(* Title: HOL/GCD.thy Author: Christophe Tabacznyj Author: Lawrence C. Paulson Author: Amine Chaieb Author: Thomas M. Rasmussen Author: Jeremy Avigad Author: Tobias Nipkow
This file deals with the functions gcd and lcm. Definitions and lemmas are proved uniformly for the natural numbers and integers.
This file combines and revises a number of prior developments.
The original theories "GCD" and "Primes" were by Christophe Tabacznyj and Lawrence C. Paulson, based on @{cite davenport92}. They introduced gcd, lcm, and prime for the natural numbers.
The original theory "IntPrimes" was by Thomas M. Rasmussen, and extended gcd, lcm, primes to the integers. Amine Chaieb provided another extension of the notions to the integers, and added a number of results to "Primes" and "GCD". IntPrimes also defined and developed the congruence relations on the integers. The notion was extended to the natural numbers by Chaieb.
Jeremy Avigad combined all of these, made everything uniform for the natural numbers and the integers, and added a number of new theorems.
Tobias Nipkow cleaned up a lot.
*)
section \<open>Greatest common divisor and least common multiple\<close>
theory GCD imports Groups_List Code_Numeral begin
subsection \<open>Abstract bounded quasi semilattices as common foundation\<close>
locale bounded_quasi_semilattice = abel_semigroup + fixes top :: 'a (\\<^bold>\\) and bot :: 'a (\\<^bold>\\) and normalize :: "'a \ 'a" assumes idem_normalize [simp]: "a \<^bold>* a = normalize a" and normalize_left_idem [simp]: "normalize a \<^bold>* b = a \<^bold>* b" and normalize_idem [simp]: "normalize (a \<^bold>* b) = a \<^bold>* b" and normalize_top [simp]: "normalize \<^bold>\ = \<^bold>\" and normalize_bottom [simp]: "normalize \<^bold>\ = \<^bold>\" and top_left_normalize [simp]: "\<^bold>\ \<^bold>* a = normalize a" and bottom_left_bottom [simp]: "\<^bold>\ \<^bold>* a = \<^bold>\" begin
lemma left_idem [simp]: "a \<^bold>* (a \<^bold>* b) = a \<^bold>* b" using assoc [of a a b, symmetric] by simp
lemma right_idem [simp]: "(a \<^bold>* b) \<^bold>* b = a \<^bold>* b" using left_idem [of b a] by (simp add: ac_simps)
lemma comp_fun_idem: "comp_fun_idem f" by standard (simp_all add: fun_eq_iff ac_simps)
interpretation comp_fun_idem f by (fact comp_fun_idem)
lemma top_right_normalize [simp]: "a \<^bold>* \<^bold>\ = normalize a" using top_left_normalize [of a] by (simp add: ac_simps)
lemma bottom_right_bottom [simp]: "a \<^bold>* \<^bold>\ = \<^bold>\" using bottom_left_bottom [of a] by (simp add: ac_simps)
lemma normalize_right_idem [simp]: "a \<^bold>* normalize b = a \<^bold>* b" using normalize_left_idem [of b a] by (simp add: ac_simps)
end
locale bounded_quasi_semilattice_set = bounded_quasi_semilattice begin
interpretation comp_fun_idem f by (fact comp_fun_idem)
definition F :: "'a set \ 'a" where
eq_fold: "F A = (if finite A then Finite_Set.fold f \<^bold>\ A else \<^bold>\)"
