isabelle: src/HOL/GCD.thy@a3f67a4459e1 (annotated)

63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1	(* Title: HOL/GCD.thy
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2	Author: Christophe Tabacznyj
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	3	Author: Lawrence C. Paulson
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	4	Author: Amine Chaieb
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	5	Author: Thomas M. Rasmussen
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	6	Author: Jeremy Avigad
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	7	Author: Tobias Nipkow
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	8
32479 521cc9bf2958 some reorganization of number theory haftmann parents: 32415 diff changeset	9	This file deals with the functions gcd and lcm. Definitions and
521cc9bf2958 some reorganization of number theory haftmann parents: 32415 diff changeset	10	lemmas are proved uniformly for the natural numbers and integers.
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	11
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	12	This file combines and revises a number of prior developments.
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	13
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	14	The original theories "GCD" and "Primes" were by Christophe Tabacznyj
58623 2db1df2c8467 more bibtex entries; wenzelm parents: 57514 diff changeset	15	and Lawrence C. Paulson, based on @{cite davenport92}. They introduced
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	16	gcd, lcm, and prime for the natural numbers.
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	17
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	18	The original theory "IntPrimes" was by Thomas M. Rasmussen, and
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	19	extended gcd, lcm, primes to the integers. Amine Chaieb provided
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	20	another extension of the notions to the integers, and added a number
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	21	of results to "Primes" and "GCD". IntPrimes also defined and developed
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	22	the congruence relations on the integers. The notion was extended to
34915 7894c7dab132 Adapted to changes in induct method. berghofe parents: 34223 diff changeset	23	the natural numbers by Chaieb.
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	24
32036 8a9228872fbd Moved factorial lemmas from Binomial.thy to Fact.thy and merged. avigad parents: 31952 diff changeset	25	Jeremy Avigad combined all of these, made everything uniform for the
8a9228872fbd Moved factorial lemmas from Binomial.thy to Fact.thy and merged. avigad parents: 31952 diff changeset	26	natural numbers and the integers, and added a number of new theorems.
8a9228872fbd Moved factorial lemmas from Binomial.thy to Fact.thy and merged. avigad parents: 31952 diff changeset	27
31798 fe9a3043d36c Cleaned up GCD nipkow parents: 31766 diff changeset	28	Tobias Nipkow cleaned up a lot.
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	29	*)
47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	30
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60690 diff changeset	31	section \<open>Greatest common divisor and least common multiple\<close>
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	32
47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	33	theory GCD
74101 d804e93ae9ff moved theory Bit_Operations into Main corpus haftmann parents: 73109 diff changeset	34	imports Groups_List Code_Numeral
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	35	begin
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	36
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	37	subsection \<open>Abstract bounded quasi semilattices as common foundation\<close>
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	38
f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	39	locale bounded_quasi_semilattice = abel_semigroup +
65555 85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	40	fixes top :: 'a ("\<^bold>\<top>") and bot :: 'a ("\<^bold>\<bottom>")
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	41	and normalize :: "'a \<Rightarrow> 'a"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	42	assumes idem_normalize [simp]: "a \<^bold>* a = normalize a"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	43	and normalize_left_idem [simp]: "normalize a \<^bold>* b = a \<^bold>* b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	44	and normalize_idem [simp]: "normalize (a \<^bold>* b) = a \<^bold>* b"
65555 85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	45	and normalize_top [simp]: "normalize \<^bold>\<top> = \<^bold>\<top>"
85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	46	and normalize_bottom [simp]: "normalize \<^bold>\<bottom> = \<^bold>\<bottom>"
85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	47	and top_left_normalize [simp]: "\<^bold>\<top> \<^bold>* a = normalize a"
85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	48	and bottom_left_bottom [simp]: "\<^bold>\<bottom> \<^bold>* a = \<^bold>\<bottom>"
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	49	begin
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	50
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	51	lemma left_idem [simp]:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	52	"a \<^bold>* (a \<^bold>* b) = a \<^bold>* b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	53	using assoc [of a a b, symmetric] by simp
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	54
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	55	lemma right_idem [simp]:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	56	"(a \<^bold>* b) \<^bold>* b = a \<^bold>* b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	57	using left_idem [of b a] by (simp add: ac_simps)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	58
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	59	lemma comp_fun_idem: "comp_fun_idem f"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	60	by standard (simp_all add: fun_eq_iff ac_simps)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	61
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	62	interpretation comp_fun_idem f
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	63	by (fact comp_fun_idem)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	64
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	65	lemma top_right_normalize [simp]:
65555 85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	66	"a \<^bold>* \<^bold>\<top> = normalize a"
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	67	using top_left_normalize [of a] by (simp add: ac_simps)
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	68
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	69	lemma bottom_right_bottom [simp]:
65555 85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	70	"a \<^bold>* \<^bold>\<bottom> = \<^bold>\<bottom>"
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	71	using bottom_left_bottom [of a] by (simp add: ac_simps)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	72
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	73	lemma normalize_right_idem [simp]:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	74	"a \<^bold>* normalize b = a \<^bold>* b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	75	using normalize_left_idem [of b a] by (simp add: ac_simps)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	76
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	77	end
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	78
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	79	locale bounded_quasi_semilattice_set = bounded_quasi_semilattice
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	80	begin
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	81
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	82	interpretation comp_fun_idem f
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	83	by (fact comp_fun_idem)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	84
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	85	definition F :: "'a set \<Rightarrow> 'a"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	86	where
65555 85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	87	eq_fold: "F A = (if finite A then Finite_Set.fold f \<^bold>\<top> A else \<^bold>\<bottom>)"
85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	88
85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	89	lemma infinite [simp]:
85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	90	"infinite A \<Longrightarrow> F A = \<^bold>\<bottom>"
85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	91	by (simp add: eq_fold)
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	92
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	93	lemma set_eq_fold [code]:
65555 85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	94	"F (set xs) = fold f xs \<^bold>\<top>"
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	95	by (simp add: eq_fold fold_set_fold)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	96
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	97	lemma empty [simp]:
65555 85ed070017b7 include GCD as integral part of computational algebra in session HOL haftmann parents: 65552 diff changeset	98	"F {} = \<^bold>\<top>"
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	99	by (simp add: eq_fold)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	100
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	101	lemma insert [simp]:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	102	"F (insert a A) = a \<^bold>* F A"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	103	by (cases "finite A") (simp_all add: eq_fold)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	104
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	105	lemma normalize [simp]:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	106	"normalize (F A) = F A"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	107	by (induct A rule: infinite_finite_induct) simp_all
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	108
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	109	lemma in_idem:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	110	assumes "a \<in> A"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	111	shows "a \<^bold>* F A = F A"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	112	using assms by (induct A rule: infinite_finite_induct)
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	113	(auto simp: left_commute [of a])
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	114
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	115	lemma union:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	116	"F (A \<union> B) = F A \<^bold>* F B"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	117	by (induct A rule: infinite_finite_induct)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	118	(simp_all add: ac_simps)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	119
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	120	lemma remove:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	121	assumes "a \<in> A"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	122	shows "F A = a \<^bold>* F (A - {a})"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	123	proof -
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	124	from assms obtain B where "A = insert a B" and "a \<notin> B"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	125	by (blast dest: mk_disjoint_insert)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	126	with assms show ?thesis by simp
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	127	qed
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	128
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	129	lemma insert_remove:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	130	"F (insert a A) = a \<^bold>* F (A - {a})"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	131	by (cases "a \<in> A") (simp_all add: insert_absorb remove)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	132
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	133	lemma subset:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	134	assumes "B \<subseteq> A"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	135	shows "F B \<^bold>* F A = F A"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	136	using assms by (simp add: union [symmetric] Un_absorb1)
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	137
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	138	end
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	139
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	140	subsection \<open>Abstract GCD and LCM\<close>
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	141
31992 f8aed98faae7 More about gcd/lcm, and some cleaning up nipkow parents: 31952 diff changeset	142	class gcd = zero + one + dvd +
41550 efa734d9b221 eliminated global prems; wenzelm parents: 37770 diff changeset	143	fixes gcd :: "'a \<Rightarrow> 'a \<Rightarrow> 'a"
efa734d9b221 eliminated global prems; wenzelm parents: 37770 diff changeset	144	and lcm :: "'a \<Rightarrow> 'a \<Rightarrow> 'a"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	145
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	146	class Gcd = gcd +
63025 92680537201f capitalized GCD and LCM syntax haftmann parents: 62429 diff changeset	147	fixes Gcd :: "'a set \<Rightarrow> 'a"
92680537201f capitalized GCD and LCM syntax haftmann parents: 62429 diff changeset	148	and Lcm :: "'a set \<Rightarrow> 'a"
62350 66a381d3f88f more sophisticated GCD syntax haftmann parents: 62349 diff changeset	149
66a381d3f88f more sophisticated GCD syntax haftmann parents: 62349 diff changeset	150	syntax
63025 92680537201f capitalized GCD and LCM syntax haftmann parents: 62429 diff changeset	151	"_GCD1" :: "pttrns \<Rightarrow> 'b \<Rightarrow> 'b" ("(3GCD _./ _)" [0, 10] 10)
92680537201f capitalized GCD and LCM syntax haftmann parents: 62429 diff changeset	152	"_GCD" :: "pttrn \<Rightarrow> 'a set \<Rightarrow> 'b \<Rightarrow> 'b" ("(3GCD _\<in>_./ _)" [0, 0, 10] 10)
92680537201f capitalized GCD and LCM syntax haftmann parents: 62429 diff changeset	153	"_LCM1" :: "pttrns \<Rightarrow> 'b \<Rightarrow> 'b" ("(3LCM _./ _)" [0, 10] 10)
92680537201f capitalized GCD and LCM syntax haftmann parents: 62429 diff changeset	154	"_LCM" :: "pttrn \<Rightarrow> 'a set \<Rightarrow> 'b \<Rightarrow> 'b" ("(3LCM _\<in>_./ _)" [0, 0, 10] 10)
68795 210b687cdbbe dropped redundant syntax translation rules for big operators haftmann parents: 68708 diff changeset	155
62350 66a381d3f88f more sophisticated GCD syntax haftmann parents: 62349 diff changeset	156	translations
68796 9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility haftmann parents: 68795 diff changeset	157	"GCD x y. f" \<rightleftharpoons> "GCD x. GCD y. f"
9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility haftmann parents: 68795 diff changeset	158	"GCD x. f" \<rightleftharpoons> "CONST Gcd (CONST range (\<lambda>x. f))"
9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility haftmann parents: 68795 diff changeset	159	"GCD x\<in>A. f" \<rightleftharpoons> "CONST Gcd ((\<lambda>x. f) ` A)"
9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility haftmann parents: 68795 diff changeset	160	"LCM x y. f" \<rightleftharpoons> "LCM x. LCM y. f"
9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility haftmann parents: 68795 diff changeset	161	"LCM x. f" \<rightleftharpoons> "CONST Lcm (CONST range (\<lambda>x. f))"
9ca183045102 simplified syntax setup for big operators under image, retaining input abbreviations for backward compatibility haftmann parents: 68795 diff changeset	162	"LCM x\<in>A. f" \<rightleftharpoons> "CONST Lcm ((\<lambda>x. f) ` A)"
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	163
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	164	class semiring_gcd = normalization_semidom + gcd +
59008 f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	165	assumes gcd_dvd1 [iff]: "gcd a b dvd a"
59977 ad2d1cd53877 eliminated hard tabs; wenzelm parents: 59807 diff changeset	166	and gcd_dvd2 [iff]: "gcd a b dvd b"
ad2d1cd53877 eliminated hard tabs; wenzelm parents: 59807 diff changeset	167	and gcd_greatest: "c dvd a \<Longrightarrow> c dvd b \<Longrightarrow> c dvd gcd a b"
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	168	and normalize_gcd [simp]: "normalize (gcd a b) = gcd a b"
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	169	and lcm_gcd: "lcm a b = normalize (a * b div gcd a b)"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	170	begin
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	171
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	172	lemma gcd_greatest_iff [simp]: "a dvd gcd b c \<longleftrightarrow> a dvd b \<and> a dvd c"
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	173	by (blast intro!: gcd_greatest intro: dvd_trans)
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	174
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	175	lemma gcd_dvdI1: "a dvd c \<Longrightarrow> gcd a b dvd c"
60689 8a2d7c04d8c0 more cautious use of [iff] declarations haftmann parents: 60688 diff changeset	176	by (rule dvd_trans) (rule gcd_dvd1)
8a2d7c04d8c0 more cautious use of [iff] declarations haftmann parents: 60688 diff changeset	177
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	178	lemma gcd_dvdI2: "b dvd c \<Longrightarrow> gcd a b dvd c"
60689 8a2d7c04d8c0 more cautious use of [iff] declarations haftmann parents: 60688 diff changeset	179	by (rule dvd_trans) (rule gcd_dvd2)
8a2d7c04d8c0 more cautious use of [iff] declarations haftmann parents: 60688 diff changeset	180
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	181	lemma dvd_gcdD1: "a dvd gcd b c \<Longrightarrow> a dvd b"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	182	using gcd_dvd1 [of b c] by (blast intro: dvd_trans)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	183
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	184	lemma dvd_gcdD2: "a dvd gcd b c \<Longrightarrow> a dvd c"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	185	using gcd_dvd2 [of b c] by (blast intro: dvd_trans)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	186
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	187	lemma gcd_0_left [simp]: "gcd 0 a = normalize a"
60688 01488b559910 avoid explicit definition of the relation of associated elements in a ring -- prefer explicit normalization instead haftmann parents: 60687 diff changeset	188	by (rule associated_eqI) simp_all
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	189
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	190	lemma gcd_0_right [simp]: "gcd a 0 = normalize a"
60688 01488b559910 avoid explicit definition of the relation of associated elements in a ring -- prefer explicit normalization instead haftmann parents: 60687 diff changeset	191	by (rule associated_eqI) simp_all
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	192
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	193	lemma gcd_eq_0_iff [simp]: "gcd a b = 0 \<longleftrightarrow> a = 0 \<and> b = 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	194	(is "?P \<longleftrightarrow> ?Q")
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	195	proof
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	196	assume ?P
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	197	then have "0 dvd gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	198	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	199	then have "0 dvd a" and "0 dvd b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	200	by (blast intro: dvd_trans)+
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	201	then show ?Q
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	202	by simp
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	203	next
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	204	assume ?Q
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	205	then show ?P
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	206	by simp
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	207	qed
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	208
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	209	lemma unit_factor_gcd: "unit_factor (gcd a b) = (if a = 0 \<and> b = 0 then 0 else 1)"
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	210	proof (cases "gcd a b = 0")
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	211	case True
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	212	then show ?thesis by simp
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	213	next
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	214	case False
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	215	have "unit_factor (gcd a b) * normalize (gcd a b) = gcd a b"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	216	by (rule unit_factor_mult_normalize)
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	217	then have "unit_factor (gcd a b) * gcd a b = gcd a b"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	218	by simp
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	219	then have "unit_factor (gcd a b) * gcd a b div gcd a b = gcd a b div gcd a b"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	220	by simp
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	221	with False show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	222	by simp
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	223	qed
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	224
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	225	lemma is_unit_gcd_iff [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	226	"is_unit (gcd a b) \<longleftrightarrow> gcd a b = 1"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	227	by (cases "a = 0 \<and> b = 0") (auto simp: unit_factor_gcd dest: is_unit_unit_factor)
60690 a9e45c9588c3 tuned facts haftmann parents: 60689 diff changeset	228
61605 1bf7b186542e qualifier is mandatory by default; wenzelm parents: 61566 diff changeset	229	sublocale gcd: abel_semigroup gcd
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	230	proof
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	231	fix a b c
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	232	show "gcd a b = gcd b a"
60688 01488b559910 avoid explicit definition of the relation of associated elements in a ring -- prefer explicit normalization instead haftmann parents: 60687 diff changeset	233	by (rule associated_eqI) simp_all
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	234	from gcd_dvd1 have "gcd (gcd a b) c dvd a"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	235	by (rule dvd_trans) simp
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	236	moreover from gcd_dvd1 have "gcd (gcd a b) c dvd b"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	237	by (rule dvd_trans) simp
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	238	ultimately have P1: "gcd (gcd a b) c dvd gcd a (gcd b c)"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	239	by (auto intro!: gcd_greatest)
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	240	from gcd_dvd2 have "gcd a (gcd b c) dvd b"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	241	by (rule dvd_trans) simp
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	242	moreover from gcd_dvd2 have "gcd a (gcd b c) dvd c"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	243	by (rule dvd_trans) simp
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	244	ultimately have P2: "gcd a (gcd b c) dvd gcd (gcd a b) c"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	245	by (auto intro!: gcd_greatest)
60688 01488b559910 avoid explicit definition of the relation of associated elements in a ring -- prefer explicit normalization instead haftmann parents: 60687 diff changeset	246	from P1 P2 show "gcd (gcd a b) c = gcd a (gcd b c)"
01488b559910 avoid explicit definition of the relation of associated elements in a ring -- prefer explicit normalization instead haftmann parents: 60687 diff changeset	247	by (rule associated_eqI) simp_all
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	248	qed
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	249
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	250	sublocale gcd: bounded_quasi_semilattice gcd 0 1 normalize
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	251	proof
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	252	show "gcd a a = normalize a" for a
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	253	proof -
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	254	have "a dvd gcd a a"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	255	by (rule gcd_greatest) simp_all
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	256	then show ?thesis
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	257	by (auto intro: associated_eqI)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	258	qed
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	259	show "gcd (normalize a) b = gcd a b" for a b
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	260	using gcd_dvd1 [of "normalize a" b]
60688 01488b559910 avoid explicit definition of the relation of associated elements in a ring -- prefer explicit normalization instead haftmann parents: 60687 diff changeset	261	by (auto intro: associated_eqI)
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	262	show "gcd 1 a = 1" for a
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	263	by (rule associated_eqI) simp_all
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	264	qed simp_all
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	265
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	266	lemma gcd_self: "gcd a a = normalize a"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	267	by (fact gcd.idem_normalize)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	268
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	269	lemma gcd_left_idem: "gcd a (gcd a b) = gcd a b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	270	by (fact gcd.left_idem)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	271
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	272	lemma gcd_right_idem: "gcd (gcd a b) b = gcd a b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	273	by (fact gcd.right_idem)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	274
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	275	lemma gcdI:
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	276	assumes "c dvd a" and "c dvd b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	277	and greatest: "\<And>d. d dvd a \<Longrightarrow> d dvd b \<Longrightarrow> d dvd c"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	278	and "normalize c = c"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	279	shows "c = gcd a b"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	280	by (rule associated_eqI) (auto simp: assms intro: gcd_greatest)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	281
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	282	lemma gcd_unique:
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	283	"d dvd a \<and> d dvd b \<and> normalize d = d \<and> (\<forall>e. e dvd a \<and> e dvd b \<longrightarrow> e dvd d) \<longleftrightarrow> d = gcd a b"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	284	by rule (auto intro: gcdI simp: gcd_greatest)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	285
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	286	lemma gcd_dvd_prod: "gcd a b dvd k * b"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	287	using mult_dvd_mono [of 1] by auto
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	288
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	289	lemma gcd_proj2_if_dvd: "b dvd a \<Longrightarrow> gcd a b = normalize b"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	290	by (rule gcdI [symmetric]) simp_all
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	291
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	292	lemma gcd_proj1_if_dvd: "a dvd b \<Longrightarrow> gcd a b = normalize a"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	293	by (rule gcdI [symmetric]) simp_all
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	294
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	295	lemma gcd_proj1_iff: "gcd m n = normalize m \<longleftrightarrow> m dvd n"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	296	proof
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	297	assume *: "gcd m n = normalize m"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	298	show "m dvd n"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	299	proof (cases "m = 0")
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	300	case True
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	301	with * show ?thesis by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	302	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	303	case [simp]: False
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	304	from * have *: "m = gcd m n unit_factor m"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	305	by (simp add: unit_eq_div2)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	306	show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	307	by (subst **) (simp add: mult_unit_dvd_iff)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	308	qed
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	309	next
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	310	assume "m dvd n"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	311	then show "gcd m n = normalize m"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	312	by (rule gcd_proj1_if_dvd)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	313	qed
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	314
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	315	lemma gcd_proj2_iff: "gcd m n = normalize n \<longleftrightarrow> n dvd m"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	316	using gcd_proj1_iff [of n m] by (simp add: ac_simps)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	317
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	318	lemma gcd_mult_left: "gcd (c * a) (c * b) = normalize (c * gcd a b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	319	proof (cases "c = 0")
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	320	case True
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	321	then show ?thesis by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	322	next
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	323	case False
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	324	then have : "c gcd a b dvd gcd (c * a) (c * b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	325	by (auto intro: gcd_greatest)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	326	moreover from False * have "gcd (c * a) (c * b) dvd c * gcd a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	327	by (metis div_dvd_iff_mult dvd_mult_left gcd_dvd1 gcd_dvd2 gcd_greatest mult_commute)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	328	ultimately have "normalize (gcd (c * a) (c * b)) = normalize (c * gcd a b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	329	by (auto intro: associated_eqI)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	330	then show ?thesis
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	331	by (simp add: normalize_mult)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	332	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	333
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	334	lemma gcd_mult_right: "gcd (a * c) (b * c) = normalize (gcd b a * c)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	335	using gcd_mult_left [of c a b] by (simp add: ac_simps)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	336
