 2 < (((q - 1) * p) + (2 * p)) div 2"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	395	apply (rule_tac x = "((p - 1) * q)" in even_div_2_l)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	396	by (auto simp add: even3, auto simp add: zmult_ac)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	397	also have "((p - 1) * q) div 2 = q * ((p - 1) div 2)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	398	by (auto simp add: even1 even_prod_div_2)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	399	also have "(((q - 1) * p) + (2 * p)) div 2 = (((q - 1) div 2) * p) + p"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	400	by (auto simp add: even1 even2 even_prod_div_2 even_sum_div_2)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	401	finally show ?thesis
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	402	apply (rule_tac x = " q * ((p - 1) div 2)" and
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	403	y = "(q - 1) div 2" in div_prop2)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	404	using prems by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	405	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	406
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	407	lemma aux3a: "\<forall>j \<in> P_set. int (card (f1 j)) = (q * j) div p"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	408	proof
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	409	fix j
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	410	assume j_fact: "j \<in> P_set"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	411	have "int (card (f1 j)) = int (card {y. y \<in> Q_set & y \<le> (q * j) div p})"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	412	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	413	have "finite (f1 j)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	414	proof -
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	415	have "(f1 j) \<subseteq> S" by (auto simp add: f1_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	416	with S_finite show ?thesis by (auto simp add: finite_subset)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	417	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	418	moreover have "inj_on (%(x,y). y) (f1 j)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	419	by (auto simp add: f1_def inj_on_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	420	ultimately have "card ((%(x,y). y) ` (f1 j)) = card (f1 j)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	421	by (auto simp add: f1_def card_image)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	422	moreover have "((%(x,y). y) ` (f1 j)) = {y. y \<in> Q_set & y \<le> (q * j) div p}"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	423	using prems by (auto simp add: f1_def S_def Q_set_def P_set_def image_def)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	424	ultimately show ?thesis by (auto simp add: f1_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	425	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	426	also have "... = int (card {y. 0 < y & y \<le> (q * j) div p})"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	427	proof -
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	428	have "{y. y \<in> Q_set & y \<le> (q * j) div p} =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	429	{y. 0 < y & y \<le> (q * j) div p}"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	430	apply (auto simp add: Q_set_def)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	431	proof -
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	432	fix x
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	433	assume "0 < x" and "x \<le> q * j div p"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	434	with j_fact P_set_def have "j \<le> (p - 1) div 2" by auto
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	435	with q_g_2 have "q * j \<le> q * ((p - 1) div 2)"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	436	by (auto simp add: mult_le_cancel_left)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	437	with p_g_2 have "q * j div p \<le> q * ((p - 1) div 2) div p"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	438	by (auto simp add: zdiv_mono1)
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	439	also from prems P_set_def have "... \<le> (q - 1) div 2"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	440	apply simp
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	441	apply (insert aux2)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	442	apply (simp add: QRTEMP_def)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	443	done
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	444	finally show "x \<le> (q - 1) div 2" using prems by auto
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	445	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	446	then show ?thesis by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	447	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	448	also have "... = (q * j) div p"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	449	proof -
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	450	from j_fact P_set_def have "0 \<le> j" by auto
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14353 diff changeset	451	with q_g_2 have "q * 0 \<le> q * j" by (auto simp only: mult_left_mono)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	452	then have "0 \<le> q * j" by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	453	then have "0 div p \<le> (q * j) div p"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	454	apply (rule_tac a = 0 in zdiv_mono1)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	455	apply (insert p_g_2, auto)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	456	done
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	457	also have "0 div p = 0" by auto
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	458	finally show ?thesis by (auto simp add: card_bdd_int_set_l_le)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	459	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	460	finally show "int (card (f1 j)) = q * j div p" .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	461	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	462
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	463	lemma aux3b: "\<forall>j \<in> Q_set. int (card (f2 j)) = (p * j) div q"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	464	proof
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	465	fix j
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	466	assume j_fact: "j \<in> Q_set"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	467	have "int (card (f2 j)) = int (card {y. y \<in> P_set & y \<le> (p * j) div q})"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	468	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	469	have "finite (f2 j)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	470	proof -
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	471	have "(f2 j) \<subseteq> S" by (auto simp add: f2_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	472	with S_finite show ?thesis by (auto simp add: finite_subset)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	473	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	474	moreover have "inj_on (%(x,y). x) (f2 j)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	475	by (auto simp add: f2_def inj_on_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	476	ultimately have "card ((%(x,y). x) ` (f2 j)) = card (f2 j)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	477	by (auto simp add: f2_def card_image)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	478	moreover have "((%(x,y). x) ` (f2 j)) = {y. y \<in> P_set & y \<le> (p * j) div q}"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	479	using prems by (auto simp add: f2_def S_def Q_set_def P_set_def image_def)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	480	ultimately show ?thesis by (auto simp add: f2_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	481	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	482	also have "... = int (card {y. 0 < y & y \<le> (p * j) div q})"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	483	proof -