lemma infinite [simp]: "infinite A \ F A = \<^bold>\" by (simp add: eq_fold)
lemma set_eq_fold [code]: "F (set xs) = fold f xs \<^bold>\" by (simp add: eq_fold fold_set_fold)
lemma insert [simp]: "F (insert a A) = a \<^bold>* F A" by (cases "finite A") (simp_all add: eq_fold)
lemma normalize [simp]: "normalize (F A) = F A" by (induct A rule: infinite_finite_induct) simp_all
lemma in_idem: assumes"a \ A" shows"a \<^bold>* F A = F A" using assms by (induct A rule: infinite_finite_induct)
(auto simp: left_commute [of a])
lemma union: "F (A \ B) = F A \<^bold>* F B" by (induct A rule: infinite_finite_induct)
(simp_all add: ac_simps)
lemma remove: assumes"a \ A" shows"F A = a \<^bold>* F (A - {a})" proof - from assms obtain B where"A = insert a B"and"a \ B" by (blast dest: mk_disjoint_insert) with assms show ?thesis by simp qed
lemma insert_remove: "F (insert a A) = a \<^bold>* F (A - {a})" by (cases "a \ A") (simp_all add: insert_absorb remove)
lemma subset: assumes"B \ A" shows"F B \<^bold>* F A = F A" using assms by (simp add: union [symmetric] Un_absorb1)
end
subsection \<open>Abstract GCD and LCM\<close>
class gcd = zero + one + dvd + fixes gcd :: "'a \ 'a \ 'a" and lcm :: "'a \ 'a \ 'a"
class Gcd = gcd + fixes Gcd :: "'a set \ 'a" and Lcm :: "'a set \ 'a"
syntax_consts "_GCD1""_GCD"\<rightleftharpoons> Gcd and "_LCM1""_LCM"\<rightleftharpoons> Lcm
translations "GCD x y. f"\<rightleftharpoons> "GCD x. GCD y. f" "GCD x. f"\<rightleftharpoons> "CONST Gcd (CONST range (\<lambda>x. f))" "GCD x\A. f" \ "CONST Gcd ((\x. f) ` A)" "LCM x y. f"\<rightleftharpoons> "LCM x. LCM y. f" "LCM x. f"\<rightleftharpoons> "CONST Lcm (CONST range (\<lambda>x. f))" "LCM x\A. f" \ "CONST Lcm ((\x. f) ` A)"
class semiring_gcd = normalization_semidom + gcd + assumes gcd_dvd1 [iff]: "gcd a b dvd a" and gcd_dvd2 [iff]: "gcd a b dvd b" and gcd_greatest: "c dvd a \ c dvd b \ c dvd gcd a b" and normalize_gcd [simp]: "normalize (gcd a b) = gcd a b" and lcm_gcd: "lcm a b = normalize (a * b div gcd a b)" begin
lemma gcd_greatest_iff [simp]: "a dvd gcd b c \ a dvd b \ a dvd c" by (blast intro!: gcd_greatest intro: dvd_trans)
lemma gcd_dvdI1: "a dvd c \ gcd a b dvd c" by (rule dvd_trans) (rule gcd_dvd1)
lemma gcd_dvdI2: "b dvd c \ gcd a b dvd c" by (rule dvd_trans) (rule gcd_dvd2)
lemma dvd_gcdD1: "a dvd gcd b c \ a dvd b" using gcd_dvd1 [of b c] by (blast intro: dvd_trans)
lemma dvd_gcdD2: "a dvd gcd b c \ a dvd c" using gcd_dvd2 [of b c] by (blast intro: dvd_trans)
lemma gcd_0_left [simp]: "gcd 0 a = normalize a" by (rule associated_eqI) simp_all
lemma gcd_0_right [simp]: "gcd a 0 = normalize a" by (rule associated_eqI) simp_all
lemma gcd_eq_0_iff [simp]: "gcd a b = 0 \ a = 0 \ b = 0"
(is"?P \ ?Q") proof assume ?P thenhave"0 dvd gcd a b" by simp thenhave"0 dvd a"and"0 dvd b" by (blast intro: dvd_trans)+ thenshow ?Q by simp next assume ?Q thenshow ?P by simp qed