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	337	lemma dvd_lcm1 [iff]: "a dvd lcm a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	338	by (metis div_mult_swap dvd_mult2 dvd_normalize_iff dvd_refl gcd_dvd2 lcm_gcd)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	339
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	340	lemma dvd_lcm2 [iff]: "b dvd lcm a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	341	by (metis dvd_div_mult dvd_mult dvd_normalize_iff dvd_refl gcd_dvd1 lcm_gcd)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	342
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	343	lemma dvd_lcmI1: "a dvd b \<Longrightarrow> a dvd lcm b c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	344	by (rule dvd_trans) (assumption, blast)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	345
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	346	lemma dvd_lcmI2: "a dvd c \<Longrightarrow> a dvd lcm b c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	347	by (rule dvd_trans) (assumption, blast)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	348
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	349	lemma lcm_dvdD1: "lcm a b dvd c \<Longrightarrow> a dvd c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	350	using dvd_lcm1 [of a b] by (blast intro: dvd_trans)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	351
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	352	lemma lcm_dvdD2: "lcm a b dvd c \<Longrightarrow> b dvd c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	353	using dvd_lcm2 [of a b] by (blast intro: dvd_trans)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	354
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	355	lemma lcm_least:
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	356	assumes "a dvd c" and "b dvd c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	357	shows "lcm a b dvd c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	358	proof (cases "c = 0")
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	359	case True
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	360	then show ?thesis by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	361	next
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	362	case False
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	363	then have *: "is_unit (unit_factor c)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	364	by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	365	show ?thesis
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	366	proof (cases "gcd a b = 0")
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	367	case True
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	368	with assms show ?thesis by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	369	next
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	370	case False
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	371	have "a * b dvd normalize (c * gcd a b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	372	using assms by (subst gcd_mult_left [symmetric]) (auto intro!: gcd_greatest simp: mult_ac)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	373	with False have "(a * b div gcd a b) dvd c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	374	by (subst div_dvd_iff_mult) auto
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	375	thus ?thesis by (simp add: lcm_gcd)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	376	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	377	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	378
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	379	lemma lcm_least_iff [simp]: "lcm a b dvd c \<longleftrightarrow> a dvd c \<and> b dvd c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	380	by (blast intro!: lcm_least intro: dvd_trans)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	381
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	382	lemma normalize_lcm [simp]: "normalize (lcm a b) = lcm a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	383	by (simp add: lcm_gcd dvd_normalize_div)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	384
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	385	lemma lcm_0_left [simp]: "lcm 0 a = 0"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	386	by (simp add: lcm_gcd)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	387
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	388	lemma lcm_0_right [simp]: "lcm a 0 = 0"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	389	by (simp add: lcm_gcd)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	390
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	391	lemma lcm_eq_0_iff: "lcm a b = 0 \<longleftrightarrow> a = 0 \<or> b = 0"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	392	(is "?P \<longleftrightarrow> ?Q")
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	393	proof
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	394	assume ?P
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	395	then have "0 dvd lcm a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	396	by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	397	also have "lcm a b dvd (a * b)"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	398	by simp
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	399	finally show ?Q
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	400	by auto
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	401	next
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	402	assume ?Q
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	403	then show ?P
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	404	by auto
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	405	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	406
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	407	lemma zero_eq_lcm_iff: "0 = lcm a b \<longleftrightarrow> a = 0 \<or> b = 0"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	408	using lcm_eq_0_iff[of a b] by auto
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	409
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	410	lemma lcm_eq_1_iff [simp]: "lcm a b = 1 \<longleftrightarrow> is_unit a \<and> is_unit b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	411	by (auto intro: associated_eqI)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	412
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	413	lemma unit_factor_lcm: "unit_factor (lcm a b) = (if a = 0 \<or> b = 0 then 0 else 1)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	414	using lcm_eq_0_iff[of a b] by (cases "lcm a b = 0") (auto simp: lcm_gcd)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	415
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	416	sublocale lcm: abel_semigroup lcm
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	417	proof
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	418	fix a b c
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	419	show "lcm a b = lcm b a"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	420	by (simp add: lcm_gcd ac_simps normalize_mult dvd_normalize_div)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	421	have "lcm (lcm a b) c dvd lcm a (lcm b c)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	422	and "lcm a (lcm b c) dvd lcm (lcm a b) c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	423	by (auto intro: lcm_least
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	424	dvd_trans [of b "lcm b c" "lcm a (lcm b c)"]
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	425	dvd_trans [of c "lcm b c" "lcm a (lcm b c)"]
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	426	dvd_trans [of a "lcm a b" "lcm (lcm a b) c"]
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	427	dvd_trans [of b "lcm a b" "lcm (lcm a b) c"])
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	428	then show "lcm (lcm a b) c = lcm a (lcm b c)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	429	by (rule associated_eqI) simp_all
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	430	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	431
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	432	sublocale lcm: bounded_quasi_semilattice lcm 1 0 normalize
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	433	proof
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	434	show "lcm a a = normalize a" for a
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	435	proof -
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	436	have "lcm a a dvd a"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	437	by (rule lcm_least) simp_all
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	438	then show ?thesis
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	439	by (auto intro: associated_eqI)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	440	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	441	show "lcm (normalize a) b = lcm a b" for a b
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	442	using dvd_lcm1 [of "normalize a" b] unfolding normalize_dvd_iff
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	443	by (auto intro: associated_eqI)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	444	show "lcm 1 a = normalize a" for a
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	445	by (rule associated_eqI) simp_all
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	446	qed simp_all
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	447
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	448	lemma lcm_self: "lcm a a = normalize a"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	449	by (fact lcm.idem_normalize)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	450
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	451	lemma lcm_left_idem: "lcm a (lcm a b) = lcm a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	452	by (fact lcm.left_idem)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	453
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	454	lemma lcm_right_idem: "lcm (lcm a b) b = lcm a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	455	by (fact lcm.right_idem)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	456
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	457	lemma gcd_lcm:
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	458	assumes "a \<noteq> 0" and "b \<noteq> 0"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	459	shows "gcd a b = normalize (a * b div lcm a b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	460	proof -
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	461	from assms have [simp]: "a * b div gcd a b \<noteq> 0"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	462	by (subst dvd_div_eq_0_iff) auto
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	463	let ?u = "unit_factor (a * b div gcd a b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	464	have "gcd a b * normalize (a * b div gcd a b) =
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	465	gcd a b * ((a * b div gcd a b) * (1 div ?u))"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	466	by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	467	also have "\<dots> = a * b div ?u"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	468	by (subst mult.assoc [symmetric]) auto
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	469	also have "\<dots> dvd a * b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	470	by (subst div_unit_dvd_iff) auto
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	471	finally have "gcd a b dvd ((a * b) div lcm a b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	472	by (intro dvd_mult_imp_div) (auto simp: lcm_gcd)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	473	moreover have "a * b div lcm a b dvd a" and "a * b div lcm a b dvd b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	474	using assms by (subst div_dvd_iff_mult; simp add: lcm_eq_0_iff mult.commute[of b "lcm a b"])+
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	475	ultimately have "normalize (gcd a b) = normalize (a * b div lcm a b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	476	apply -
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	477	apply (rule associated_eqI)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	478	using assms
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	479	apply (auto simp: div_dvd_iff_mult zero_eq_lcm_iff)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	480	done
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	481	thus ?thesis by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	482	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	483
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	484	lemma lcm_1_left: "lcm 1 a = normalize a"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	485	by (fact lcm.top_left_normalize)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	486
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	487	lemma lcm_1_right: "lcm a 1 = normalize a"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	488	by (fact lcm.top_right_normalize)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	489
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	490	lemma lcm_mult_left: "lcm (c * a) (c * b) = normalize (c * lcm a b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	491	proof (cases "c = 0")
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	492	case True
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	493	then show ?thesis by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	494	next
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	495	case False
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	496	then have : "lcm (c a) (c * b) dvd c * lcm a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	497	by (auto intro: lcm_least)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	498	moreover have "lcm a b dvd lcm (c * a) (c * b) div c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	499	by (intro lcm_least) (auto intro!: dvd_mult_imp_div simp: mult_ac)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	500	hence "c * lcm a b dvd lcm (c * a) (c * b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	501	using False by (subst (asm) dvd_div_iff_mult) (auto simp: mult_ac intro: dvd_lcmI1)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	502	ultimately have "normalize (lcm (c * a) (c * b)) = normalize (c * lcm a b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	503	by (auto intro: associated_eqI)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	504	then show ?thesis
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	505	by (simp add: normalize_mult)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	506	qed
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	507
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	508	lemma lcm_mult_right: "lcm (a * c) (b * c) = normalize (lcm b a * c)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	509	using lcm_mult_left [of c a b] by (simp add: ac_simps)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	510
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	511	lemma lcm_mult_unit1: "is_unit a \<Longrightarrow> lcm (b * a) c = lcm b c"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	512	by (rule associated_eqI) (simp_all add: mult_unit_dvd_iff dvd_lcmI1)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	513
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	514	lemma lcm_mult_unit2: "is_unit a \<Longrightarrow> lcm b (c * a) = lcm b c"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	515	using lcm_mult_unit1 [of a c b] by (simp add: ac_simps)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	516
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	517	lemma lcm_div_unit1:
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	518	"is_unit a \<Longrightarrow> lcm (b div a) c = lcm b c"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	519	by (erule is_unitE [of _ b]) (simp add: lcm_mult_unit1)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	520
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	521	lemma lcm_div_unit2: "is_unit a \<Longrightarrow> lcm b (c div a) = lcm b c"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	522	by (erule is_unitE [of _ c]) (simp add: lcm_mult_unit2)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	523
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	524	lemma normalize_lcm_left: "lcm (normalize a) b = lcm a b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	525	by (fact lcm.normalize_left_idem)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	526
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	527	lemma normalize_lcm_right: "lcm a (normalize b) = lcm a b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	528	by (fact lcm.normalize_right_idem)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	529
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	530	lemma comp_fun_idem_gcd: "comp_fun_idem gcd"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	531	by standard (simp_all add: fun_eq_iff ac_simps)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	532
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	533	lemma comp_fun_idem_lcm: "comp_fun_idem lcm"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	534	by standard (simp_all add: fun_eq_iff ac_simps)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	535
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	536	lemma gcd_dvd_antisym: "gcd a b dvd gcd c d \<Longrightarrow> gcd c d dvd gcd a b \<Longrightarrow> gcd a b = gcd c d"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	537	proof (rule gcdI)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	538	assume *: "gcd a b dvd gcd c d"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	539	and **: "gcd c d dvd gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	540	have "gcd c d dvd c"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	541	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	542	with * show "gcd a b dvd c"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	543	by (rule dvd_trans)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	544	have "gcd c d dvd d"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	545	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	546	with * show "gcd a b dvd d"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	547	by (rule dvd_trans)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	548	show "normalize (gcd a b) = gcd a b"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	549	by simp
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	550	fix l assume "l dvd c" and "l dvd d"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	551	then have "l dvd gcd c d"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	552	by (rule gcd_greatest)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	553	from this and ** show "l dvd gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	554	by (rule dvd_trans)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	555	qed
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	556
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	557	declare unit_factor_lcm [simp]
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	558
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	559	lemma lcmI:
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	560	assumes "a dvd c" and "b dvd c" and "\<And>d. a dvd d \<Longrightarrow> b dvd d \<Longrightarrow> c dvd d"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	561	and "normalize c = c"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	562	shows "c = lcm a b"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	563	by (rule associated_eqI) (auto simp: assms intro: lcm_least)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	564
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	565	lemma gcd_dvd_lcm [simp]: "gcd a b dvd lcm a b"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	566	using gcd_dvd2 by (rule dvd_lcmI2)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	567
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	568	lemmas lcm_0 = lcm_0_right
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	569
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	570	lemma lcm_unique:
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	571	"a dvd d \<and> b dvd d \<and> normalize d = d \<and> (\<forall>e. a dvd e \<and> b dvd e \<longrightarrow> d dvd e) \<longleftrightarrow> d = lcm a b"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	572	by rule (auto intro: lcmI simp: lcm_least lcm_eq_0_iff)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	573
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	574	lemma lcm_proj1_if_dvd:
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	575	assumes "b dvd a" shows "lcm a b = normalize a"
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	576	proof -
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	577	have "normalize (lcm a b) = normalize a"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	578	by (rule associatedI) (use assms in auto)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	579	thus ?thesis by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	580	qed
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	581
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	582	lemma lcm_proj2_if_dvd: "a dvd b \<Longrightarrow> lcm a b = normalize b"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	583	using lcm_proj1_if_dvd [of a b] by (simp add: ac_simps)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	584
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	585	lemma lcm_proj1_iff: "lcm m n = normalize m \<longleftrightarrow> n dvd m"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	586	proof
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	587	assume *: "lcm m n = normalize m"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	588	show "n dvd m"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	589	proof (cases "m = 0")
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	590	case True
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	591	then show ?thesis by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	592	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	593	case [simp]: False
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	594	from * have *: "m = lcm m n unit_factor m"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	595	by (simp add: unit_eq_div2)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	596	show ?thesis by (subst **) simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	597	qed
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	598	next
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	599	assume "n dvd m"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	600	then show "lcm m n = normalize m"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	601	by (rule lcm_proj1_if_dvd)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	602	qed
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	603
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	604	lemma lcm_proj2_iff: "lcm m n = normalize n \<longleftrightarrow> m dvd n"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	605	using lcm_proj1_iff [of n m] by (simp add: ac_simps)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	606
69785 9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	607	lemma gcd_mono: "a dvd c \<Longrightarrow> b dvd d \<Longrightarrow> gcd a b dvd gcd c d"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	608	by (simp add: gcd_dvdI1 gcd_dvdI2)
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	609
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	610	lemma lcm_mono: "a dvd c \<Longrightarrow> b dvd d \<Longrightarrow> lcm a b dvd lcm c d"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	611	by (simp add: dvd_lcmI1 dvd_lcmI2)
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	612
63924 f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	613	lemma dvd_productE:
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	614	assumes "p dvd a * b"
63924 f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	615	obtains x y where "p = x * y" "x dvd a" "y dvd b"
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	616	proof (cases "a = 0")
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	617	case True
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	618	thus ?thesis by (intro that[of p 1]) simp_all
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	619	next
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	620	case False
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	621	define x y where "x = gcd a p" and "y = p div x"
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	622	have "p = x * y" by (simp add: x_def y_def)
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	623	moreover have "x dvd a" by (simp add: x_def)
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	624	moreover from assms have "p dvd gcd (b * a) (b * p)"
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	625	by (intro gcd_greatest) (simp_all add: mult.commute)
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	626	hence "p dvd b * gcd a p" by (subst (asm) gcd_mult_left) auto
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	627	with False have "y dvd b"
63924 f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	628	by (simp add: x_def y_def div_dvd_iff_mult assms)
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	629	ultimately show ?thesis by (rule that)
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	630	qed
f91766530e13 more generic algebraic lemmas haftmann parents: 63915 diff changeset	631
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	632	lemma gcd_mult_unit1:
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	633	assumes "is_unit a" shows "gcd (b * a) c = gcd b c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	634	proof -
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	635	have "gcd (b * a) c dvd b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	636	using assms dvd_mult_unit_iff by blast
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	637	then show ?thesis
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	638	by (rule gcdI) simp_all
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	639	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	640
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	641	lemma gcd_mult_unit2: "is_unit a \<Longrightarrow> gcd b (c * a) = gcd b c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	642	using gcd.commute gcd_mult_unit1 by auto
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	643
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	644	lemma gcd_div_unit1: "is_unit a \<Longrightarrow> gcd (b div a) c = gcd b c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	645	by (erule is_unitE [of _ b]) (simp add: gcd_mult_unit1)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	646
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	647	lemma gcd_div_unit2: "is_unit a \<Longrightarrow> gcd b (c div a) = gcd b c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	648	by (erule is_unitE [of _ c]) (simp add: gcd_mult_unit2)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	649
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	650	lemma normalize_gcd_left: "gcd (normalize a) b = gcd a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	651	by (fact gcd.normalize_left_idem)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	652
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	653	lemma normalize_gcd_right: "gcd a (normalize b) = gcd a b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	654	by (fact gcd.normalize_right_idem)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	655
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	656	lemma gcd_add1 [simp]: "gcd (m + n) n = gcd m n"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	657	by (rule gcdI [symmetric]) (simp_all add: dvd_add_left_iff)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	658
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	659	lemma gcd_add2 [simp]: "gcd m (m + n) = gcd m n"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	660	using gcd_add1 [of n m] by (simp add: ac_simps)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	661
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	662	lemma gcd_add_mult: "gcd m (k * m + n) = gcd m n"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	663	by (rule gcdI [symmetric]) (simp_all add: dvd_add_right_iff)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	664
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	665	end
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	666
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	667	class ring_gcd = comm_ring_1 + semiring_gcd
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	668	begin
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	669
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	670	lemma gcd_neg1 [simp]: "gcd (-a) b = gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	671	by (rule sym, rule gcdI) (simp_all add: gcd_greatest)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	672
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	673	lemma gcd_neg2 [simp]: "gcd a (-b) = gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	674	by (rule sym, rule gcdI) (simp_all add: gcd_greatest)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	675
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	676	lemma gcd_neg_numeral_1 [simp]: "gcd (- numeral n) a = gcd (numeral n) a"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	677	by (fact gcd_neg1)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	678
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	679	lemma gcd_neg_numeral_2 [simp]: "gcd a (- numeral n) = gcd a (numeral n)"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	680	by (fact gcd_neg2)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	681
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	682	lemma gcd_diff1: "gcd (m - n) n = gcd m n"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	683	by (subst diff_conv_add_uminus, subst gcd_neg2[symmetric], subst gcd_add1, simp)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	684
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	685	lemma gcd_diff2: "gcd (n - m) n = gcd m n"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	686	by (subst gcd_neg1[symmetric]) (simp only: minus_diff_eq gcd_diff1)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	687
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	688	lemma lcm_neg1 [simp]: "lcm (-a) b = lcm a b"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	689	by (rule sym, rule lcmI) (simp_all add: lcm_least lcm_eq_0_iff)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	690
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	691	lemma lcm_neg2 [simp]: "lcm a (-b) = lcm a b"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	692	by (rule sym, rule lcmI) (simp_all add: lcm_least lcm_eq_0_iff)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	693
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	694	lemma lcm_neg_numeral_1 [simp]: "lcm (- numeral n) a = lcm (numeral n) a"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	695	by (fact lcm_neg1)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	696
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	697	lemma lcm_neg_numeral_2 [simp]: "lcm a (- numeral n) = lcm a (numeral n)"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	698	by (fact lcm_neg2)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	699
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	700	end
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	701
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	702	class semiring_Gcd = semiring_gcd + Gcd +