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	484	have "{y. y \<in> P_set & y \<le> (p * j) div q} =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	485	{y. 0 < y & y \<le> (p * j) div q}"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	486	apply (auto simp add: P_set_def)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	487	proof -
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	488	fix x
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	489	assume "0 < x" and "x \<le> p * j div q"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	490	with j_fact Q_set_def have "j \<le> (q - 1) div 2" by auto
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	491	with p_g_2 have "p * j \<le> p * ((q - 1) div 2)"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	492	by (auto simp add: mult_le_cancel_left)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	493	with q_g_2 have "p * j div q \<le> p * ((q - 1) div 2) div q"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	494	by (auto simp add: zdiv_mono1)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	495	also from prems have "... \<le> (p - 1) div 2"
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	496	by (auto simp add: aux2 QRTEMP_def)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	497	finally show "x \<le> (p - 1) div 2" using prems by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	498	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	499	then show ?thesis by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	500	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	501	also have "... = (p * j) div q"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	502	proof -
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	503	from j_fact Q_set_def have "0 \<le> j" by auto
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14353 diff changeset	504	with p_g_2 have "p * 0 \<le> p * j" by (auto simp only: mult_left_mono)
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	505	then have "0 \<le> p * j" by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	506	then have "0 div q \<le> (p * j) div q"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	507	apply (rule_tac a = 0 in zdiv_mono1)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	508	apply (insert q_g_2, auto)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	509	done
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	510	also have "0 div q = 0" by auto
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	511	finally show ?thesis by (auto simp add: card_bdd_int_set_l_le)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	512	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	513	finally show "int (card (f2 j)) = p * j div q" .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	514	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	515
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	516	lemma S1_card: "int (card(S1)) = setsum (%j. (q * j) div p) P_set"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	517	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	518	have "\<forall>x \<in> P_set. finite (f1 x)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	519	proof
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	520	fix x
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	521	have "f1 x \<subseteq> S" by (auto simp add: f1_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	522	with S_finite show "finite (f1 x)" by (auto simp add: finite_subset)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	523	qed
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	524	moreover have "(\<forall>x \<in> P_set. \<forall>y \<in> P_set. x \<noteq> y --> (f1 x) \<inter> (f1 y) = {})"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	525	by (auto simp add: f1_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	526	moreover note P_set_finite
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	527	ultimately have "int(card (UNION P_set f1)) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	528	setsum (%x. int(card (f1 x))) P_set"
15402 97204f3b4705 REorganized Finite_Set nipkow parents: 15392 diff changeset	529	by(simp add:card_UN_disjoint int_setsum o_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	530	moreover have "S1 = UNION P_set f1"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	531	by (auto simp add: f1_def S_def S1_def S2_def P_set_def Q_set_def aux1a)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	532	ultimately have "int(card (S1)) = setsum (%j. int(card (f1 j))) P_set"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	533	by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	534	also have "... = setsum (%j. q * j div p) P_set"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	535	using aux3a by(fastsimp intro: setsum_cong)
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	536	finally show ?thesis .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	537	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	538
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	539	lemma S2_card: "int (card(S2)) = setsum (%j. (p * j) div q) Q_set"
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	540	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	541	have "\<forall>x \<in> Q_set. finite (f2 x)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	542	proof
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	543	fix x
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	544	have "f2 x \<subseteq> S" by (auto simp add: f2_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	545	with S_finite show "finite (f2 x)" by (auto simp add: finite_subset)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	546	qed
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	547	moreover have "(\<forall>x \<in> Q_set. \<forall>y \<in> Q_set. x \<noteq> y -->
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	548	(f2 x) \<inter> (f2 y) = {})"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	549	by (auto simp add: f2_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	550	moreover note Q_set_finite
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	551	ultimately have "int(card (UNION Q_set f2)) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	552	setsum (%x. int(card (f2 x))) Q_set"
15402 97204f3b4705 REorganized Finite_Set nipkow parents: 15392 diff changeset	553	by(simp add:card_UN_disjoint int_setsum o_def)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	554	moreover have "S2 = UNION Q_set f2"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	555	by (auto simp add: f2_def S_def S1_def S2_def P_set_def Q_set_def aux1b)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	556	ultimately have "int(card (S2)) = setsum (%j. int(card (f2 j))) Q_set"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	557	by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	558	also have "... = setsum (%j. p * j div q) Q_set"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	559	using aux3b by(fastsimp intro: setsum_cong)
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	560	finally show ?thesis .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	561	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	562