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	703	assumes Gcd_dvd: "a \<in> A \<Longrightarrow> Gcd A dvd a"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	704	and Gcd_greatest: "(\<And>b. b \<in> A \<Longrightarrow> a dvd b) \<Longrightarrow> a dvd Gcd A"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	705	and normalize_Gcd [simp]: "normalize (Gcd A) = Gcd A"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	706	assumes dvd_Lcm: "a \<in> A \<Longrightarrow> a dvd Lcm A"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	707	and Lcm_least: "(\<And>b. b \<in> A \<Longrightarrow> b dvd a) \<Longrightarrow> Lcm A dvd a"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	708	and normalize_Lcm [simp]: "normalize (Lcm A) = Lcm A"
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	709	begin
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	710
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	711	lemma Lcm_Gcd: "Lcm A = Gcd {b. \<forall>a\<in>A. a dvd b}"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	712	by (rule associated_eqI) (auto intro: Gcd_dvd dvd_Lcm Gcd_greatest Lcm_least)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	713
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	714	lemma Gcd_Lcm: "Gcd A = Lcm {b. \<forall>a\<in>A. b dvd a}"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	715	by (rule associated_eqI) (auto intro: Gcd_dvd dvd_Lcm Gcd_greatest Lcm_least)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	716
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	717	lemma Gcd_empty [simp]: "Gcd {} = 0"
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	718	by (rule dvd_0_left, rule Gcd_greatest) simp
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	719
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	720	lemma Lcm_empty [simp]: "Lcm {} = 1"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	721	by (auto intro: associated_eqI Lcm_least)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	722
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	723	lemma Gcd_insert [simp]: "Gcd (insert a A) = gcd a (Gcd A)"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	724	proof -
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	725	have "Gcd (insert a A) dvd gcd a (Gcd A)"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	726	by (auto intro: Gcd_dvd Gcd_greatest)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	727	moreover have "gcd a (Gcd A) dvd Gcd (insert a A)"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	728	proof (rule Gcd_greatest)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	729	fix b
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	730	assume "b \<in> insert a A"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	731	then show "gcd a (Gcd A) dvd b"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	732	proof
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	733	assume "b = a"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	734	then show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	735	by simp
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	736	next
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	737	assume "b \<in> A"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	738	then have "Gcd A dvd b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	739	by (rule Gcd_dvd)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	740	moreover have "gcd a (Gcd A) dvd Gcd A"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	741	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	742	ultimately show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	743	by (blast intro: dvd_trans)
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	744	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	745	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	746	ultimately show ?thesis
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	747	by (auto intro: associated_eqI)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	748	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	749
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	750	lemma Lcm_insert [simp]: "Lcm (insert a A) = lcm a (Lcm A)"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	751	proof (rule sym)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	752	have "lcm a (Lcm A) dvd Lcm (insert a A)"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	753	by (auto intro: dvd_Lcm Lcm_least)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	754	moreover have "Lcm (insert a A) dvd lcm a (Lcm A)"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	755	proof (rule Lcm_least)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	756	fix b
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	757	assume "b \<in> insert a A"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	758	then show "b dvd lcm a (Lcm A)"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	759	proof
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	760	assume "b = a"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	761	then show ?thesis by simp
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	762	next
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	763	assume "b \<in> A"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	764	then have "b dvd Lcm A"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	765	by (rule dvd_Lcm)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	766	moreover have "Lcm A dvd lcm a (Lcm A)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	767	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	768	ultimately show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	769	by (blast intro: dvd_trans)
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	770	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	771	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	772	ultimately show "lcm a (Lcm A) = Lcm (insert a A)"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	773	by (rule associated_eqI) (simp_all add: lcm_eq_0_iff)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	774	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	775
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	776	lemma LcmI:
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	777	assumes "\<And>a. a \<in> A \<Longrightarrow> a dvd b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	778	and "\<And>c. (\<And>a. a \<in> A \<Longrightarrow> a dvd c) \<Longrightarrow> b dvd c"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	779	and "normalize b = b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	780	shows "b = Lcm A"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	781	by (rule associated_eqI) (auto simp: assms dvd_Lcm intro: Lcm_least)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	782
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	783	lemma Lcm_subset: "A \<subseteq> B \<Longrightarrow> Lcm A dvd Lcm B"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	784	by (blast intro: Lcm_least dvd_Lcm)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	785
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	786	lemma Lcm_Un: "Lcm (A \<union> B) = lcm (Lcm A) (Lcm B)"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	787	proof -
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	788	have "\<And>d. \<lbrakk>Lcm A dvd d; Lcm B dvd d\<rbrakk> \<Longrightarrow> Lcm (A \<union> B) dvd d"
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	789	by (meson UnE Lcm_least dvd_Lcm dvd_trans)
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	790	then show ?thesis
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	791	by (meson Lcm_subset lcm_unique normalize_Lcm sup.cobounded1 sup.cobounded2)
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	792	qed
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	793
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	794	lemma Gcd_0_iff [simp]: "Gcd A = 0 \<longleftrightarrow> A \<subseteq> {0}"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	795	(is "?P \<longleftrightarrow> ?Q")
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	796	proof
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	797	assume ?P
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	798	show ?Q
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	799	proof
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	800	fix a
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	801	assume "a \<in> A"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	802	then have "Gcd A dvd a"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	803	by (rule Gcd_dvd)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	804	with \<open>?P\<close> have "a = 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	805	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	806	then show "a \<in> {0}"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	807	by simp
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	808	qed
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	809	next
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	810	assume ?Q
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	811	have "0 dvd Gcd A"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	812	proof (rule Gcd_greatest)
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	813	fix a
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	814	assume "a \<in> A"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	815	with \<open>?Q\<close> have "a = 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	816	by auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	817	then show "0 dvd a"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	818	by simp
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	819	qed
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	820	then show ?P
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	821	by simp
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	822	qed
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	823
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	824	lemma Lcm_1_iff [simp]: "Lcm A = 1 \<longleftrightarrow> (\<forall>a\<in>A. is_unit a)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	825	(is "?P \<longleftrightarrow> ?Q")
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	826	proof
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	827	assume ?P
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	828	show ?Q
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	829	proof
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	830	fix a
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	831	assume "a \<in> A"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	832	then have "a dvd Lcm A"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	833	by (rule dvd_Lcm)
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	834	with \<open>?P\<close> show "is_unit a"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	835	by simp
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	836	qed
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	837	next
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	838	assume ?Q
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	839	then have "is_unit (Lcm A)"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	840	by (blast intro: Lcm_least)
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	841	then have "normalize (Lcm A) = 1"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	842	by (rule is_unit_normalize)
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	843	then show ?P
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	844	by simp
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	845	qed
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	846
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	847	lemma unit_factor_Lcm: "unit_factor (Lcm A) = (if Lcm A = 0 then 0 else 1)"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	848	proof (cases "Lcm A = 0")
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	849	case True
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	850	then show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	851	by simp
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	852	next
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	853	case False
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	854	with unit_factor_normalize have "unit_factor (normalize (Lcm A)) = 1"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	855	by blast
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	856	with False show ?thesis
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	857	by simp
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	858	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	859
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	860	lemma unit_factor_Gcd: "unit_factor (Gcd A) = (if Gcd A = 0 then 0 else 1)"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	861	by (simp add: Gcd_Lcm unit_factor_Lcm)
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	862
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	863	lemma GcdI:
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	864	assumes "\<And>a. a \<in> A \<Longrightarrow> b dvd a"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	865	and "\<And>c. (\<And>a. a \<in> A \<Longrightarrow> c dvd a) \<Longrightarrow> c dvd b"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	866	and "normalize b = b"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	867	shows "b = Gcd A"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	868	by (rule associated_eqI) (auto simp: assms Gcd_dvd intro: Gcd_greatest)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	869
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	870	lemma Gcd_eq_1_I:
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	871	assumes "is_unit a" and "a \<in> A"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	872	shows "Gcd A = 1"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	873	proof -
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	874	from assms have "is_unit (Gcd A)"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	875	by (blast intro: Gcd_dvd dvd_unit_imp_unit)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	876	then have "normalize (Gcd A) = 1"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	877	by (rule is_unit_normalize)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	878	then show ?thesis
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	879	by simp
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	880	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	881
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	882	lemma Lcm_eq_0_I:
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	883	assumes "0 \<in> A"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	884	shows "Lcm A = 0"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	885	proof -
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	886	from assms have "0 dvd Lcm A"
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	887	by (rule dvd_Lcm)
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	888	then show ?thesis
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	889	by simp
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	890	qed
ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	891
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	892	lemma Gcd_UNIV [simp]: "Gcd UNIV = 1"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	893	using dvd_refl by (rule Gcd_eq_1_I) simp
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	894
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	895	lemma Lcm_UNIV [simp]: "Lcm UNIV = 0"
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	896	by (rule Lcm_eq_0_I) simp
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	897
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	898	lemma Lcm_0_iff:
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	899	assumes "finite A"
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	900	shows "Lcm A = 0 \<longleftrightarrow> 0 \<in> A"
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	901	proof (cases "A = {}")
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	902	case True
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	903	then show ?thesis by simp
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	904	next
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	905	case False
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	906	with assms show ?thesis
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	907	by (induct A rule: finite_ne_induct) (auto simp: lcm_eq_0_iff)
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	908	qed
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	909
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	910	lemma Gcd_image_normalize [simp]: "Gcd (normalize ` A) = Gcd A"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	911	proof -
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	912	have "Gcd (normalize ` A) dvd a" if "a \<in> A" for a
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	913	proof -
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	914	from that obtain B where "A = insert a B"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	915	by blast
62350 66a381d3f88f more sophisticated GCD syntax haftmann parents: 62349 diff changeset	916	moreover have "gcd (normalize a) (Gcd (normalize ` B)) dvd normalize a"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	917	by (rule gcd_dvd1)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	918	ultimately show "Gcd (normalize ` A) dvd a"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	919	by simp
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	920	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	921	then have "Gcd (normalize ` A) dvd Gcd A" and "Gcd A dvd Gcd (normalize ` A)"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	922	by (auto intro!: Gcd_greatest intro: Gcd_dvd)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	923	then show ?thesis
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	924	by (auto intro: associated_eqI)
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	925	qed
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	926
62346 97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	927	lemma Gcd_eqI:
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	928	assumes "normalize a = a"
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	929	assumes "\<And>b. b \<in> A \<Longrightarrow> a dvd b"
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	930	and "\<And>c. (\<And>b. b \<in> A \<Longrightarrow> c dvd b) \<Longrightarrow> c dvd a"
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	931	shows "Gcd A = a"
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	932	using assms by (blast intro: associated_eqI Gcd_greatest Gcd_dvd normalize_Gcd)
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	933
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	934	lemma dvd_GcdD: "x dvd Gcd A \<Longrightarrow> y \<in> A \<Longrightarrow> x dvd y"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	935	using Gcd_dvd dvd_trans by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	936
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	937	lemma dvd_Gcd_iff: "x dvd Gcd A \<longleftrightarrow> (\<forall>y\<in>A. x dvd y)"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	938	by (blast dest: dvd_GcdD intro: Gcd_greatest)
99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	939
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	940	lemma Gcd_mult: "Gcd (() c ` A) = normalize (c Gcd A)"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	941	proof (cases "c = 0")
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	942	case True
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	943	then show ?thesis by auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	944	next
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	945	case [simp]: False
69064 5840724b1d71 Prefix form of infix with * on either side no longer needs special treatment nipkow parents: 69038 diff changeset	946	have "Gcd ((*) c ` A) div c dvd Gcd A"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	947	by (intro Gcd_greatest, subst div_dvd_iff_mult)
99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	948	(auto intro!: Gcd_greatest Gcd_dvd simp: mult.commute[of _ c])
69064 5840724b1d71 Prefix form of infix with * on either side no longer needs special treatment nipkow parents: 69038 diff changeset	949	then have "Gcd (() c ` A) dvd c Gcd A"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	950	by (subst (asm) div_dvd_iff_mult) (auto intro: Gcd_greatest simp: mult_ac)
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	951	moreover have "c * Gcd A dvd Gcd ((*) c ` A)"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	952	by (intro Gcd_greatest) (auto intro: mult_dvd_mono Gcd_dvd)
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	953	ultimately have "normalize (Gcd (() c ` A)) = normalize (c Gcd A)"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	954	by (rule associatedI)
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	955	then show ?thesis by simp
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	956	qed
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	957
62346 97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	958	lemma Lcm_eqI:
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	959	assumes "normalize a = a"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	960	and "\<And>b. b \<in> A \<Longrightarrow> b dvd a"
62346 97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	961	and "\<And>c. (\<And>b. b \<in> A \<Longrightarrow> b dvd c) \<Longrightarrow> a dvd c"
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	962	shows "Lcm A = a"
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	963	using assms by (blast intro: associated_eqI Lcm_least dvd_Lcm normalize_Lcm)
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	964
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	965	lemma Lcm_dvdD: "Lcm A dvd x \<Longrightarrow> y \<in> A \<Longrightarrow> y dvd x"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	966	using dvd_Lcm dvd_trans by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	967
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	968	lemma Lcm_dvd_iff: "Lcm A dvd x \<longleftrightarrow> (\<forall>y\<in>A. y dvd x)"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	969	by (blast dest: Lcm_dvdD intro: Lcm_least)
99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	970
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	971	lemma Lcm_mult:
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	972	assumes "A \<noteq> {}"
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	973	shows "Lcm (() c ` A) = normalize (c Lcm A)"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	974	proof (cases "c = 0")
99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	975	case True
69064 5840724b1d71 Prefix form of infix with * on either side no longer needs special treatment nipkow parents: 69038 diff changeset	976	with assms have "(*) c ` A = {0}"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	977	by auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	978	with True show ?thesis by auto
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	979	next
99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	980	case [simp]: False
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	981	from assms obtain x where x: "x \<in> A"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	982	by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	983	have "c dvd c * x"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	984	by simp
69064 5840724b1d71 Prefix form of infix with * on either side no longer needs special treatment nipkow parents: 69038 diff changeset	985	also from x have "c * x dvd Lcm ((*) c ` A)"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	986	by (intro dvd_Lcm) auto
69064 5840724b1d71 Prefix form of infix with * on either side no longer needs special treatment nipkow parents: 69038 diff changeset	987	finally have dvd: "c dvd Lcm ((*) c ` A)" .
69768 7e4966eaf781 proper congruence rule for image operator haftmann parents: 69593 diff changeset	988	moreover have "Lcm A dvd Lcm ((*) c ` A) div c"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	989	by (intro Lcm_least dvd_mult_imp_div)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	990	(auto intro!: Lcm_least dvd_Lcm simp: mult.commute[of _ c])
69768 7e4966eaf781 proper congruence rule for image operator haftmann parents: 69593 diff changeset	991	ultimately have "c * Lcm A dvd Lcm ((*) c ` A)"
7e4966eaf781 proper congruence rule for image operator haftmann parents: 69593 diff changeset	992	by auto
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	993	moreover have "Lcm (() c ` A) dvd c Lcm A"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	994	by (intro Lcm_least) (auto intro: mult_dvd_mono dvd_Lcm)
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	995	ultimately have "normalize (c * Lcm A) = normalize (Lcm ((*) c ` A))"
63359 99b51ba8da1c More lemmas on Gcd/Lcm Manuel Eberl <eberlm@in.tum.de> parents: 63145 diff changeset	996	by (rule associatedI)
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	997	then show ?thesis by simp
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	998	qed
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	999
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1000	lemma Lcm_no_units: "Lcm A = Lcm (A - {a. is_unit a})"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1001	proof -
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1002	have "(A - {a. is_unit a}) \<union> {a\<in>A. is_unit a} = A"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1003	by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1004	then have "Lcm A = lcm (Lcm (A - {a. is_unit a})) (Lcm {a\<in>A. is_unit a})"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1005	by (simp add: Lcm_Un [symmetric])
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1006	also have "Lcm {a\<in>A. is_unit a} = 1"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1007	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1008	finally show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1009	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1010	qed
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1011
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1012	lemma Lcm_0_iff': "Lcm A = 0 \<longleftrightarrow> (\<nexists>l. l \<noteq> 0 \<and> (\<forall>a\<in>A. a dvd l))"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1013	by (metis Lcm_least dvd_0_left dvd_Lcm)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1014
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1015	lemma Lcm_no_multiple: "(\<forall>m. m \<noteq> 0 \<longrightarrow> (\<exists>a\<in>A. \<not> a dvd m)) \<Longrightarrow> Lcm A = 0"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1016	by (auto simp: Lcm_0_iff')
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1017
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1018	lemma Lcm_singleton [simp]: "Lcm {a} = normalize a"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1019	by simp
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1020
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1021	lemma Lcm_2 [simp]: "Lcm {a, b} = lcm a b"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1022	by simp
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1023
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1024	lemma Gcd_1: "1 \<in> A \<Longrightarrow> Gcd A = 1"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1025	by (auto intro!: Gcd_eq_1_I)
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1026
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1027	lemma Gcd_singleton [simp]: "Gcd {a} = normalize a"
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1028	by simp
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1029
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1030	lemma Gcd_2 [simp]: "Gcd {a, b} = gcd a b"
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1031	by simp
25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	1032
69785 9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1033	lemma Gcd_mono:
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1034	assumes "\<And>x. x \<in> A \<Longrightarrow> f x dvd g x"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1035	shows "(GCD x\<in>A. f x) dvd (GCD x\<in>A. g x)"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1036	proof (intro Gcd_greatest, safe)
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1037	fix x assume "x \<in> A"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1038	hence "(GCD x\<in>A. f x) dvd f x"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1039	by (intro Gcd_dvd) auto
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1040	also have "f x dvd g x"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1041	using \<open>x \<in> A\<close> assms by blast
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1042	finally show "(GCD x\<in>A. f x) dvd \<dots>" .
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1043	qed
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1044
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1045	lemma Lcm_mono:
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1046	assumes "\<And>x. x \<in> A \<Longrightarrow> f x dvd g x"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1047	shows "(LCM x\<in>A. f x) dvd (LCM x\<in>A. g x)"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1048	proof (intro Lcm_least, safe)
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1049	fix x assume "x \<in> A"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1050	hence "f x dvd g x" by (rule assms)
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1051	also have "g x dvd (LCM x\<in>A. g x)"
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1052	using \<open>x \<in> A\<close> by (intro dvd_Lcm) auto
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1053	finally show "f x dvd \<dots>" .
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1054	qed
9e326f6f8a24 More material for HOL-Number_Theory: ord, Carmichael's function, primitive roots Manuel Eberl <eberlm@in.tum.de> parents: 69768 diff changeset	1055
62350 66a381d3f88f more sophisticated GCD syntax haftmann parents: 62349 diff changeset	1056	end
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	1057
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	1058
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1059	subsection \<open>An aside: GCD and LCM on finite sets for incomplete gcd rings\<close>
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1060
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1061	context semiring_gcd
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1062	begin
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1063
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1064	sublocale Gcd_fin: bounded_quasi_semilattice_set gcd 0 1 normalize
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1065	defines
69038 2ce9bc515a64 more standard syntax nipkow parents: 68796 diff changeset	1066	Gcd_fin ("Gcd\<^sub>f\<^sub>i\<^sub>n") = "Gcd_fin.F :: 'a set \<Rightarrow> 'a" ..
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1067
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1068	abbreviation gcd_list :: "'a list \<Rightarrow> 'a"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1069	where "gcd_list xs \<equiv> Gcd\<^sub>f\<^sub>i\<^sub>n (set xs)"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1070
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1071	sublocale Lcm_fin: bounded_quasi_semilattice_set lcm 1 0 normalize
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1072	defines
69038 2ce9bc515a64 more standard syntax nipkow parents: 68796 diff changeset	1073	Lcm_fin ("Lcm\<^sub>f\<^sub>i\<^sub>n") = Lcm_fin.F ..
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1074
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1075	abbreviation lcm_list :: "'a list \<Rightarrow> 'a"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1076	where "lcm_list xs \<equiv> Lcm\<^sub>f\<^sub>i\<^sub>n (set xs)"
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	1077
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1078	lemma Gcd_fin_dvd:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1079	"a \<in> A \<Longrightarrow> Gcd\<^sub>f\<^sub>i\<^sub>n A dvd a"
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	1080	by (induct A rule: infinite_finite_induct)
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1081	(auto intro: dvd_trans)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1082
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1083	lemma dvd_Lcm_fin:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1084	"a \<in> A \<Longrightarrow> a dvd Lcm\<^sub>f\<^sub>i\<^sub>n A"
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	1085	by (induct A rule: infinite_finite_induct)
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1086	(auto intro: dvd_trans)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1087
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1088	lemma Gcd_fin_greatest:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1089	"a dvd Gcd\<^sub>f\<^sub>i\<^sub>n A" if "finite A" and "\<And>b. b \<in> A \<Longrightarrow> a dvd b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1090	using that by (induct A) simp_all
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1091
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1092	lemma Lcm_fin_least:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1093	"Lcm\<^sub>f\<^sub>i\<^sub>n A dvd a" if "finite A" and "\<And>b. b \<in> A \<Longrightarrow> b dvd a"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1094	using that by (induct A) simp_all
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1095
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1096	lemma gcd_list_greatest:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1097	"a dvd gcd_list bs" if "\<And>b. b \<in> set bs \<Longrightarrow> a dvd b"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1098	by (rule Gcd_fin_greatest) (simp_all add: that)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1099
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1100	lemma lcm_list_least:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1101	"lcm_list bs dvd a" if "\<And>b. b \<in> set bs \<Longrightarrow> b dvd a"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1102	by (rule Lcm_fin_least) (simp_all add: that)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1103
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1104	lemma dvd_Gcd_fin_iff:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1105	"b dvd Gcd\<^sub>f\<^sub>i\<^sub>n A \<longleftrightarrow> (\<forall>a\<in>A. b dvd a)" if "finite A"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1106	using that by (auto intro: Gcd_fin_greatest Gcd_fin_dvd dvd_trans [of b "Gcd\<^sub>f\<^sub>i\<^sub>n A"])
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1107
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1108	lemma dvd_gcd_list_iff:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1109	"b dvd gcd_list xs \<longleftrightarrow> (\<forall>a\<in>set xs. b dvd a)"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1110	by (simp add: dvd_Gcd_fin_iff)
65552 f533820e7248 theories "GCD" and "Binomial" are already included in "Main": this avoids improper imports in applications; wenzelm parents: 64850 diff changeset	1111
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1112	lemma Lcm_fin_dvd_iff:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1113	"Lcm\<^sub>f\<^sub>i\<^sub>n A dvd b \<longleftrightarrow> (\<forall>a\<in>A. a dvd b)" if "finite A"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1114	using that by (auto intro: Lcm_fin_least dvd_Lcm_fin dvd_trans [of _ "Lcm\<^sub>f\<^sub>i\<^sub>n A" b])
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1115
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1116	lemma lcm_list_dvd_iff:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1117	"lcm_list xs dvd b \<longleftrightarrow> (\<forall>a\<in>set xs. a dvd b)"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1118	by (simp add: Lcm_fin_dvd_iff)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1119
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1120	lemma Gcd_fin_mult:
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1121	"Gcd\<^sub>f\<^sub>i\<^sub>n (image (times b) A) = normalize (b * Gcd\<^sub>f\<^sub>i\<^sub>n A)" if "finite A"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1122	using that by induction (auto simp: gcd_mult_left)
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1123
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1124	lemma Lcm_fin_mult:
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1125	"Lcm\<^sub>f\<^sub>i\<^sub>n (image (times b) A) = normalize (b * Lcm\<^sub>f\<^sub>i\<^sub>n A)" if "A \<noteq> {}"
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1126	proof (cases "b = 0")
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1127	case True
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1128	moreover from that have "times 0 ` A = {0}"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1129	by auto
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1130	ultimately show ?thesis
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1131	by simp
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1132	next
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1133	case False
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1134	show ?thesis proof (cases "finite A")
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1135	case False
66936 cf8d8fc23891 tuned some proofs and added some lemmas haftmann parents: 66836 diff changeset	1136	moreover have "inj_on (times b) A"
cf8d8fc23891 tuned some proofs and added some lemmas haftmann parents: 66836 diff changeset	1137	using \<open>b \<noteq> 0\<close> by (rule inj_on_mult)
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1138	ultimately have "infinite (times b ` A)"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1139	by (simp add: finite_image_iff)
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1140	with False show ?thesis
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1141	by simp
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1142	next
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1143	case True
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1144	then show ?thesis using that
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1145	by (induct A rule: finite_ne_induct) (auto simp: lcm_mult_left)
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1146	qed
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1147	qed
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1148
65811 2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1149	lemma unit_factor_Gcd_fin:
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1150	"unit_factor (Gcd\<^sub>f\<^sub>i\<^sub>n A) = of_bool (Gcd\<^sub>f\<^sub>i\<^sub>n A \<noteq> 0)"
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1151	by (rule normalize_idem_imp_unit_factor_eq) simp
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1152
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1153	lemma unit_factor_Lcm_fin:
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1154	"unit_factor (Lcm\<^sub>f\<^sub>i\<^sub>n A) = of_bool (Lcm\<^sub>f\<^sub>i\<^sub>n A \<noteq> 0)"
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1155	by (rule normalize_idem_imp_unit_factor_eq) simp
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1156
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1157	lemma is_unit_Gcd_fin_iff [simp]:
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1158	"is_unit (Gcd\<^sub>f\<^sub>i\<^sub>n A) \<longleftrightarrow> Gcd\<^sub>f\<^sub>i\<^sub>n A = 1"
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1159	by (rule normalize_idem_imp_is_unit_iff) simp
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1160
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1161	lemma is_unit_Lcm_fin_iff [simp]:
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1162	"is_unit (Lcm\<^sub>f\<^sub>i\<^sub>n A) \<longleftrightarrow> Lcm\<^sub>f\<^sub>i\<^sub>n A = 1"
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1163	by (rule normalize_idem_imp_is_unit_iff) simp
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1164
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1165	lemma Gcd_fin_0_iff:
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1166	"Gcd\<^sub>f\<^sub>i\<^sub>n A = 0 \<longleftrightarrow> A \<subseteq> {0} \<and> finite A"
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1167	by (induct A rule: infinite_finite_induct) simp_all
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1168
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1169	lemma Lcm_fin_0_iff:
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1170	"Lcm\<^sub>f\<^sub>i\<^sub>n A = 0 \<longleftrightarrow> 0 \<in> A" if "finite A"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1171	using that by (induct A) (auto simp: lcm_eq_0_iff)
65811 2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1172
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1173	lemma Lcm_fin_1_iff:
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1174	"Lcm\<^sub>f\<^sub>i\<^sub>n A = 1 \<longleftrightarrow> (\<forall>a\<in>A. is_unit a) \<and> finite A"
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1175	by (induct A rule: infinite_finite_induct) simp_all
2653f1cd8775 more lemmas haftmann parents: 65555 diff changeset	1176
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1177	end
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1178
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1179	context semiring_Gcd
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1180	begin
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1181
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1182	lemma Gcd_fin_eq_Gcd [simp]:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1183	"Gcd\<^sub>f\<^sub>i\<^sub>n A = Gcd A" if "finite A" for A :: "'a set"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1184	using that by induct simp_all
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1185
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1186	lemma Gcd_set_eq_fold [code_unfold]:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1187	"Gcd (set xs) = fold gcd xs 0"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1188	by (simp add: Gcd_fin.set_eq_fold [symmetric])
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1189
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1190	lemma Lcm_fin_eq_Lcm [simp]:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1191	"Lcm\<^sub>f\<^sub>i\<^sub>n A = Lcm A" if "finite A" for A :: "'a set"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1192	using that by induct simp_all
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1193
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1194	lemma Lcm_set_eq_fold [code_unfold]:
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1195	"Lcm (set xs) = fold lcm xs 1"
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1196	by (simp add: Lcm_fin.set_eq_fold [symmetric])
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1197
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	1198	end
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1199
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1200
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1201	subsection \<open>Coprimality\<close>
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1202
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1203	context semiring_gcd
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1204	begin
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1205
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1206	lemma coprime_imp_gcd_eq_1 [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1207	"gcd a b = 1" if "coprime a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1208	proof -
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1209	define t r s where "t = gcd a b" and "r = a div t" and "s = b div t"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1210	then have "a = t * r" and "b = t * s"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1211	by simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1212	with that have "coprime (t * r) (t * s)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1213	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1214	then show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1215	by (simp add: t_def)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1216	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1217
68270 2bc921b2159b treat gcd_eq_1_imp_coprime analogously to mod_0_imp_dvd haftmann parents: 67399 diff changeset	1218	lemma gcd_eq_1_imp_coprime [dest!]:
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1219	"coprime a b" if "gcd a b = 1"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1220	proof (rule coprimeI)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1221	fix c
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1222	assume "c dvd a" and "c dvd b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1223	then have "c dvd gcd a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1224	by (rule gcd_greatest)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1225	with that show "is_unit c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1226	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1227	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1228
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1229	lemma coprime_iff_gcd_eq_1 [presburger, code]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1230	"coprime a b \<longleftrightarrow> gcd a b = 1"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1231	by rule (simp_all add: gcd_eq_1_imp_coprime)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1232
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1233	lemma is_unit_gcd [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1234	"is_unit (gcd a b) \<longleftrightarrow> coprime a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1235	by (simp add: coprime_iff_gcd_eq_1)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1236
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1237	lemma coprime_add_one_left [simp]: "coprime (a + 1) a"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1238	by (simp add: gcd_eq_1_imp_coprime ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1239
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1240	lemma coprime_add_one_right [simp]: "coprime a (a + 1)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1241	using coprime_add_one_left [of a] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1242
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1243	lemma coprime_mult_left_iff [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1244	"coprime (a * b) c \<longleftrightarrow> coprime a c \<and> coprime b c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1245	proof
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1246	assume "coprime (a * b) c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1247	with coprime_common_divisor [of "a * b" c]
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1248	have : "is_unit d" if "d dvd a b" and "d dvd c" for d
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1249	using that by blast
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1250	have "coprime a c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1251	by (rule coprimeI, rule *) simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1252	moreover have "coprime b c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1253	by (rule coprimeI, rule *) simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1254	ultimately show "coprime a c \<and> coprime b c" ..
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1255	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1256	assume "coprime a c \<and> coprime b c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1257	then have "coprime a c" "coprime b c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1258	by simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1259	show "coprime (a * b) c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1260	proof (rule coprimeI)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1261	fix d
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1262	assume "d dvd a * b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1263	then obtain r s where d: "d = r * s" "r dvd a" "s dvd b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1264	by (rule dvd_productE)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1265	assume "d dvd c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1266	with d have "r * s dvd c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1267	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1268	then have "r dvd c" "s dvd c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1269	by (auto intro: dvd_mult_left dvd_mult_right)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1270	from \<open>coprime a c\<close> \<open>r dvd a\<close> \<open>r dvd c\<close>
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1271	have "is_unit r"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1272	by (rule coprime_common_divisor)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1273	moreover from \<open>coprime b c\<close> \<open>s dvd b\<close> \<open>s dvd c\<close>
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1274	have "is_unit s"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1275	by (rule coprime_common_divisor)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1276	ultimately show "is_unit d"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1277	by (simp add: d is_unit_mult_iff)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1278	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1279	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1280
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1281	lemma coprime_mult_right_iff [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1282	"coprime c (a * b) \<longleftrightarrow> coprime c a \<and> coprime c b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1283	using coprime_mult_left_iff [of a b c] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1284
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1285	lemma coprime_power_left_iff [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1286	"coprime (a ^ n) b \<longleftrightarrow> coprime a b \<or> n = 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1287	proof (cases "n = 0")
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1288	case True
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1289	then show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1290	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1291	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1292	case False
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1293	then have "n > 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1294	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1295	then show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1296	by (induction n rule: nat_induct_non_zero) simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1297	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1298
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1299	lemma coprime_power_right_iff [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1300	"coprime a (b ^ n) \<longleftrightarrow> coprime a b \<or> n = 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1301	using coprime_power_left_iff [of b n a] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1302
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1303	lemma prod_coprime_left:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1304	"coprime (\<Prod>i\<in>A. f i) a" if "\<And>i. i \<in> A \<Longrightarrow> coprime (f i) a"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1305	using that by (induct A rule: infinite_finite_induct) simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1306
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1307	lemma prod_coprime_right:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1308	"coprime a (\<Prod>i\<in>A. f i)" if "\<And>i. i \<in> A \<Longrightarrow> coprime a (f i)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1309	using that prod_coprime_left [of A f a] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1310
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1311	lemma prod_list_coprime_left:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1312	"coprime (prod_list xs) a" if "\<And>x. x \<in> set xs \<Longrightarrow> coprime x a"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1313	using that by (induct xs) simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1314
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1315	lemma prod_list_coprime_right:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1316	"coprime a (prod_list xs)" if "\<And>x. x \<in> set xs \<Longrightarrow> coprime a x"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1317	using that prod_list_coprime_left [of xs a] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1318
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1319	lemma coprime_dvd_mult_left_iff:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1320	"a dvd b * c \<longleftrightarrow> a dvd b" if "coprime a c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1321	proof
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1322	assume "a dvd b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1323	then show "a dvd b * c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1324	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1325	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1326	assume "a dvd b * c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1327	show "a dvd b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1328	proof (cases "b = 0")
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1329	case True
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1330	then show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1331	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1332	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1333	case False
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1334	then have unit: "is_unit (unit_factor b)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1335	by simp
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1336	from \<open>coprime a c\<close>
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1337	have "gcd (b * a) (b * c) * unit_factor b = b"
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1338	by (subst gcd_mult_left) (simp add: ac_simps)
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1339	moreover from \<open>a dvd b * c\<close>
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1340	have "a dvd gcd (b * a) (b * c) * unit_factor b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1341	by (simp add: dvd_mult_unit_iff unit)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1342	ultimately show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1343	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1344	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1345	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1346
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1347	lemma coprime_dvd_mult_right_iff:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1348	"a dvd c * b \<longleftrightarrow> a dvd b" if "coprime a c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1349	using that coprime_dvd_mult_left_iff [of a c b] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1350
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1351	lemma divides_mult:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1352	"a * b dvd c" if "a dvd c" and "b dvd c" and "coprime a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1353	proof -
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1354	from \<open>b dvd c\<close> obtain b' where "c = b * b'" ..
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1355	with \<open>a dvd c\<close> have "a dvd b' * b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1356	by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1357	with \<open>coprime a b\<close> have "a dvd b'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1358	by (simp add: coprime_dvd_mult_left_iff)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1359	then obtain a' where "b' = a * a'" ..
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1360	with \<open>c = b * b'\<close> have "c = (a * b) * a'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1361	by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1362	then show ?thesis ..
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1363	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1364
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1365	lemma div_gcd_coprime:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1366	assumes "a \<noteq> 0 \<or> b \<noteq> 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1367	shows "coprime (a div gcd a b) (b div gcd a b)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1368	proof -
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1369	let ?g = "gcd a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1370	let ?a' = "a div ?g"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1371	let ?b' = "b div ?g"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1372	let ?g' = "gcd ?a' ?b'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1373	have dvdg: "?g dvd a" "?g dvd b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1374	by simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1375	have dvdg': "?g' dvd ?a'" "?g' dvd ?b'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1376	by simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1377	from dvdg dvdg' obtain ka kb ka' kb' where
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1378	kab: "a = ?g * ka" "b = ?g * kb" "?a' = ?g' * ka'" "?b' = ?g' * kb'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1379	unfolding dvd_def by blast
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1380	from this [symmetric] have "?g * ?a' = (?g * ?g') * ka'" "?g * ?b' = (?g * ?g') * kb'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1381	by (simp_all add: mult.assoc mult.left_commute [of "gcd a b"])
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1382	then have dvdgg':"?g * ?g' dvd a" "?g* ?g' dvd b"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1383	by (auto simp: dvd_mult_div_cancel [OF dvdg(1)] dvd_mult_div_cancel [OF dvdg(2)] dvd_def)
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1384	have "?g \<noteq> 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1385	using assms by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1386	moreover from gcd_greatest [OF dvdgg'] have "?g * ?g' dvd ?g" .
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1387	ultimately show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1388	using dvd_times_left_cancel_iff [of "gcd a b" _ 1]
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1389	by simp (simp only: coprime_iff_gcd_eq_1)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1390	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1391
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1392	lemma gcd_coprime:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1393	assumes c: "gcd a b \<noteq> 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1394	and a: "a = a' * gcd a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1395	and b: "b = b' * gcd a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1396	shows "coprime a' b'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1397	proof -
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1398	from c have "a \<noteq> 0 \<or> b \<noteq> 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1399	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1400	with div_gcd_coprime have "coprime (a div gcd a b) (b div gcd a b)" .
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1401	also from assms have "a div gcd a b = a'"
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1402	using dvd_div_eq_mult gcd_dvd1 by blast
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1403	also from assms have "b div gcd a b = b'"
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1404	using dvd_div_eq_mult gcd_dvd1 by blast
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1405	finally show ?thesis .
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1406	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1407
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1408	lemma gcd_coprime_exists:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1409	assumes "gcd a b \<noteq> 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1410	shows "\<exists>a' b'. a = a' * gcd a b \<and> b = b' * gcd a b \<and> coprime a' b'"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1411	proof -
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1412	have "coprime (a div gcd a b) (b div gcd a b)"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1413	using assms div_gcd_coprime by auto
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1414	then show ?thesis
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1415	by force
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1416	qed
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1417
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1418	lemma pow_divides_pow_iff [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1419	"a ^ n dvd b ^ n \<longleftrightarrow> a dvd b" if "n > 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1420	proof (cases "gcd a b = 0")
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1421	case True
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1422	then show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1423	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1424	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1425	case False
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1426	show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1427	proof
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1428	let ?d = "gcd a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1429	from \<open>n > 0\<close> obtain m where m: "n = Suc m"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1430	by (cases n) simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1431	from False have zn: "?d ^ n \<noteq> 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1432	by (rule power_not_zero)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1433	from gcd_coprime_exists [OF False]
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1434	obtain a' b' where ab': "a = a' * ?d" "b = b' * ?d" "coprime a' b'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1435	by blast
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1436	assume "a ^ n dvd b ^ n"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1437	then have "(a' * ?d) ^ n dvd (b' * ?d) ^ n"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1438	by (simp add: ab'(1,2)[symmetric])
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1439	then have "?d^n * a'^n dvd ?d^n * b'^n"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1440	by (simp only: power_mult_distrib ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1441	with zn have "a' ^ n dvd b' ^ n"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1442	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1443	then have "a' dvd b' ^ n"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1444	using dvd_trans[of a' "a'^n" "b'^n"] by (simp add: m)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1445	then have "a' dvd b' ^ m * b'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1446	by (simp add: m ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1447	moreover have "coprime a' (b' ^ n)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1448	using \<open>coprime a' b'\<close> by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1449	then have "a' dvd b'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1450	using \<open>a' dvd b' ^ n\<close> coprime_dvd_mult_left_iff dvd_mult by blast
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1451	then have "a' * ?d dvd b' * ?d"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1452	by (rule mult_dvd_mono) simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1453	with ab'(1,2) show "a dvd b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1454	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1455	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1456	assume "a dvd b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1457	with \<open>n > 0\<close> show "a ^ n dvd b ^ n"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1458	by (induction rule: nat_induct_non_zero)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1459	(simp_all add: mult_dvd_mono)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1460	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1461	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1462
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1463	lemma coprime_crossproduct:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1464	fixes a b c d :: 'a
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1465	assumes "coprime a d" and "coprime b c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1466	shows "normalize a * normalize c = normalize b * normalize d \<longleftrightarrow>
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1467	normalize a = normalize b \<and> normalize c = normalize d"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1468	(is "?lhs \<longleftrightarrow> ?rhs")
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1469	proof
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1470	assume ?rhs
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1471	then show ?lhs by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1472	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1473	assume ?lhs
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1474	from \<open>?lhs\<close> have "normalize a dvd normalize b * normalize d"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1475	by (auto intro: dvdI dest: sym)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1476	with \<open>coprime a d\<close> have "a dvd b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1477	by (simp add: coprime_dvd_mult_left_iff normalize_mult [symmetric])
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1478	from \<open>?lhs\<close> have "normalize b dvd normalize a * normalize c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1479	by (auto intro: dvdI dest: sym)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1480	with \<open>coprime b c\<close> have "b dvd a"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1481	by (simp add: coprime_dvd_mult_left_iff normalize_mult [symmetric])
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1482	from \<open>?lhs\<close> have "normalize c dvd normalize d * normalize b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1483	by (auto intro: dvdI dest: sym simp add: mult.commute)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1484	with \<open>coprime b c\<close> have "c dvd d"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1485	by (simp add: coprime_dvd_mult_left_iff coprime_commute normalize_mult [symmetric])
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1486	from \<open>?lhs\<close> have "normalize d dvd normalize c * normalize a"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1487	by (auto intro: dvdI dest: sym simp add: mult.commute)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1488	with \<open>coprime a d\<close> have "d dvd c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1489	by (simp add: coprime_dvd_mult_left_iff coprime_commute normalize_mult [symmetric])
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1490	from \<open>a dvd b\<close> \<open>b dvd a\<close> have "normalize a = normalize b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1491	by (rule associatedI)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1492	moreover from \<open>c dvd d\<close> \<open>d dvd c\<close> have "normalize c = normalize d"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1493	by (rule associatedI)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1494	ultimately show ?rhs ..