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	563	lemma S1_carda: "int (card(S1)) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	564	setsum (%j. (j * q) div p) P_set"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	565	by (auto simp add: S1_card zmult_ac)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	566
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	567	lemma S2_carda: "int (card(S2)) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	568	setsum (%j. (j * p) div q) Q_set"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	569	by (auto simp add: S2_card zmult_ac)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	570
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	571	lemma pq_sum_prop: "(setsum (%j. (j * p) div q) Q_set) +
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	572	(setsum (%j. (j * q) div p) P_set) = ((p - 1) div 2) * ((q - 1) div 2)"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	573	proof -
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	574	have "(setsum (%j. (j * p) div q) Q_set) +
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	575	(setsum (%j. (j * q) div p) P_set) = int (card S2) + int (card S1)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	576	by (auto simp add: S1_carda S2_carda)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	577	also have "... = int (card S1) + int (card S2)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	578	by auto
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	579	also have "... = ((p - 1) div 2) * ((q - 1) div 2)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	580	by (auto simp add: card_sum_S1_S2)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	581	finally show ?thesis .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	582	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	583
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	584
21288 2c7d3d120418 tuned; wenzelm parents: 21233 diff changeset	585	lemma (in -) pq_prime_neq: "[\| zprime p; zprime q; p \<noteq> q \|] ==> (~[p = 0] (mod q))"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	586	apply (auto simp add: zcong_eq_zdvd_prop zprime_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	587	apply (drule_tac x = q in allE)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	588	apply (drule_tac x = p in allE)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	589	apply auto
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	590	done
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	591
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	592
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	593	lemma QR_short: "(Legendre p q) * (Legendre q p) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	594	(-1::int)^nat(((p - 1) div 2)*((q - 1) div 2))"
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	595	proof -
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	596	from prems have "~([p = 0] (mod q))"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	597	by (auto simp add: pq_prime_neq QRTEMP_def)
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	598	with prems Q_set_def have a1: "(Legendre p q) = (-1::int) ^
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	599	nat(setsum (%x. ((x * p) div q)) Q_set)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	600	apply (rule_tac p = q in MainQRLemma)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	601	apply (auto simp add: zprime_zOdd_eq_grt_2 QRTEMP_def)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	602	done
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	603	from prems have "~([q = 0] (mod p))"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	604	apply (rule_tac p = q and q = p in pq_prime_neq)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	605	apply (simp add: QRTEMP_def)+
16733 236dfafbeb63 linear arithmetic now takes "&" in assumptions apart. nipkow parents: 16663 diff changeset	606	done
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	607	with prems P_set_def have a2: "(Legendre q p) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	608	(-1::int) ^ nat(setsum (%x. ((x * q) div p)) P_set)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	609	apply (rule_tac p = p in MainQRLemma)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	610	apply (auto simp add: zprime_zOdd_eq_grt_2 QRTEMP_def)
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	611	done
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	612	from a1 a2 have "(Legendre p q) * (Legendre q p) =
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	613	(-1::int) ^ nat(setsum (%x. ((x * p) div q)) Q_set) *
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	614	(-1::int) ^ nat(setsum (%x. ((x * q) div p)) P_set)"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	615	by auto
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	616	also have "... = (-1::int) ^ (nat(setsum (%x. ((x * p) div q)) Q_set) +
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	617	nat(setsum (%x. ((x * q) div p)) P_set))"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	618	by (auto simp add: zpower_zadd_distrib)
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	619	also have "nat(setsum (%x. ((x * p) div q)) Q_set) +
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	620	nat(setsum (%x. ((x * q) div p)) P_set) =
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	621	nat((setsum (%x. ((x * p) div q)) Q_set) +
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	622	(setsum (%x. ((x * q) div p)) P_set))"
20898 113c9516a2d7 attribute symmetric: zero_var_indexes; wenzelm parents: 20432 diff changeset	623	apply (rule_tac z = "setsum (%x. ((x * p) div q)) Q_set" in
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	624	nat_add_distrib [symmetric])
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	625	apply (auto simp add: S1_carda [symmetric] S2_carda [symmetric])
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	626	done
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	627	also have "... = nat(((p - 1) div 2) * ((q - 1) div 2))"
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	628	by (auto simp add: pq_sum_prop)
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	629	finally show ?thesis .
290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	630	qed
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	631
21233 5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	632	end
5a5c8ea5f66a tuned specifications; wenzelm parents: 20898 diff changeset	633
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	634	theorem Quadratic_Reciprocity:
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	635	"[\| p \<in> zOdd; zprime p; q \<in> zOdd; zprime q;
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	636	p \<noteq> q \|]
694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	637	==> (Legendre p q) * (Legendre q p) =
15392 290bc97038c7 First step in reorganizing Finite_Set nipkow parents: 14981 diff changeset	638	(-1::int)^nat(((p - 1) div 2)*((q - 1) div 2))"
18369 694ea14ab4f2 tuned sources and proofs wenzelm parents: 16733 diff changeset	639	by (auto simp add: QRTEMP.QR_short zprime_zOdd_eq_grt_2 [symmetric]
13871 26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	640	QRTEMP_def)
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	641
26e5f5e624f6 Gauss's law of quadratic reciprocity by Avigad, Gray and Kramer paulson parents: diff changeset	642	end

author	wenzelm
	Mon, 19 Oct 2009 23:02:23 +0200
changeset 33003	1c93cfa807bc
parent 32479	521cc9bf2958
child 38159	e9b4835a54ee
permissions	-rw-r--r--