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1495	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1496
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1497	lemma gcd_mult_left_left_cancel:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1498	"gcd (c * a) b = gcd a b" if "coprime b c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1499	proof -
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1500	have "coprime (gcd b (a * c)) c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1501	by (rule coprimeI) (auto intro: that coprime_common_divisor)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1502	then have "gcd b (a * c) dvd a"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1503	using coprime_dvd_mult_left_iff [of "gcd b (a * c)" c a]
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1504	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1505	then show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1506	by (auto intro: associated_eqI simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1507	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1508
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1509	lemma gcd_mult_left_right_cancel:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1510	"gcd (a * c) b = gcd a b" if "coprime b c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1511	using that gcd_mult_left_left_cancel [of b c a]
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1512	by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1513
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1514	lemma gcd_mult_right_left_cancel:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1515	"gcd a (c * b) = gcd a b" if "coprime a c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1516	using that gcd_mult_left_left_cancel [of a c b]
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1517	by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1518
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1519	lemma gcd_mult_right_right_cancel:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1520	"gcd a (b * c) = gcd a b" if "coprime a c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1521	using that gcd_mult_right_left_cancel [of a c b]
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1522	by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1523
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1524	lemma gcd_exp_weak:
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1525	"gcd (a ^ n) (b ^ n) = normalize (gcd a b ^ n)"
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1526	proof (cases "a = 0 \<and> b = 0 \<or> n = 0")
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1527	case True
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1528	then show ?thesis
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1529	by (cases n) simp_all
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1530	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1531	case False
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1532	then have "coprime (a div gcd a b) (b div gcd a b)" and "n > 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1533	by (auto intro: div_gcd_coprime)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1534	then have "coprime ((a div gcd a b) ^ n) ((b div gcd a b) ^ n)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1535	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1536	then have "1 = gcd ((a div gcd a b) ^ n) ((b div gcd a b) ^ n)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1537	by simp
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1538	then have "normalize (gcd a b ^ n) = normalize (gcd a b ^ n * \<dots>)"
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1539	by simp
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1540	also have "\<dots> = gcd (gcd a b ^ n * (a div gcd a b) ^ n) (gcd a b ^ n * (b div gcd a b) ^ n)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1541	by (rule gcd_mult_left [symmetric])
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1542	also have "(gcd a b) ^ n * (a div gcd a b) ^ n = a ^ n"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1543	by (simp add: ac_simps div_power dvd_power_same)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1544	also have "(gcd a b) ^ n * (b div gcd a b) ^ n = b ^ n"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1545	by (simp add: ac_simps div_power dvd_power_same)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1546	finally show ?thesis by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1547	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1548
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1549	lemma division_decomp:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1550	assumes "a dvd b * c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1551	shows "\<exists>b' c'. a = b' * c' \<and> b' dvd b \<and> c' dvd c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1552	proof (cases "gcd a b = 0")
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1553	case True
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1554	then have "a = 0 \<and> b = 0"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1555	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1556	then have "a = 0 * c \<and> 0 dvd b \<and> c dvd c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1557	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1558	then show ?thesis by blast
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1559	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1560	case False
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1561	let ?d = "gcd a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1562	from gcd_coprime_exists [OF False]
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1563	obtain a' b' where ab': "a = a' * ?d" "b = b' * ?d" "coprime a' b'"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1564	by blast
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1565	from ab'(1) have "a' dvd a" ..
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1566	with assms have "a' dvd b * c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1567	using dvd_trans [of a' a "b * c"] by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1568	from assms ab'(1,2) have "a' * ?d dvd (b' * ?d) * c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1569	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1570	then have "?d * a' dvd ?d * (b' * c)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1571	by (simp add: mult_ac)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1572	with \<open>?d \<noteq> 0\<close> have "a' dvd b' * c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1573	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1574	then have "a' dvd c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1575	using \<open>coprime a' b'\<close> by (simp add: coprime_dvd_mult_right_iff)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1576	with ab'(1) have "a = ?d * a' \<and> ?d dvd b \<and> a' dvd c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1577	by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1578	then show ?thesis by blast
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1579	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1580
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1581	lemma lcm_coprime: "coprime a b \<Longrightarrow> lcm a b = normalize (a * b)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1582	by (subst lcm_gcd) simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1583
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1584	end
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1585
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1586	context ring_gcd
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1587	begin
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1588
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1589	lemma coprime_minus_left_iff [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1590	"coprime (- a) b \<longleftrightarrow> coprime a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1591	by (rule; rule coprimeI) (auto intro: coprime_common_divisor)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1592
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1593	lemma coprime_minus_right_iff [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1594	"coprime a (- b) \<longleftrightarrow> coprime a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1595	using coprime_minus_left_iff [of b a] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1596
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1597	lemma coprime_diff_one_left [simp]: "coprime (a - 1) a"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1598	using coprime_add_one_right [of "a - 1"] by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1599
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1600	lemma coprime_doff_one_right [simp]: "coprime a (a - 1)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1601	using coprime_diff_one_left [of a] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1602
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1603	end
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1604
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1605	context semiring_Gcd
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1606	begin
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1607
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1608	lemma Lcm_coprime:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1609	assumes "finite A"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1610	and "A \<noteq> {}"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1611	and "\<And>a b. a \<in> A \<Longrightarrow> b \<in> A \<Longrightarrow> a \<noteq> b \<Longrightarrow> coprime a b"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1612	shows "Lcm A = normalize (\<Prod>A)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1613	using assms
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1614	proof (induct rule: finite_ne_induct)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1615	case singleton
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1616	then show ?case by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1617	next
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1618	case (insert a A)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1619	have "Lcm (insert a A) = lcm a (Lcm A)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1620	by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1621	also from insert have "Lcm A = normalize (\<Prod>A)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1622	by blast
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1623	also have "lcm a \<dots> = lcm a (\<Prod>A)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1624	by (cases "\<Prod>A = 0") (simp_all add: lcm_div_unit2)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1625	also from insert have "coprime a (\<Prod>A)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1626	by (subst coprime_commute, intro prod_coprime_left) auto
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1627	with insert have "lcm a (\<Prod>A) = normalize (\<Prod>(insert a A))"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1628	by (simp add: lcm_coprime)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1629	finally show ?case .
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1630	qed
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1631
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1632	lemma Lcm_coprime':
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1633	"card A \<noteq> 0 \<Longrightarrow>
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1634	(\<And>a b. a \<in> A \<Longrightarrow> b \<in> A \<Longrightarrow> a \<noteq> b \<Longrightarrow> coprime a b) \<Longrightarrow>
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1635	Lcm A = normalize (\<Prod>A)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1636	by (rule Lcm_coprime) (simp_all add: card_eq_0_iff)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1637
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1638	end
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1639
74965 9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1640	text \<open>And some consequences: cancellation modulo @{term m}\<close>
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1641	lemma mult_mod_cancel_right:
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1642	fixes m :: "'a::{euclidean_ring_cancel,semiring_gcd}"
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1643	assumes eq: "(a * n) mod m = (b * n) mod m" and "coprime m n"
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1644	shows "a mod m = b mod m"
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1645	proof -
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1646	have "m dvd (an - bn)"
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1647	using eq mod_eq_dvd_iff by blast
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1648	then have "m dvd a-b"
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1649	by (metis \<open>coprime m n\<close> coprime_dvd_mult_left_iff left_diff_distrib')
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1650	then show ?thesis
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1651	using mod_eq_dvd_iff by blast
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1652	qed
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1653
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1654	lemma mult_mod_cancel_left:
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1655	fixes m :: "'a::{euclidean_ring_cancel,semiring_gcd}"
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1656	assumes "(n * a) mod m = (n * b) mod m" and "coprime m n"
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1657	shows "a mod m = b mod m"
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1658	by (metis assms mult.commute mult_mod_cancel_right)
9469d9223689 Tiny additions inspired by Roth development paulson <lp15@cam.ac.uk> parents: 74101 diff changeset	1659
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	1660
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1661	subsection \<open>GCD and LCM for multiplicative normalisation functions\<close>
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1662
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1663	class semiring_gcd_mult_normalize = semiring_gcd + normalization_semidom_multiplicative
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1664	begin
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1665
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1666	lemma mult_gcd_left: "c * gcd a b = unit_factor c * gcd (c * a) (c * b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1667	by (simp add: gcd_mult_left normalize_mult mult.assoc [symmetric])
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1668
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1669	lemma mult_gcd_right: "gcd a b * c = gcd (a * c) (b * c) * unit_factor c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1670	using mult_gcd_left [of c a b] by (simp add: ac_simps)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1671
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1672	lemma gcd_mult_distrib': "normalize c * gcd a b = gcd (c * a) (c * b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1673	by (subst gcd_mult_left) (simp_all add: normalize_mult)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1674
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1675	lemma gcd_mult_distrib: "k * gcd a b = gcd (k * a) (k * b) * unit_factor k"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1676	proof-
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1677	have "normalize k * gcd a b = gcd (k * a) (k * b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1678	by (simp add: gcd_mult_distrib')
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1679	then have "normalize k * gcd a b * unit_factor k = gcd (k * a) (k * b) * unit_factor k"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1680	by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1681	then have "normalize k * unit_factor k * gcd a b = gcd (k * a) (k * b) * unit_factor k"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1682	by (simp only: ac_simps)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1683	then show ?thesis
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1684	by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1685	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1686
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1687	lemma gcd_mult_lcm [simp]: "gcd a b * lcm a b = normalize a * normalize b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1688	by (simp add: lcm_gcd normalize_mult dvd_normalize_div)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1689
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1690	lemma lcm_mult_gcd [simp]: "lcm a b * gcd a b = normalize a * normalize b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1691	using gcd_mult_lcm [of a b] by (simp add: ac_simps)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1692
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1693	lemma mult_lcm_left: "c * lcm a b = unit_factor c * lcm (c * a) (c * b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1694	by (simp add: lcm_mult_left mult.assoc [symmetric] normalize_mult)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1695
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1696	lemma mult_lcm_right: "lcm a b * c = lcm (a * c) (b * c) * unit_factor c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1697	using mult_lcm_left [of c a b] by (simp add: ac_simps)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1698
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1699	lemma lcm_gcd_prod: "lcm a b * gcd a b = normalize (a * b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1700	by (simp add: lcm_gcd dvd_normalize_div normalize_mult)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1701
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1702	lemma lcm_mult_distrib': "normalize c * lcm a b = lcm (c * a) (c * b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1703	by (subst lcm_mult_left) (simp add: normalize_mult)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1704
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1705	lemma lcm_mult_distrib: "k * lcm a b = lcm (k * a) (k * b) * unit_factor k"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1706	proof-
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1707	have "normalize k * lcm a b = lcm (k * a) (k * b)"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1708	by (simp add: lcm_mult_distrib')
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1709	then have "normalize k * lcm a b * unit_factor k = lcm (k * a) (k * b) * unit_factor k"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1710	by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1711	then have "normalize k * unit_factor k * lcm a b = lcm (k * a) (k * b) * unit_factor k"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1712	by (simp only: ac_simps)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1713	then show ?thesis
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1714	by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1715	qed
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1716
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1717	lemma coprime_crossproduct':
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1718	fixes a b c d
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1719	assumes "b \<noteq> 0"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1720	assumes unit_factors: "unit_factor b = unit_factor d"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1721	assumes coprime: "coprime a b" "coprime c d"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1722	shows "a * d = b * c \<longleftrightarrow> a = c \<and> b = d"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1723	proof safe
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1724	assume eq: "a * d = b * c"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1725	hence "normalize a * normalize d = normalize c * normalize b"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1726	by (simp only: normalize_mult [symmetric] mult_ac)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1727	with coprime have "normalize b = normalize d"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1728	by (subst (asm) coprime_crossproduct) simp_all
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1729	from this and unit_factors show "b = d"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1730	by (rule normalize_unit_factor_eqI)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1731	from eq have "a * d = c * d" by (simp only: \<open>b = d\<close> mult_ac)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1732	with \<open>b \<noteq> 0\<close> \<open>b = d\<close> show "a = c" by simp
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1733	qed (simp_all add: mult_ac)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1734
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1735	lemma gcd_exp [simp]:
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1736	"gcd (a ^ n) (b ^ n) = gcd a b ^ n"
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1737	using gcd_exp_weak[of a n b] by (simp add: normalize_power)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1738
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1739	end
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1740
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1741
69593 3dda49e08b9d isabelle update -u control_cartouches; wenzelm parents: 69064 diff changeset	1742	subsection \<open>GCD and LCM on \<^typ>\<open>nat\<close> and \<^typ>\<open>int\<close>\<close>
59008 f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1743
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1744	instantiation nat :: gcd
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1745	begin
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	1746
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	1747	fun gcd_nat :: "nat \<Rightarrow> nat \<Rightarrow> nat"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1748	where "gcd_nat x y = (if y = 0 then x else gcd y (x mod y))"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1749
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	1750	definition lcm_nat :: "nat \<Rightarrow> nat \<Rightarrow> nat"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1751	where "lcm_nat x y = x * y div (gcd x y)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1752
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1753	instance ..
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1754
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1755	end
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1756
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1757	instantiation int :: gcd
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1758	begin
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	1759
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	1760	definition gcd_int :: "int \<Rightarrow> int \<Rightarrow> int"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	1761	where "gcd_int x y = int (gcd (nat \<bar>x\<bar>) (nat \<bar>y\<bar>))"
23687 06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1762
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	1763	definition lcm_int :: "int \<Rightarrow> int \<Rightarrow> int"
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	1764	where "lcm_int x y = int (lcm (nat \<bar>x\<bar>) (nat \<bar>y\<bar>))"
23687 06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1765
61944 5d06ecfdb472 prefer symbols for "abs"; wenzelm parents: 61929 diff changeset	1766	instance ..
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1767
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1768	end
23687 06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1769
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1770	lemma gcd_int_int_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1771	"gcd (int m) (int n) = int (gcd m n)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1772	by (simp add: gcd_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1773
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1774	lemma gcd_nat_abs_left_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1775	"gcd (nat \<bar>k\<bar>) n = nat (gcd k (int n))"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1776	by (simp add: gcd_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1777
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1778	lemma gcd_nat_abs_right_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1779	"gcd n (nat \<bar>k\<bar>) = nat (gcd (int n) k)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1780	by (simp add: gcd_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1781
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1782	lemma abs_gcd_int [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1783	"\<bar>gcd x y\<bar> = gcd x y"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1784	for x y :: int
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1785	by (simp only: gcd_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1786
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1787	lemma gcd_abs1_int [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1788	"gcd \<bar>x\<bar> y = gcd x y"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1789	for x y :: int
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1790	by (simp only: gcd_int_def) simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1791
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1792	lemma gcd_abs2_int [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1793	"gcd x \<bar>y\<bar> = gcd x y"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1794	for x y :: int
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1795	by (simp only: gcd_int_def) simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1796
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1797	lemma lcm_int_int_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1798	"lcm (int m) (int n) = int (lcm m n)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1799	by (simp add: lcm_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1800
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1801	lemma lcm_nat_abs_left_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1802	"lcm (nat \<bar>k\<bar>) n = nat (lcm k (int n))"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1803	by (simp add: lcm_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1804
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1805	lemma lcm_nat_abs_right_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1806	"lcm n (nat \<bar>k\<bar>) = nat (lcm (int n) k)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1807	by (simp add: lcm_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1808
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1809	lemma lcm_abs1_int [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1810	"lcm \<bar>x\<bar> y = lcm x y"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1811	for x y :: int
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1812	by (simp only: lcm_int_def) simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1813
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1814	lemma lcm_abs2_int [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1815	"lcm x \<bar>y\<bar> = lcm x y"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1816	for x y :: int
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1817	by (simp only: lcm_int_def) simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1818
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1819	lemma abs_lcm_int [simp]: "\<bar>lcm i j\<bar> = lcm i j"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1820	for i j :: int
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1821	by (simp only: lcm_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1822
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1823	lemma gcd_nat_induct [case_names base step]:
23687 06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1824	fixes m n :: nat
06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1825	assumes "\<And>m. P m 0"
06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1826	and "\<And>m n. 0 < n \<Longrightarrow> P n (m mod n) \<Longrightarrow> P m n"
06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1827	shows "P m n"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1828	proof (induction m n rule: gcd_nat.induct)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1829	case (1 x y)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1830	then show ?case
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1831	using assms neq0_conv by blast
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1832	qed
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1833
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1834	lemma gcd_neg1_int [simp]: "gcd (- x) y = gcd x y"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1835	for x y :: int
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1836	by (simp only: gcd_int_def) simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1837
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1838	lemma gcd_neg2_int [simp]: "gcd x (- y) = gcd x y"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1839	for x y :: int
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1840	by (simp only: gcd_int_def) simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1841
31952 40501bb2d57c renamed lemmas: nat_xyz/int_xyz -> xyz_nat/xyz_int nipkow parents: 31814 diff changeset	1842	lemma gcd_cases_int:
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1843	fixes x y :: int
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1844	assumes "x \<ge> 0 \<Longrightarrow> y \<ge> 0 \<Longrightarrow> P (gcd x y)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1845	and "x \<ge> 0 \<Longrightarrow> y \<le> 0 \<Longrightarrow> P (gcd x (- y))"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1846	and "x \<le> 0 \<Longrightarrow> y \<ge> 0 \<Longrightarrow> P (gcd (- x) y)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1847	and "x \<le> 0 \<Longrightarrow> y \<le> 0 \<Longrightarrow> P (gcd (- x) (- y))"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1848	shows "P (gcd x y)"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1849	using assms by auto arith
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	1850
31952 40501bb2d57c renamed lemmas: nat_xyz/int_xyz -> xyz_nat/xyz_int nipkow parents: 31814 diff changeset	1851	lemma gcd_ge_0_int [simp]: "gcd (x::int) y >= 0"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1852	for x y :: int
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1853	by (simp add: gcd_int_def)
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1854
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1855	lemma lcm_neg1_int: "lcm (- x) y = lcm x y"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1856	for x y :: int
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1857	by (simp only: lcm_int_def) simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1858
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1859	lemma lcm_neg2_int: "lcm x (- y) = lcm x y"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1860	for x y :: int
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1861	by (simp only: lcm_int_def) simp
31814 7c122634da81 lcm abs lemmas nipkow parents: 31813 diff changeset	1862
31952 40501bb2d57c renamed lemmas: nat_xyz/int_xyz -> xyz_nat/xyz_int nipkow parents: 31814 diff changeset	1863	lemma lcm_cases_int:
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1864	fixes x y :: int
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1865	assumes "x \<ge> 0 \<Longrightarrow> y \<ge> 0 \<Longrightarrow> P (lcm x y)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1866	and "x \<ge> 0 \<Longrightarrow> y \<le> 0 \<Longrightarrow> P (lcm x (- y))"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1867	and "x \<le> 0 \<Longrightarrow> y \<ge> 0 \<Longrightarrow> P (lcm (- x) y)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1868	and "x \<le> 0 \<Longrightarrow> y \<le> 0 \<Longrightarrow> P (lcm (- x) (- y))"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1869	shows "P (lcm x y)"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1870	using assms by (auto simp: lcm_neg1_int lcm_neg2_int) arith
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1871
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1872	lemma lcm_ge_0_int [simp]: "lcm x y \<ge> 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1873	for x y :: int
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1874	by (simp only: lcm_int_def)
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1875
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1876	lemma gcd_0_nat: "gcd x 0 = x"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1877	for x :: nat
23687 06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1878	by simp
06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1879
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1880	lemma gcd_0_int [simp]: "gcd x 0 = \<bar>x\<bar>"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1881	for x :: int
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1882	by (auto simp: gcd_int_def)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1883
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1884	lemma gcd_0_left_nat: "gcd 0 x = x"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1885	for x :: nat
23687 06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1886	by simp
06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	1887
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1888	lemma gcd_0_left_int [simp]: "gcd 0 x = \<bar>x\<bar>"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1889	for x :: int
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1890	by (auto simp: gcd_int_def)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1891
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1892	lemma gcd_red_nat: "gcd x y = gcd y (x mod y)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1893	for x y :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1894	by (cases "y = 0") auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1895
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1896
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1897	text \<open>Weaker, but useful for the simplifier.\<close>
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1898
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1899	lemma gcd_non_0_nat: "y \<noteq> 0 \<Longrightarrow> gcd x y = gcd y (x mod y)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1900	for x y :: nat
21263 de65ce2bfb32 tuned; wenzelm parents: 21256 diff changeset	1901	by simp
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	1902
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1903	lemma gcd_1_nat [simp]: "gcd m 1 = 1"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1904	for m :: nat
60690 a9e45c9588c3 tuned facts haftmann parents: 60689 diff changeset	1905	by simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1906
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1907	lemma gcd_Suc_0 [simp]: "gcd m (Suc 0) = Suc 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1908	for m :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1909	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1910
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1911	lemma gcd_1_int [simp]: "gcd m 1 = 1"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1912	for m :: int
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1913	by (simp add: gcd_int_def)
30082 43c5b7bfc791 make more proofs work whether or not One_nat_def is a simp rule huffman parents: 30042 diff changeset	1914
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1915	lemma gcd_idem_nat: "gcd x x = x"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1916	for x :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1917	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1918
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1919	lemma gcd_idem_int: "gcd x x = \<bar>x\<bar>"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1920	for x :: int
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1921	by (auto simp: gcd_int_def)
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1922
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	1923	declare gcd_nat.simps [simp del]
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	1924
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60690 diff changeset	1925	text \<open>
69593 3dda49e08b9d isabelle update -u control_cartouches; wenzelm parents: 69064 diff changeset	1926	\<^medskip> \<^term>\<open>gcd m n\<close> divides \<open>m\<close> and \<open>n\<close>.
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1927	The conjunctions don't seem provable separately.
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60690 diff changeset	1928	\<close>
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	1929
59008 f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1930	instance nat :: semiring_gcd
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1931	proof
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1932	fix m n :: nat
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1933	show "gcd m n dvd m" and "gcd m n dvd n"
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1934	proof (induct m n rule: gcd_nat_induct)
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1935	case (step m n)
59008 f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1936	then have "gcd n (m mod n) dvd m"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1937	by (metis dvd_mod_imp_dvd)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1938	with step show "gcd m n dvd m"
59008 f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1939	by (simp add: gcd_non_0_nat)
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1940	qed (simp_all add: gcd_0_nat gcd_non_0_nat)
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1941	next
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1942	fix m n k :: nat
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1943	assume "k dvd m" and "k dvd n"
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1944	then show "k dvd gcd m n"
f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1945	by (induct m n rule: gcd_nat_induct) (simp_all add: gcd_non_0_nat dvd_mod gcd_0_nat)
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	1946	qed (simp_all add: lcm_nat_def)
59667 651ea265d568 Removal of the file HOL/Number_Theory/Binomial!! And class field_char_0 now declared in Int.thy paulson <lp15@cam.ac.uk> parents: 59545 diff changeset	1947
59008 f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	1948	instance int :: ring_gcd
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1949	proof
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1950	fix k l r :: int
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1951	show [simp]: "gcd k l dvd k" "gcd k l dvd l"
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1952	using gcd_dvd1 [of "nat \<bar>k\<bar>" "nat \<bar>l\<bar>"]
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1953	gcd_dvd2 [of "nat \<bar>k\<bar>" "nat \<bar>l\<bar>"]
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1954	by simp_all
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1955	show "lcm k l = normalize (k * l div gcd k l)"
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1956	using lcm_gcd [of "nat \<bar>k\<bar>" "nat \<bar>l\<bar>"]
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	1957	by (simp add: nat_eq_iff of_nat_div abs_mult abs_div)
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1958	assume "r dvd k" "r dvd l"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1959	then show "r dvd gcd k l"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1960	using gcd_greatest [of "nat \<bar>r\<bar>" "nat \<bar>k\<bar>" "nat \<bar>l\<bar>"]
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1961	by simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	1962	qed simp
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1963
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1964	lemma gcd_le1_nat [simp]: "a \<noteq> 0 \<Longrightarrow> gcd a b \<le> a"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1965	for a b :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1966	by (rule dvd_imp_le) auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1967
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1968	lemma gcd_le2_nat [simp]: "b \<noteq> 0 \<Longrightarrow> gcd a b \<le> b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1969	for a b :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1970	by (rule dvd_imp_le) auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1971
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1972	lemma gcd_le1_int [simp]: "a > 0 \<Longrightarrow> gcd a b \<le> a"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1973	for a b :: int
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1974	by (rule zdvd_imp_le) auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1975
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1976	lemma gcd_le2_int [simp]: "b > 0 \<Longrightarrow> gcd a b \<le> b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1977	for a b :: int
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1978	by (rule zdvd_imp_le) auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1979
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1980	lemma gcd_pos_nat [simp]: "gcd m n > 0 \<longleftrightarrow> m \<noteq> 0 \<or> n \<noteq> 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1981	for m n :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1982	using gcd_eq_0_iff [of m n] by arith
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1983
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1984	lemma gcd_pos_int [simp]: "gcd m n > 0 \<longleftrightarrow> m \<noteq> 0 \<or> n \<noteq> 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1985	for m n :: int
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1986	using gcd_eq_0_iff [of m n] gcd_ge_0_int [of m n] by arith
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1987
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1988	lemma gcd_unique_nat: "d dvd a \<and> d dvd b \<and> (\<forall>e. e dvd a \<and> e dvd b \<longrightarrow> e dvd d) \<longleftrightarrow> d = gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1989	for d a :: nat
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1990	using gcd_unique by fastforce
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1991
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1992	lemma gcd_unique_int:
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1993	"d \<ge> 0 \<and> d dvd a \<and> d dvd b \<and> (\<forall>e. e dvd a \<and> e dvd b \<longrightarrow> e dvd d) \<longleftrightarrow> d = gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	1994	for d a :: int
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1995	using zdvd_antisym_nonneg by auto
30082 43c5b7bfc791 make more proofs work whether or not One_nat_def is a simp rule huffman parents: 30042 diff changeset	1996
61913 58b153bfa737 tuned proofs and augmented some lemmas haftmann parents: 61856 diff changeset	1997	interpretation gcd_nat:
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	1998	semilattice_neutr_order gcd "0::nat" Rings.dvd "\<lambda>m n. m dvd n \<and> m \<noteq> n"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	1999	by standard (auto simp: gcd_unique_nat [symmetric] intro: dvd_antisym dvd_trans)
31798 fe9a3043d36c Cleaned up GCD nipkow parents: 31766 diff changeset	2000
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2001	lemma gcd_proj1_if_dvd_int [simp]: "x dvd y \<Longrightarrow> gcd x y = \<bar>x\<bar>"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2002	for x y :: int
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2003	by (metis abs_dvd_iff gcd_0_left_int gcd_unique_int)
31798 fe9a3043d36c Cleaned up GCD nipkow parents: 31766 diff changeset	2004
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2005	lemma gcd_proj2_if_dvd_int [simp]: "y dvd x \<Longrightarrow> gcd x y = \<bar>y\<bar>"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2006	for x y :: int
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2007	by (metis gcd_proj1_if_dvd_int gcd.commute)
31798 fe9a3043d36c Cleaned up GCD nipkow parents: 31766 diff changeset	2008
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2009
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2010	text \<open>\<^medskip> Multiplication laws.\<close>
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2011
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2012	lemma gcd_mult_distrib_nat: "k * gcd m n = gcd (k * m) (k * n)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2013	for k m n :: nat
77172 816959264c32 isabelle update -u cite -l ""; wenzelm parents: 74965 diff changeset	2014	\<comment> \<open>\<^cite>\<open>\<open>page 27\<close> in davenport92\<close>\<close>
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2015	by (simp add: gcd_mult_left)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2016
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2017	lemma gcd_mult_distrib_int: "\<bar>k\<bar> * gcd m n = gcd (k * m) (k * n)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2018	for k m n :: int
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2019	by (simp add: gcd_mult_left abs_mult)
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	2020
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2021	text \<open>\medskip Addition laws.\<close>
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2022
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2023	(* TODO: add the other variations? *)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2024
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2025	lemma gcd_diff1_nat: "m \<ge> n \<Longrightarrow> gcd (m - n) n = gcd m n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2026	for m n :: nat
62429 25271ff79171 Tuned Euclidean Rings/GCD rings Manuel Eberl <eberlm@in.tum.de> parents: 62353 diff changeset	2027	by (subst gcd_add1 [symmetric]) auto
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2028
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2029	lemma gcd_diff2_nat: "n \<ge> m \<Longrightarrow> gcd (n - m) n = gcd m n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2030	for m n :: nat
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2031	by (metis gcd.commute gcd_add2 gcd_diff1_nat le_add_diff_inverse2)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2032
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2033	lemma gcd_non_0_int:
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2034	fixes x y :: int
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2035	assumes "y > 0" shows "gcd x y = gcd y (x mod y)"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2036	proof (cases "x mod y = 0")
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2037	case False
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2038	then have neg: "x mod y = y - (- x) mod y"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2039	by (simp add: zmod_zminus1_eq_if)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2040	have xy: "0 \<le> x mod y"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2041	by (simp add: assms)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2042	show ?thesis
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2043	proof (cases "x < 0")
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2044	case True
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2045	have "nat (- x mod y) \<le> nat y"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2046	by (simp add: assms dual_order.order_iff_strict)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2047	moreover have "gcd (nat (- x)) (nat y) = gcd (nat (- x mod y)) (nat y)"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2048	using True assms gcd_non_0_nat nat_mod_distrib by auto
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2049	ultimately have "gcd (nat (- x)) (nat y) = gcd (nat y) (nat (x mod y))"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2050	using assms
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2051	by (simp add: neg nat_diff_distrib') (metis gcd.commute gcd_diff2_nat)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2052	with assms \<open>0 \<le> x mod y\<close> show ?thesis
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2053	by (simp add: True dual_order.order_iff_strict gcd_int_def)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2054	next
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2055	case False
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2056	with assms xy have "gcd (nat x) (nat y) = gcd (nat y) (nat x mod nat y)"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2057	using gcd_red_nat by blast
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2058	with False assms show ?thesis
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2059	by (simp add: gcd_int_def nat_mod_distrib)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2060	qed
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2061	qed (use assms in auto)
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	2062
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2063	lemma gcd_red_int: "gcd x y = gcd y (x mod y)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2064	for x y :: int
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2065	proof (cases y "0::int" rule: linorder_cases)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2066	case less
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2067	with gcd_non_0_int [of "- y" "- x"] show ?thesis
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2068	by auto
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2069	next
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2070	case greater
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2071	with gcd_non_0_int [of y x] show ?thesis
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2072	by auto
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2073	qed auto
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2074
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2075	(* TODO: differences, and all variations of addition rules
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2076	as simplification rules for nat and int *)
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2077
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2078	(* TODO: add the three variations of these, and for ints? *)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2079
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2080	lemma finite_divisors_nat [simp]: (* FIXME move *)
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2081	fixes m :: nat
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2082	assumes "m > 0"
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2083	shows "finite {d. d dvd m}"
31734 a4a79836d07b new lemmas nipkow parents: 31730 diff changeset	2084	proof-
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2085	from assms have "{d. d dvd m} \<subseteq> {d. d \<le> m}"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2086	by (auto dest: dvd_imp_le)
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2087	then show ?thesis
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2088	using finite_Collect_le_nat by (rule finite_subset)
31734 a4a79836d07b new lemmas nipkow parents: 31730 diff changeset	2089	qed
a4a79836d07b new lemmas nipkow parents: 31730 diff changeset	2090
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2091	lemma finite_divisors_int [simp]:
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2092	fixes i :: int
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2093	assumes "i \<noteq> 0"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2094	shows "finite {d. d dvd i}"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2095	proof -
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2096	have "{d. \<bar>d\<bar> \<le> \<bar>i\<bar>} = {- \<bar>i\<bar>..\<bar>i\<bar>}"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2097	by (auto simp: abs_if)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2098	then have "finite {d. \<bar>d\<bar> \<le> \<bar>i\<bar>}"
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2099	by simp
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2100	from finite_subset [OF _ this] show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2101	using assms by (simp add: dvd_imp_le_int subset_iff)
31734 a4a79836d07b new lemmas nipkow parents: 31730 diff changeset	2102	qed
a4a79836d07b new lemmas nipkow parents: 31730 diff changeset	2103
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2104	lemma Max_divisors_self_nat [simp]: "n \<noteq> 0 \<Longrightarrow> Max {d::nat. d dvd n} = n"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2105	by (fastforce intro: antisym Max_le_iff[THEN iffD2] simp: dvd_imp_le)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2106
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2107	lemma Max_divisors_self_int [simp]:
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2108	assumes "n \<noteq> 0" shows "Max {d::int. d dvd n} = \<bar>n\<bar>"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2109	proof (rule antisym)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2110	show "Max {d. d dvd n} \<le> \<bar>n\<bar>"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2111	using assms by (auto intro: abs_le_D1 dvd_imp_le_int intro!: Max_le_iff [THEN iffD2])
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2112	qed (simp add: assms)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2113
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2114	lemma gcd_is_Max_divisors_nat:
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2115	fixes m n :: nat
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2116	assumes "n > 0" shows "gcd m n = Max {d. d dvd m \<and> d dvd n}"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2117	proof (rule Max_eqI[THEN sym], simp_all)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2118	show "finite {d. d dvd m \<and> d dvd n}"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2119	by (simp add: \<open>n > 0\<close>)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2120	show "\<And>y. y dvd m \<and> y dvd n \<Longrightarrow> y \<le> gcd m n"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2121	by (simp add: \<open>n > 0\<close> dvd_imp_le)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2122	qed
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2123
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2124	lemma gcd_is_Max_divisors_int:
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2125	fixes m n :: int
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2126	assumes "n \<noteq> 0" shows "gcd m n = Max {d. d dvd m \<and> d dvd n}"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2127	proof (rule Max_eqI[THEN sym], simp_all)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2128	show "finite {d. d dvd m \<and> d dvd n}"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2129	by (simp add: \<open>n \<noteq> 0\<close>)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2130	show "\<And>y. y dvd m \<and> y dvd n \<Longrightarrow> y \<le> gcd m n"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2131	by (simp add: \<open>n \<noteq> 0\<close> zdvd_imp_le)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2132	qed
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2133
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2134	lemma gcd_code_int [code]: "gcd k l = \<bar>if l = 0 then k else gcd l (\<bar>k\<bar> mod \<bar>l\<bar>)\<bar>"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2135	for k l :: int
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2136	using gcd_red_int [of "\<bar>k\<bar>" "\<bar>l\<bar>"] by simp
34030 829eb528b226 resorted code equations from "old" number theory version haftmann parents: 33946 diff changeset	2137
67051 e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2138	lemma coprime_Suc_left_nat [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2139	"coprime (Suc n) n"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2140	using coprime_add_one_left [of n] by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2141
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2142	lemma coprime_Suc_right_nat [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2143	"coprime n (Suc n)"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2144	using coprime_Suc_left_nat [of n] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2145
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2146	lemma coprime_diff_one_left_nat [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2147	"coprime (n - 1) n" if "n > 0" for n :: nat
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2148	using that coprime_Suc_right_nat [of "n - 1"] by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2149
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2150	lemma coprime_diff_one_right_nat [simp]:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2151	"coprime n (n - 1)" if "n > 0" for n :: nat
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2152	using that coprime_diff_one_left_nat [of n] by (simp add: ac_simps)
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2153
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2154	lemma coprime_crossproduct_nat:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2155	fixes a b c d :: nat
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2156	assumes "coprime a d" and "coprime b c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2157	shows "a * c = b * d \<longleftrightarrow> a = b \<and> c = d"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2158	using assms coprime_crossproduct [of a d b c] by simp
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2159
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2160	lemma coprime_crossproduct_int:
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2161	fixes a b c d :: int
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2162	assumes "coprime a d" and "coprime b c"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2163	shows "\<bar>a\<bar> * \<bar>c\<bar> = \<bar>b\<bar> * \<bar>d\<bar> \<longleftrightarrow> \<bar>a\<bar> = \<bar>b\<bar> \<and> \<bar>c\<bar> = \<bar>d\<bar>"
e7e54a0b9197 dedicated definition for coprimality haftmann parents: 66936 diff changeset	2164	using assms coprime_crossproduct [of a d b c] by simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2165
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2166
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60690 diff changeset	2167	subsection \<open>Bezout's theorem\<close>
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2168
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2169	text \<open>
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2170	Function \<open>bezw\<close> returns a pair of witnesses to Bezout's theorem --
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2171	see the theorems that follow the definition.
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2172	\<close>
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2173
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2174	fun bezw :: "nat \<Rightarrow> nat \<Rightarrow> int * int"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2175	where "bezw x y =
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2176	(if y = 0 then (1, 0)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2177	else
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2178	(snd (bezw y (x mod y)),
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2179	fst (bezw y (x mod y)) - snd (bezw y (x mod y)) * int(x div y)))"
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2180
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2181	lemma bezw_0 [simp]: "bezw x 0 = (1, 0)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2182	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2183
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2184	lemma bezw_non_0:
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2185	"y > 0 \<Longrightarrow> bezw x y =
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2186	(snd (bezw y (x mod y)), fst (bezw y (x mod y)) - snd (bezw y (x mod y)) * int(x div y))"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2187	by simp
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2188
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2189	declare bezw.simps [simp del]
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2190
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2191
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2192	lemma bezw_aux: "int (gcd x y) = fst (bezw x y) * int x + snd (bezw x y) * int y"
31952 40501bb2d57c renamed lemmas: nat_xyz/int_xyz -> xyz_nat/xyz_int nipkow parents: 31814 diff changeset	2193	proof (induct x y rule: gcd_nat_induct)
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2194	case (step m n)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2195	then have "fst (bezw m n) * int m + snd (bezw m n) * int n - int (gcd m n)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2196	= int m * snd (bezw n (m mod n)) -
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2197	(int (m mod n) * snd (bezw n (m mod n)) + int n * (int (m div n) * snd (bezw n (m mod n))))"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2198	by (simp add: bezw_non_0 gcd_non_0_nat field_simps)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2199	also have "\<dots> = int m * snd (bezw n (m mod n)) - (int (m mod n) + int (n * (m div n))) * snd (bezw n (m mod n))"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2200	by (simp add: distrib_right)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2201	also have "\<dots> = 0"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2202	by (metis cancel_comm_monoid_add_class.diff_cancel mod_mult_div_eq of_nat_add)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2203	finally show ?case
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2204	by simp
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2205	qed auto
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2206
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2207
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2208	lemma bezout_int: "\<exists>u v. u * x + v * y = gcd x y"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2209	for x y :: int
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2210	proof -
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2211	have aux: "x \<ge> 0 \<Longrightarrow> y \<ge> 0 \<Longrightarrow> \<exists>u v. u * x + v * y = gcd x y" for x y :: int
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2212	apply (rule_tac x = "fst (bezw (nat x) (nat y))" in exI)
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2213	apply (rule_tac x = "snd (bezw (nat x) (nat y))" in exI)
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2214	by (simp add: bezw_aux gcd_int_def)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2215	consider "x \<ge> 0" "y \<ge> 0" \| "x \<ge> 0" "y \<le> 0" \| "x \<le> 0" "y \<ge> 0" \| "x \<le> 0" "y \<le> 0"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2216	using linear by blast
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2217	then show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2218	proof cases
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2219	case 1
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2220	then show ?thesis by (rule aux)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2221	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2222	case 2
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2223	then show ?thesis
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2224	using aux [of x "-y"]
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2225	by (metis gcd_neg2_int mult.commute mult_minus_right neg_0_le_iff_le)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2226	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2227	case 3
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2228	then show ?thesis
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2229	using aux [of "-x" y]
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2230	by (metis gcd.commute gcd_neg2_int mult.commute mult_minus_right neg_0_le_iff_le)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2231	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2232	case 4
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2233	then show ?thesis
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2234	using aux [of "-x" "-y"]
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2235	by (metis diff_0 diff_ge_0_iff_ge gcd_neg1_int gcd_neg2_int mult.commute mult_minus_right)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2236	qed
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2237	qed
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2238
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2239
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2240	text \<open>Versions of Bezout for \<open>nat\<close>, by Amine Chaieb.\<close>
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2241
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2242	lemma Euclid_induct [case_names swap zero add]:
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2243	fixes P :: "nat \<Rightarrow> nat \<Rightarrow> bool"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2244	assumes c: "\<And>a b. P a b \<longleftrightarrow> P b a"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2245	and z: "\<And>a. P a 0"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2246	and add: "\<And>a b. P a b \<longrightarrow> P a (a + b)"
27669 4b1642284dd7 Tuned and simplified proofs; Rules added to presburger's and algebra's context; moved Bezout theorems from Primes.thy chaieb parents: 27651 diff changeset	2247	shows "P a b"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2248	proof (induct "a + b" arbitrary: a b rule: less_induct)
34915 7894c7dab132 Adapted to changes in induct method. berghofe parents: 34223 diff changeset	2249	case less
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2250	consider (eq) "a = b" \| (lt) "a < b" "a + b - a < a + b" \| "b = 0" \| "b + a - b < a + b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2251	by arith
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2252	show ?case
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2253	proof (cases a b rule: linorder_cases)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2254	case equal
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2255	with add [rule_format, OF z [rule_format, of a]] show ?thesis by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2256	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2257	case lt: less
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2258	then consider "a = 0" \| "a + b - a < a + b" by arith
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2259	then show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2260	proof cases
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2261	case 1
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2262	with z c show ?thesis by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2263	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2264	case 2
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2265	also have *: "a + b - a = a + (b - a)" using lt by arith
34915 7894c7dab132 Adapted to changes in induct method. berghofe parents: 34223 diff changeset	2266	finally have "a + (b - a) < a + b" .
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2267	then have "P a (a + (b - a))" by (rule add [rule_format, OF less])
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2268	then show ?thesis by (simp add: *[symmetric])
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2269	qed
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2270	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2271	case gt: greater
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2272	then consider "b = 0" \| "b + a - b < a + b" by arith
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2273	then show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2274	proof cases
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2275	case 1
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2276	with z c show ?thesis by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2277	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2278	case 2
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2279	also have *: "b + a - b = b + (a - b)" using gt by arith
34915 7894c7dab132 Adapted to changes in induct method. berghofe parents: 34223 diff changeset	2280	finally have "b + (a - b) < a + b" .
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2281	then have "P b (b + (a - b))" by (rule add [rule_format, OF less])
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2282	then have "P b a" by (simp add: *[symmetric])
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2283	with c show ?thesis by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2284	qed
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2285	qed
27669 4b1642284dd7 Tuned and simplified proofs; Rules added to presburger's and algebra's context; moved Bezout theorems from Primes.thy chaieb parents: 27651 diff changeset	2286	qed
4b1642284dd7 Tuned and simplified proofs; Rules added to presburger's and algebra's context; moved Bezout theorems from Primes.thy chaieb parents: 27651 diff changeset	2287
31952 40501bb2d57c renamed lemmas: nat_xyz/int_xyz -> xyz_nat/xyz_int nipkow parents: 31814 diff changeset	2288	lemma bezout_lemma_nat:
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2289	fixes d::nat
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2290	shows "\<lbrakk>d dvd a; d dvd b; a * x = b * y + d \<or> b * x = a * y + d\<rbrakk>
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2291	\<Longrightarrow> \<exists>x y. d dvd a \<and> d dvd a + b \<and> (a * x = (a + b) * y + d \<or> (a + b) * x = a * y + d)"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2292	apply auto
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2293	apply (metis add_mult_distrib2 left_add_mult_distrib)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2294	apply (rule_tac x=x in exI)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2295	by (metis add_mult_distrib2 mult.commute add.assoc)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2296
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2297	lemma bezout_add_nat:
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2298	"\<exists>(d::nat) x y. d dvd a \<and> d dvd b \<and> (a * x = b * y + d \<or> b * x = a * y + d)"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2299	proof (induct a b rule: Euclid_induct)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2300	case (swap a b)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2301	then show ?case
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2302	by blast
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2303	next
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2304	case (zero a)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2305	then show ?case
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2306	by fastforce
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2307	next
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2308	case (add a b)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2309	then show ?case
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2310	by (meson bezout_lemma_nat)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2311	qed
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2312
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2313	lemma bezout1_nat: "\<exists>(d::nat) x y. d dvd a \<and> d dvd b \<and> (a * x - b * y = d \<or> b * x - a * y = d)"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2314	using bezout_add_nat[of a b] by (metis add_diff_cancel_left')
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2315
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2316	lemma bezout_add_strong_nat:
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2317	fixes a b :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2318	assumes a: "a \<noteq> 0"
27669 4b1642284dd7 Tuned and simplified proofs; Rules added to presburger's and algebra's context; moved Bezout theorems from Primes.thy chaieb parents: 27651 diff changeset	2319	shows "\<exists>d x y. d dvd a \<and> d dvd b \<and> a * x = b * y + d"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2320	proof -
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2321	consider d x y where "d dvd a" "d dvd b" "a * x = b * y + d"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2322	\| d x y where "d dvd a" "d dvd b" "b * x = a * y + d"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2323	using bezout_add_nat [of a b] by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2324	then show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2325	proof cases
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2326	case 1
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2327	then show ?thesis by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2328	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2329	case H: 2
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2330	show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2331	proof (cases "b = 0")
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2332	case True
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2333	with H show ?thesis by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2334	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2335	case False
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2336	then have bp: "b > 0" by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2337	with dvd_imp_le [OF H(2)] consider "d = b" \| "d < b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2338	by atomize_elim auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2339	then show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2340	proof cases
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2341	case 1
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2342	with a H show ?thesis
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2343	by (metis Suc_pred add.commute mult.commute mult_Suc_right neq0_conv)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2344	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2345	case 2
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2346	show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2347	proof (cases "x = 0")
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2348	case True
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2349	with a H show ?thesis by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2350	next
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2351	case x0: False
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2352	then have xp: "x > 0" by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2353	from \<open>d < b\<close> have "d \<le> b - 1" by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2354	then have "d * b \<le> b * (b - 1)" by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2355	with xp mult_mono[of "1" "x" "d * b" "b * (b - 1)"]
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2356	have dble: "d * b \<le> x * b * (b - 1)" using bp by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2357	from H(3) have "d + (b - 1) * (b * x) = d + (b - 1) * (a * y + d)"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2358	by simp
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2359	then have "d + (b - 1) * a * y + (b - 1) * d = d + (b - 1) * b * x"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 56218 diff changeset	2360	by (simp only: mult.assoc distrib_left)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2361	then have "a * ((b - 1) * y) + d * (b - 1 + 1) = d + x * b * (b - 1)"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2362	by algebra
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2363	then have "a * ((b - 1) * y) = d + x * b * (b - 1) - d * b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2364	using bp by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2365	then have "a * ((b - 1) * y) = d + (x * b * (b - 1) - d * b)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32879 diff changeset	2366	by (simp only: diff_add_assoc[OF dble, of d, symmetric])
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2367	then have "a * ((b - 1) * y) = b * (x * (b - 1) - d) + d"
59008 f61482b0f240 formally self-contained gcd type classes haftmann parents: 58889 diff changeset	2368	by (simp only: diff_mult_distrib2 ac_simps)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2369	with H(1,2) show ?thesis
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2370	by blast
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2371	qed
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2372	qed
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2373	qed
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2374	qed
27669 4b1642284dd7 Tuned and simplified proofs; Rules added to presburger's and algebra's context; moved Bezout theorems from Primes.thy chaieb parents: 27651 diff changeset	2375	qed
4b1642284dd7 Tuned and simplified proofs; Rules added to presburger's and algebra's context; moved Bezout theorems from Primes.thy chaieb parents: 27651 diff changeset	2376
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2377	lemma bezout_nat:
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2378	fixes a :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2379	assumes a: "a \<noteq> 0"
27669 4b1642284dd7 Tuned and simplified proofs; Rules added to presburger's and algebra's context; moved Bezout theorems from Primes.thy chaieb parents: 27651 diff changeset	2380	shows "\<exists>x y. a * x = b * y + gcd a b"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2381	proof -
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2382	obtain d x y where d: "d dvd a" "d dvd b" and eq: "a * x = b * y + d"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2383	using bezout_add_strong_nat [OF a, of b] by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2384	from d have "d dvd gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2385	by simp
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2386	then obtain k where k: "gcd a b = d * k"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2387	unfolding dvd_def by blast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2388	from eq have "a * x * k = (b * y + d) * k"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2389	by auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2390	then have "a * (x * k) = b * (y * k) + gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2391	by (algebra add: k)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2392	then show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2393	by blast
27669 4b1642284dd7 Tuned and simplified proofs; Rules added to presburger's and algebra's context; moved Bezout theorems from Primes.thy chaieb parents: 27651 diff changeset	2394	qed
4b1642284dd7 Tuned and simplified proofs; Rules added to presburger's and algebra's context; moved Bezout theorems from Primes.thy chaieb parents: 27651 diff changeset	2395
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2396
69593 3dda49e08b9d isabelle update -u control_cartouches; wenzelm parents: 69064 diff changeset	2397	subsection \<open>LCM properties on \<^typ>\<open>nat\<close> and \<^typ>\<open>int\<close>\<close>
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2398
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2399	lemma lcm_altdef_int [code]: "lcm a b = \<bar>a\<bar> * \<bar>b\<bar> div gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2400	for a b :: int
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2401	by (simp add: abs_mult lcm_gcd abs_div)
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2402
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2403	lemma prod_gcd_lcm_nat: "m * n = gcd m n * lcm m n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2404	for m n :: nat
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2405	by (simp add: lcm_gcd)
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30738 diff changeset	2406
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2407	lemma prod_gcd_lcm_int: "\<bar>m\<bar> * \<bar>n\<bar> = gcd m n * lcm m n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2408	for m n :: int
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2409	by (simp add: lcm_gcd abs_div abs_mult)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2410
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2411	lemma lcm_pos_nat: "m > 0 \<Longrightarrow> n > 0 \<Longrightarrow> lcm m n > 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2412	for m n :: nat
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2413	using lcm_eq_0_iff [of m n] by auto
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2414
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2415	lemma lcm_pos_int: "m \<noteq> 0 \<Longrightarrow> n \<noteq> 0 \<Longrightarrow> lcm m n > 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2416	for m n :: int
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2417	by (simp add: less_le lcm_eq_0_iff)
23687 06884f7ffb18 extended - convers now basic lcm properties also haftmann parents: 23431 diff changeset	2418
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2419	lemma dvd_pos_nat: "n > 0 \<Longrightarrow> m dvd n \<Longrightarrow> m > 0" (* FIXME move *)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2420	for m n :: nat
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2421	by auto
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2422
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2423	lemma lcm_unique_nat:
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2424	"a dvd d \<and> b dvd d \<and> (\<forall>e. a dvd e \<and> b dvd e \<longrightarrow> d dvd e) \<longleftrightarrow> d = lcm a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2425	for a b d :: nat
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2426	by (auto intro: dvd_antisym lcm_least)
27568 9949dc7a24de Theorem names as in IntPrimes.thy, also several theorems moved from there chaieb parents: 27556 diff changeset	2427
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2428	lemma lcm_unique_int:
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2429	"d \<ge> 0 \<and> a dvd d \<and> b dvd d \<and> (\<forall>e. a dvd e \<and> b dvd e \<longrightarrow> d dvd e) \<longleftrightarrow> d = lcm a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2430	for a b d :: int
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2431	using lcm_least zdvd_antisym_nonneg by auto
34973 ae634fad947e dropped mk_left_commute; use interpretation of locale abel_semigroup instead haftmann parents: 34915 diff changeset	2432
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2433	lemma lcm_proj2_if_dvd_nat [simp]: "x dvd y \<Longrightarrow> lcm x y = y"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2434	for x y :: nat
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2435	by (simp add: lcm_proj2_if_dvd)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2436
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2437	lemma lcm_proj2_if_dvd_int [simp]: "x dvd y \<Longrightarrow> lcm x y = \<bar>y\<bar>"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2438	for x y :: int
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2439	by (simp add: lcm_proj2_if_dvd)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2440
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2441	lemma lcm_proj1_if_dvd_nat [simp]: "x dvd y \<Longrightarrow> lcm y x = y"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2442	for x y :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2443	by (subst lcm.commute) (erule lcm_proj2_if_dvd_nat)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2444
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2445	lemma lcm_proj1_if_dvd_int [simp]: "x dvd y \<Longrightarrow> lcm y x = \<bar>y\<bar>"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2446	for x y :: int
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2447	by (subst lcm.commute) (erule lcm_proj2_if_dvd_int)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2448
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2449	lemma lcm_proj1_iff_nat [simp]: "lcm m n = m \<longleftrightarrow> n dvd m"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2450	for m n :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2451	by (metis lcm_proj1_if_dvd_nat lcm_unique_nat)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2452
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2453	lemma lcm_proj2_iff_nat [simp]: "lcm m n = n \<longleftrightarrow> m dvd n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2454	for m n :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2455	by (metis lcm_proj2_if_dvd_nat lcm_unique_nat)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2456
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2457	lemma lcm_proj1_iff_int [simp]: "lcm m n = \<bar>m\<bar> \<longleftrightarrow> n dvd m"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2458	for m n :: int
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2459	by (metis dvd_abs_iff lcm_proj1_if_dvd_int lcm_unique_int)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2460
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2461	lemma lcm_proj2_iff_int [simp]: "lcm m n = \<bar>n\<bar> \<longleftrightarrow> m dvd n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2462	for m n :: int
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2463	by (metis dvd_abs_iff lcm_proj2_if_dvd_int lcm_unique_int)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2464
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2465	lemma lcm_1_iff_nat [simp]: "lcm m n = Suc 0 \<longleftrightarrow> m = Suc 0 \<and> n = Suc 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2466	for m n :: nat
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2467	using lcm_eq_1_iff [of m n] by simp
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2468
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2469	lemma lcm_1_iff_int [simp]: "lcm m n = 1 \<longleftrightarrow> (m = 1 \<or> m = -1) \<and> (n = 1 \<or> n = -1)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2470	for m n :: int
61913 58b153bfa737 tuned proofs and augmented some lemmas haftmann parents: 61856 diff changeset	2471	by auto
31995 8f37cf60b885 more gcd/lcm lemmas nipkow parents: 31992 diff changeset	2472
34030 829eb528b226 resorted code equations from "old" number theory version haftmann parents: 33946 diff changeset	2473
69593 3dda49e08b9d isabelle update -u control_cartouches; wenzelm parents: 69064 diff changeset	2474	subsection \<open>The complete divisibility lattice on \<^typ>\<open>nat\<close> and \<^typ>\<open>int\<close>\<close>
32112 6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2475
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2476	text \<open>
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2477	Lifting \<open>gcd\<close> and \<open>lcm\<close> to sets (\<open>Gcd\<close> / \<open>Lcm\<close>).
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2478	\<open>Gcd\<close> is defined via \<open>Lcm\<close> to facilitate the proof that we have a complete lattice.
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60690 diff changeset	2479	\<close>
45264 3b2c770f6631 merge Gcd/GCD and Lcm/LCM huffman parents: 44890 diff changeset	2480
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2481	instantiation nat :: semiring_Gcd
32112 6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2482	begin
6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2483
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2484	interpretation semilattice_neutr_set lcm "1::nat"
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2485	by standard simp_all
54867 c21a2465cac1 prefer ephemeral interpretation over interpretation in proof contexts; haftmann parents: 54489 diff changeset	2486
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2487	definition "Lcm M = (if finite M then F M else 0)" for M :: "nat set"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2488
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2489	lemma Lcm_nat_empty: "Lcm {} = (1::nat)"
60690 a9e45c9588c3 tuned facts haftmann parents: 60689 diff changeset	2490	by (simp add: Lcm_nat_def del: One_nat_def)
51489 f738e6dbd844 fundamental revision of big operators on sets haftmann parents: 49962 diff changeset	2491
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2492	lemma Lcm_nat_insert: "Lcm (insert n M) = lcm n (Lcm M)" for n :: nat
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2493	by (cases "finite M") (auto simp: Lcm_nat_def simp del: One_nat_def)
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2494
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2495	lemma Lcm_nat_infinite: "infinite M \<Longrightarrow> Lcm M = 0" for M :: "nat set"
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2496	by (simp add: Lcm_nat_def)
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2497
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2498	lemma dvd_Lcm_nat [simp]:
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2499	fixes M :: "nat set"
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2500	assumes "m \<in> M"
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2501	shows "m dvd Lcm M"
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2502	proof -
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2503	from assms have "insert m M = M"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2504	by auto
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2505	moreover have "m dvd Lcm (insert m M)"
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2506	by (simp add: Lcm_nat_insert)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2507	ultimately show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2508	by simp
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2509	qed
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2510
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2511	lemma Lcm_dvd_nat [simp]:
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2512	fixes M :: "nat set"
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2513	assumes "\<forall>m\<in>M. m dvd n"
b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2514	shows "Lcm M dvd n"
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2515	proof (cases "n > 0")
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2516	case False
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2517	then show ?thesis by simp
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2518	next
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2519	case True
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2520	then have "finite {d. d dvd n}"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2521	by (rule finite_divisors_nat)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2522	moreover have "M \<subseteq> {d. d dvd n}"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2523	using assms by fast
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2524	ultimately have "finite M"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2525	by (rule rev_finite_subset)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2526	then show ?thesis
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2527	using assms by (induct M) (simp_all add: Lcm_nat_empty Lcm_nat_insert)
61929 b8e242e52c97 tuned proofs and augmented lemmas haftmann parents: 61913 diff changeset	2528	qed
32112 6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2529
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2530	definition "Gcd M = Lcm {d. \<forall>m\<in>M. d dvd m}" for M :: "nat set"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2531
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2532	instance
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2533	proof
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2534	fix N :: "nat set"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2535	fix n :: nat
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2536	show "Gcd N dvd n" if "n \<in> N"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2537	using that by (induct N rule: infinite_finite_induct) (auto simp: Gcd_nat_def)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2538	show "n dvd Gcd N" if "\<And>m. m \<in> N \<Longrightarrow> n dvd m"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2539	using that by (induct N rule: infinite_finite_induct) (auto simp: Gcd_nat_def)
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2540	show "n dvd Lcm N" if "n \<in> N"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2541	using that by (induct N rule: infinite_finite_induct) auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2542	show "Lcm N dvd n" if "\<And>m. m \<in> N \<Longrightarrow> m dvd n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2543	using that by (induct N rule: infinite_finite_induct) auto
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2544	show "normalize (Gcd N) = Gcd N" and "normalize (Lcm N) = Lcm N"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2545	by simp_all
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2546	qed
32112 6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2547
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2548	end
61913 58b153bfa737 tuned proofs and augmented some lemmas haftmann parents: 61856 diff changeset	2549
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2550	lemma Gcd_nat_eq_one: "1 \<in> N \<Longrightarrow> Gcd N = 1"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2551	for N :: "nat set"
62346 97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	2552	by (rule Gcd_eq_1_I) auto
97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	2553
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2554	instance nat :: semiring_gcd_mult_normalize
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2555	by intro_classes (auto simp: unit_factor_nat_def)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2556
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2557
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2558	text \<open>Alternative characterizations of Gcd:\<close>
32112 6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2559
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2560	lemma Gcd_eq_Max:
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2561	fixes M :: "nat set"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2562	assumes "finite (M::nat set)" and "M \<noteq> {}" and "0 \<notin> M"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2563	shows "Gcd M = Max (\<Inter>m\<in>M. {d. d dvd m})"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2564	proof (rule antisym)
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2565	from assms obtain m where "m \<in> M" and "m > 0"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2566	by auto
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2567	from \<open>m > 0\<close> have "finite {d. d dvd m}"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2568	by (blast intro: finite_divisors_nat)
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2569	with \<open>m \<in> M\<close> have fin: "finite (\<Inter>m\<in>M. {d. d dvd m})"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2570	by blast
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2571	from fin show "Gcd M \<le> Max (\<Inter>m\<in>M. {d. d dvd m})"
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2572	by (auto intro: Max_ge Gcd_dvd)
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2573	from fin show "Max (\<Inter>m\<in>M. {d. d dvd m}) \<le> Gcd M"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2574	proof (rule Max.boundedI, simp_all)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2575	show "(\<Inter>m\<in>M. {d. d dvd m}) \<noteq> {}"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2576	by auto
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2577	show "\<And>a. \<forall>x\<in>M. a dvd x \<Longrightarrow> a \<le> Gcd M"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2578	by (meson Gcd_dvd Gcd_greatest \<open>0 < m\<close> \<open>m \<in> M\<close> dvd_imp_le dvd_pos_nat)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2579	qed
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2580	qed
32112 6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2581
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2582	lemma Gcd_remove0_nat: "finite M \<Longrightarrow> Gcd M = Gcd (M - {0})"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2583	for M :: "nat set"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2584	proof (induct pred: finite)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2585	case (insert x M)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2586	then show ?case
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2587	by (simp add: insert_Diff_if)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2588	qed auto
32112 6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2589
6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2590	lemma Lcm_in_lcm_closed_set_nat:
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2591	fixes M :: "nat set"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2592	assumes "finite M" "M \<noteq> {}" "\<And>m n. \<lbrakk>m \<in> M; n \<in> M\<rbrakk> \<Longrightarrow> lcm m n \<in> M"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2593	shows "Lcm M \<in> M"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2594	using assms
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2595	proof (induction M rule: finite_linorder_min_induct)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2596	case (insert x M)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2597	then have "\<And>m n. m \<in> M \<Longrightarrow> n \<in> M \<Longrightarrow> lcm m n \<in> M"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2598	by (metis dvd_lcm1 gr0I insert_iff lcm_pos_nat nat_dvd_not_less)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2599	with insert show ?case
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2600	by simp (metis Lcm_nat_empty One_nat_def dvd_1_left dvd_lcm2)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2601	qed auto
32112 6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2602
6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2603	lemma Lcm_eq_Max_nat:
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2604	fixes M :: "nat set"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2605	assumes M: "finite M" "M \<noteq> {}" "0 \<notin> M" and lcm: "\<And>m n. \<lbrakk>m \<in> M; n \<in> M\<rbrakk> \<Longrightarrow> lcm m n \<in> M"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2606	shows "Lcm M = Max M"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2607	proof (rule antisym)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2608	show "Lcm M \<le> Max M"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2609	by (simp add: Lcm_in_lcm_closed_set_nat \<open>finite M\<close> \<open>M \<noteq> {}\<close> lcm)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2610	show "Max M \<le> Lcm M"
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2611	by (meson Lcm_0_iff Max_in M dvd_Lcm dvd_imp_le le_0_eq not_le)
77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2612	qed
32112 6da9c2a49fed Made dvd/gcd/lcm a complete lattice by introducing Gcd/GCD/Lcm/LCM nipkow parents: 32111 diff changeset	2613
34222 e33ee7369ecb added lemma nipkow parents: 34221 diff changeset	2614	lemma mult_inj_if_coprime_nat:
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2615	"inj_on f A \<Longrightarrow> inj_on g B \<Longrightarrow> (\<And>a b. \<lbrakk>a\<in>A; b\<in>B\<rbrakk> \<Longrightarrow> coprime (f a) (g b)) \<Longrightarrow>
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2616	inj_on (\<lambda>(a, b). f a * g b) (A \<times> B)"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2617	for f :: "'a \<Rightarrow> nat" and g :: "'b \<Rightarrow> nat"
68708 77858f347020 de-applying paulson <lp15@cam.ac.uk> parents: 68270 diff changeset	2618	by (auto simp: inj_on_def coprime_crossproduct_nat simp del: One_nat_def)
34222 e33ee7369ecb added lemma nipkow parents: 34221 diff changeset	2619
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2620
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2621	subsubsection \<open>Setwise GCD and LCM for integers\<close>
45264 3b2c770f6631 merge Gcd/GCD and Lcm/LCM huffman parents: 44890 diff changeset	2622
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2623	instantiation int :: Gcd
45264 3b2c770f6631 merge Gcd/GCD and Lcm/LCM huffman parents: 44890 diff changeset	2624	begin
3b2c770f6631 merge Gcd/GCD and Lcm/LCM huffman parents: 44890 diff changeset	2625
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2626	definition Gcd_int :: "int set \<Rightarrow> int"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2627	where "Gcd K = int (GCD k\<in>K. (nat \<circ> abs) k)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2628
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2629	definition Lcm_int :: "int set \<Rightarrow> int"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2630	where "Lcm K = int (LCM k\<in>K. (nat \<circ> abs) k)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2631
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2632	instance ..
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2633
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2634	end
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2635
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2636	lemma Gcd_int_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2637	"(GCD n\<in>N. int n) = int (Gcd N)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2638	by (simp add: Gcd_int_def image_image)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2639
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2640	lemma Gcd_nat_abs_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2641	"(GCD k\<in>K. nat \<bar>k\<bar>) = nat (Gcd K)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2642	by (simp add: Gcd_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2643
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2644	lemma abs_Gcd_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2645	"\<bar>Gcd K\<bar> = Gcd K" for K :: "int set"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2646	by (simp only: Gcd_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2647
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2648	lemma Gcd_int_greater_eq_0 [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2649	"Gcd K \<ge> 0"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2650	for K :: "int set"
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2651	using abs_ge_zero [of "Gcd K"] by simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2652
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2653	lemma Gcd_abs_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2654	"(GCD k\<in>K. \<bar>k\<bar>) = Gcd K"
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2655	for K :: "int set"
67118 ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2656	by (simp only: Gcd_int_def image_image) simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2657
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2658	lemma Lcm_int_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2659	"(LCM n\<in>N. int n) = int (Lcm N)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2660	by (simp add: Lcm_int_def image_image)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2661
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2662	lemma Lcm_nat_abs_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2663	"(LCM k\<in>K. nat \<bar>k\<bar>) = nat (Lcm K)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2664	by (simp add: Lcm_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2665
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2666	lemma abs_Lcm_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2667	"\<bar>Lcm K\<bar> = Lcm K" for K :: "int set"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2668	by (simp only: Lcm_int_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2669
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2670	lemma Lcm_int_greater_eq_0 [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2671	"Lcm K \<ge> 0"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2672	for K :: "int set"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2673	using abs_ge_zero [of "Lcm K"] by simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2674
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2675	lemma Lcm_abs_eq [simp]:
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2676	"(LCM k\<in>K. \<bar>k\<bar>) = Lcm K"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2677	for K :: "int set"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2678	by (simp only: Lcm_int_def image_image) simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2679
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2680	instance int :: semiring_Gcd
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2681	proof
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2682	fix K :: "int set" and k :: int
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2683	show "Gcd K dvd k" and "k dvd Lcm K" if "k \<in> K"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2684	using that Gcd_dvd [of "nat \<bar>k\<bar>" "(nat \<circ> abs) ` K"]
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2685	dvd_Lcm [of "nat \<bar>k\<bar>" "(nat \<circ> abs) ` K"]
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2686	by (simp_all add: comp_def)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2687	show "k dvd Gcd K" if "\<And>l. l \<in> K \<Longrightarrow> k dvd l"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2688	proof -
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2689	have "nat \<bar>k\<bar> dvd (GCD k\<in>K. nat \<bar>k\<bar>)"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2690	by (rule Gcd_greatest) (use that in auto)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2691	then show ?thesis by simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2692	qed
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2693	show "Lcm K dvd k" if "\<And>l. l \<in> K \<Longrightarrow> l dvd k"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2694	proof -
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2695	have "(LCM k\<in>K. nat \<bar>k\<bar>) dvd nat \<bar>k\<bar>"
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2696	by (rule Lcm_least) (use that in auto)
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2697	then show ?thesis by simp
ccab07d1196c more simplification rules haftmann parents: 67051 diff changeset	2698	qed
71398 e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2699	qed (simp_all add: sgn_mult)
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2700
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2701	instance int :: semiring_gcd_mult_normalize
e0237f2eb49d Removed multiplicativity assumption from normalization_semidom Manuel Eberl <eberlm@in.tum.de> parents: 69906 diff changeset	2702	by intro_classes (auto simp: sgn_mult)
62346 97f2ed240431 more theorems concerning gcd/lcm/Gcd/Lcm haftmann parents: 62345 diff changeset	2703
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2704
69593 3dda49e08b9d isabelle update -u control_cartouches; wenzelm parents: 69064 diff changeset	2705	subsection \<open>GCD and LCM on \<^typ>\<open>integer\<close>\<close>
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2706
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2707	instantiation integer :: gcd
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2708	begin
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2709
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2710	context
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2711	includes integer.lifting
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2712	begin
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2713
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2714	lift_definition gcd_integer :: "integer \<Rightarrow> integer \<Rightarrow> integer" is gcd .
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2715
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2716	lift_definition lcm_integer :: "integer \<Rightarrow> integer \<Rightarrow> integer" is lcm .
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2717
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2718	end
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2719
45264 3b2c770f6631 merge Gcd/GCD and Lcm/LCM huffman parents: 44890 diff changeset	2720	instance ..
60686 ea5bc46c11e6 more algebraic properties for gcd/lcm haftmann parents: 60597 diff changeset	2721
21256 47195501ecf7 moved theories Parity, GCD, Binomial to Library; wenzelm parents: diff changeset	2722	end
45264 3b2c770f6631 merge Gcd/GCD and Lcm/LCM huffman parents: 44890 diff changeset	2723
61856 4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2724	lifting_update integer.lifting
4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2725	lifting_forget integer.lifting
4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2726
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2727	context
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2728	includes integer.lifting
e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2729	begin
61856 4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2730
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2731	lemma gcd_code_integer [code]: "gcd k l = \<bar>if l = (0::integer) then k else gcd l (\<bar>k\<bar> mod \<bar>l\<bar>)\<bar>"
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2732	by transfer (fact gcd_code_int)
61856 4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2733
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2734	lemma lcm_code_integer [code]: "lcm a b = \<bar>a\<bar> * \<bar>b\<bar> div gcd a b"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2735	for a b :: integer
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2736	by transfer (fact lcm_altdef_int)
61856 4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2737
4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2738	end
4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2739
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2740	code_printing
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2741	constant "gcd :: integer \<Rightarrow> _" \<rightharpoonup>
69906 55534affe445 migrated from Nums to Zarith as library for OCaml integer arithmetic haftmann parents: 69785 diff changeset	2742	(OCaml) "!(fun k l -> if Z.equal k Z.zero then/ Z.abs l else if Z.equal/ l Z.zero then Z.abs k else Z.gcd k l)"
61856 4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2743	and (Haskell) "Prelude.gcd"
4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2744	and (Scala) "_.gcd'((_)')"
61975 b4b11391c676 isabelle update_cartouches -c -t; wenzelm parents: 61954 diff changeset	2745	\<comment> \<open>There is no gcd operation in the SML standard library, so no code setup for SML\<close>
61856 4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2746
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2747	text \<open>Some code equations\<close>
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2748
64850 fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	2749	lemmas Gcd_nat_set_eq_fold [code] = Gcd_set_eq_fold [where ?'a = nat]
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	2750	lemmas Lcm_nat_set_eq_fold [code] = Lcm_set_eq_fold [where ?'a = nat]
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	2751	lemmas Gcd_int_set_eq_fold [code] = Gcd_set_eq_fold [where ?'a = int]
fc9265882329 gcd/lcm on finite sets haftmann parents: 64591 diff changeset	2752	lemmas Lcm_int_set_eq_fold [code] = Lcm_set_eq_fold [where ?'a = int]
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2753
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2754	text \<open>Fact aliases.\<close>
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2755
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2756	lemma lcm_0_iff_nat [simp]: "lcm m n = 0 \<longleftrightarrow> m = 0 \<or> n = 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2757	for m n :: nat
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2758	by (fact lcm_eq_0_iff)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2759
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2760	lemma lcm_0_iff_int [simp]: "lcm m n = 0 \<longleftrightarrow> m = 0 \<or> n = 0"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2761	for m n :: int
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2762	by (fact lcm_eq_0_iff)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2763
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2764	lemma dvd_lcm_I1_nat [simp]: "k dvd m \<Longrightarrow> k dvd lcm m n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2765	for k m n :: nat
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2766	by (fact dvd_lcmI1)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2767
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2768	lemma dvd_lcm_I2_nat [simp]: "k dvd n \<Longrightarrow> k dvd lcm m n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2769	for k m n :: nat
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2770	by (fact dvd_lcmI2)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2771
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2772	lemma dvd_lcm_I1_int [simp]: "i dvd m \<Longrightarrow> i dvd lcm m n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2773	for i m n :: int
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2774	by (fact dvd_lcmI1)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2775
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2776	lemma dvd_lcm_I2_int [simp]: "i dvd n \<Longrightarrow> i dvd lcm m n"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2777	for i m n :: int
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2778	by (fact dvd_lcmI2)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2779
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2780	lemmas Gcd_dvd_nat [simp] = Gcd_dvd [where ?'a = nat]
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2781	lemmas Gcd_dvd_int [simp] = Gcd_dvd [where ?'a = int]
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2782	lemmas Gcd_greatest_nat [simp] = Gcd_greatest [where ?'a = nat]
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2783	lemmas Gcd_greatest_int [simp] = Gcd_greatest [where ?'a = int]
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2784
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2785	lemma dvd_Lcm_int [simp]: "m \<in> M \<Longrightarrow> m dvd Lcm M"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2786	for M :: "int set"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2787	by (fact dvd_Lcm)
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2788
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2789	lemma gcd_neg_numeral_1_int [simp]: "gcd (- numeral n :: int) x = gcd (numeral n) x"
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2790	by (fact gcd_neg1_int)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2791
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2792	lemma gcd_neg_numeral_2_int [simp]: "gcd x (- numeral n :: int) = gcd x (numeral n)"
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2793	by (fact gcd_neg2_int)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2794
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2795	lemma gcd_proj1_if_dvd_nat [simp]: "x dvd y \<Longrightarrow> gcd x y = x"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2796	for x y :: nat
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2797	by (fact gcd_nat.absorb1)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2798
63489 cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2799	lemma gcd_proj2_if_dvd_nat [simp]: "y dvd x \<Longrightarrow> gcd x y = y"
cd540c8031a4 misc tuning and modernization; wenzelm parents: 63359 diff changeset	2800	for x y :: nat
62344 759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2801	by (fact gcd_nat.absorb2)
759d684c0e60 pulled out legacy aliasses and infamous dvd interpretations into theory appendix haftmann parents: 62343 diff changeset	2802
73109 783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2803	lemma Gcd_in:
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2804	fixes A :: "nat set"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2805	assumes "\<And>a b. a \<in> A \<Longrightarrow> b \<in> A \<Longrightarrow> gcd a b \<in> A"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2806	assumes "A \<noteq> {}"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2807	shows "Gcd A \<in> A"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2808	proof (cases "A = {0}")
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2809	case False
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2810	with assms obtain x where "x \<in> A" "x > 0"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2811	by auto
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2812	thus "Gcd A \<in> A"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2813	proof (induction x rule: less_induct)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2814	case (less x)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2815	show ?case
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2816	proof (cases "x = Gcd A")
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2817	case False
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2818	have "\<exists>y\<in>A. \<not>x dvd y"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2819	using False less.prems by (metis Gcd_dvd Gcd_greatest_nat gcd_nat.asym)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2820	then obtain y where y: "y \<in> A" "\<not>x dvd y"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2821	by blast
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2822	have "gcd x y \<in> A"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2823	by (rule assms(1)) (use \<open>x \<in> A\<close> y in auto)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2824	moreover have "gcd x y < x"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2825	using \<open>x > 0\<close> y by (metis gcd_dvd1 gcd_dvd2 nat_dvd_not_less nat_neq_iff)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2826	moreover have "gcd x y > 0"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2827	using \<open>x > 0\<close> by auto
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2828	ultimately show ?thesis using less.IH by blast
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2829	qed (use less in auto)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2830	qed
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2831	qed auto
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2832
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2833	lemma bezout_gcd_nat':
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2834	fixes a b :: nat
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2835	shows "\<exists>x y. b * y \<le> a * x \<and> a * x - b * y = gcd a b \<or> a * y \<le> b * x \<and> b * x - a * y = gcd a b"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2836	using bezout_nat[of a b]
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2837	by (metis add_diff_cancel_left' diff_zero gcd.commute gcd_0_nat
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2838	le_add_same_cancel1 mult.right_neutral zero_le)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2839
62353 7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2840	lemmas Lcm_eq_0_I_nat [simp] = Lcm_eq_0_I [where ?'a = nat]
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2841	lemmas Lcm_0_iff_nat [simp] = Lcm_0_iff [where ?'a = nat]
7f927120b5a2 dropped various legacy fact bindings and tuned proofs haftmann parents: 62350 diff changeset	2842	lemmas Lcm_least_int [simp] = Lcm_least [where ?'a = int]
62345 e66d7841d5a2 further generalization and polishing haftmann parents: 62344 diff changeset	2843
73109 783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2844
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2845	subsection \<open>Characteristic of a semiring\<close>
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2846
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2847	definition (in semiring_1) semiring_char :: "'a itself \<Rightarrow> nat"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2848	where "semiring_char _ = Gcd {n. of_nat n = (0 :: 'a)}"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2849
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2850	context semiring_1
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2851	begin
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2852
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2853	context
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2854	fixes CHAR :: nat
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2855	defines "CHAR \<equiv> semiring_char (Pure.type :: 'a itself)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2856	begin
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2857
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2858	lemma of_nat_CHAR [simp]: "of_nat CHAR = (0 :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2859	proof -
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2860	have "CHAR \<in> {n. of_nat n = (0::'a)}"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2861	unfolding CHAR_def semiring_char_def
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2862	proof (rule Gcd_in, clarify)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2863	fix a b :: nat
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2864	assume *: "of_nat a = (0 :: 'a)" "of_nat b = (0 :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2865	show "of_nat (gcd a b) = (0 :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2866	proof (cases "a = 0")
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2867	case False
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2868	with bezout_nat obtain x y where "a * x = b * y + gcd a b"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2869	by blast
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2870	hence "of_nat (a * x) = (of_nat (b * y + gcd a b) :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2871	by (rule arg_cong)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2872	thus "of_nat (gcd a b) = (0 :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2873	using * by simp
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2874	qed (use * in auto)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2875	next
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2876	have "of_nat 0 = (0 :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2877	by simp
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2878	thus "{n. of_nat n = (0 :: 'a)} \<noteq> {}"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2879	by blast
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2880	qed
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2881	thus ?thesis
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2882	by simp
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2883	qed
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2884
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2885	lemma of_nat_eq_0_iff_char_dvd: "of_nat n = (0 :: 'a) \<longleftrightarrow> CHAR dvd n"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2886	proof
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2887	assume "of_nat n = (0 :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2888	thus "CHAR dvd n"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2889	unfolding CHAR_def semiring_char_def by (intro Gcd_dvd) auto
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2890	next
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2891	assume "CHAR dvd n"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2892	then obtain m where "n = CHAR * m"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2893	by auto
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2894	thus "of_nat n = (0 :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2895	by simp
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2896	qed
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2897
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2898	lemma CHAR_eqI:
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2899	assumes "of_nat c = (0 :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2900	assumes "\<And>x. of_nat x = (0 :: 'a) \<Longrightarrow> c dvd x"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2901	shows "CHAR = c"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2902	using assms by (intro dvd_antisym) (auto simp: of_nat_eq_0_iff_char_dvd)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2903
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2904	lemma CHAR_eq0_iff: "CHAR = 0 \<longleftrightarrow> (\<forall>n>0. of_nat n \<noteq> (0::'a))"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2905	by (auto simp: of_nat_eq_0_iff_char_dvd)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2906
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2907	lemma CHAR_pos_iff: "CHAR > 0 \<longleftrightarrow> (\<exists>n>0. of_nat n = (0::'a))"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2908	using CHAR_eq0_iff neq0_conv by blast
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2909
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2910	lemma CHAR_eq_posI:
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2911	assumes "c > 0" "of_nat c = (0 :: 'a)" "\<And>x. x > 0 \<Longrightarrow> x < c \<Longrightarrow> of_nat x \<noteq> (0 :: 'a)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2912	shows "CHAR = c"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2913	proof (rule antisym)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2914	from assms have "CHAR > 0"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2915	by (auto simp: CHAR_pos_iff)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2916	from assms(3)[OF this] show "CHAR \<ge> c"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2917	by force
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2918	next
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2919	have "CHAR dvd c"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2920	using assms by (auto simp: of_nat_eq_0_iff_char_dvd)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2921	thus "CHAR \<le> c"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2922	using \<open>c > 0\<close> by (intro dvd_imp_le) auto
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2923	qed
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2924
61856 4b1b85f38944 add gcd instance for integer and serialisation to target language operations Andreas Lochbihler parents: 61799 diff changeset	2925	end
73109 783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2926	end
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2927
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2928	lemma (in semiring_char_0) CHAR_eq_0 [simp]: "semiring_char (Pure.type :: 'a itself) = 0"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2929	by (simp add: CHAR_eq0_iff)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2930
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2931
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2932	(* nicer notation *)
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2933
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2934	syntax "_type_char" :: "type => nat" ("(1CHAR/(1'(_')))")
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2935
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2936	translations "CHAR('t)" => "CONST semiring_char (CONST Pure.type :: 't itself)"
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2937
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2938	print_translation \<open>
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2939	let
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2940	fun char_type_tr' ctxt [Const (\<^const_syntax>\<open>Pure.type\<close>, Type (_, [T]))] =
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2941	Syntax.const \<^syntax_const>\<open>_type_char\<close> $ Syntax_Phases.term_of_typ ctxt T
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2942	in [(\<^const_syntax>\<open>semiring_char\<close>, char_type_tr')] end
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2943	\<close>
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2944
783406dd051e some algebra material for HOL: characteristic of a ring, algebraic integers Manuel Eberl <eberlm@in.tum.de> parents: 71398 diff changeset	2945	end

author	wenzelm
	Mon, 06 Feb 2023 15:04:21 +0100
changeset 77208	a3f67a4459e1
parent 77172	816959264c32
child 79544	50ee2921da94
permissions	-rw-r--r--