lemma unit_factor_gcd: "unit_factor (gcd a b) = (if a = 0 \ b = 0 then 0 else 1)" proof (cases "gcd a b = 0") case True thenshow ?thesis by simp next case False have"unit_factor (gcd a b) * normalize (gcd a b) = gcd a b" by (rule unit_factor_mult_normalize) thenhave"unit_factor (gcd a b) * gcd a b = gcd a b" by simp thenhave"unit_factor (gcd a b) * gcd a b div gcd a b = gcd a b div gcd a b" by simp with False show ?thesis by simp qed
lemma is_unit_gcd_iff [simp]: "is_unit (gcd a b) \ gcd a b = 1" by (cases "a = 0 \ b = 0") (auto simp: unit_factor_gcd dest: is_unit_unit_factor)
sublocale gcd: abel_semigroup gcd proof fix a b c show"gcd a b = gcd b a" by (rule associated_eqI) simp_all from gcd_dvd1 have"gcd (gcd a b) c dvd a" by (rule dvd_trans) simp moreoverfrom gcd_dvd1 have"gcd (gcd a b) c dvd b" by (rule dvd_trans) simp ultimatelyhave P1: "gcd (gcd a b) c dvd gcd a (gcd b c)" by (auto intro!: gcd_greatest) from gcd_dvd2 have"gcd a (gcd b c) dvd b" by (rule dvd_trans) simp moreoverfrom gcd_dvd2 have"gcd a (gcd b c) dvd c" by (rule dvd_trans) simp ultimatelyhave P2: "gcd a (gcd b c) dvd gcd (gcd a b) c" by (auto intro!: gcd_greatest) from P1 P2 show"gcd (gcd a b) c = gcd a (gcd b c)" by (rule associated_eqI) simp_all qed
sublocale gcd: bounded_quasi_semilattice gcd 0 1 normalize proof show"gcd a a = normalize a"for a proof - have"a dvd gcd a a" by (rule gcd_greatest) simp_all thenshow ?thesis by (auto intro: associated_eqI) qed show"gcd (normalize a) b = gcd a b"for a b using gcd_dvd1 [of "normalize a" b] by (auto intro: associated_eqI) show"gcd 1 a = 1"for a by (rule associated_eqI) simp_all qed simp_all
lemma gcd_self: "gcd a a = normalize a" by (fact gcd.idem_normalize)
lemma gcd_left_idem: "gcd a (gcd a b) = gcd a b" by (fact gcd.left_idem)
lemma gcd_right_idem: "gcd (gcd a b) b = gcd a b" by (fact gcd.right_idem)
lemma gcdI: assumes"c dvd a"and"c dvd b" and greatest: "\d. d dvd a \ d dvd b \ d dvd c" and"normalize c = c" shows"c = gcd a b" by (rule associated_eqI) (auto simp: assms intro: gcd_greatest)
lemma gcd_unique: "d dvd a \ d dvd b \ normalize d = d \ (\e. e dvd a \ e dvd b \ e dvd d) \ d = gcd a b" by rule (auto intro: gcdI simp: gcd_greatest)
lemma gcd_dvd_prod: "gcd a b dvd k * b" using mult_dvd_mono [of 1] by auto
lemma gcd_proj2_if_dvd: "b dvd a \ gcd a b = normalize b" by (rule gcdI [symmetric]) simp_all
lemma gcd_proj1_if_dvd: "a dvd b \ gcd a b = normalize a" by (rule gcdI [symmetric]) simp_all
lemma gcd_proj1_iff: "gcd m n = normalize m \ m dvd n" proof assume *: "gcd m n = normalize m" show"m dvd n" proof (cases "m = 0") case True with * show ?thesis by simp next case [simp]: False from * have **: "m = gcd m n * unit_factor m" by (simp add: unit_eq_div2) show ?thesis by (subst **) (simp add: mult_unit_dvd_iff) qed next assume"m dvd n" thenshow"gcd m n = normalize m" by (rule gcd_proj1_if_dvd) qed
lemma gcd_proj2_iff: "gcd m n = normalize n \ n dvd m" using gcd_proj1_iff [of n m] by (simp add: ac_simps)
lemma gcd_mult_left: "gcd (c * a) (c * b) = normalize (c * gcd a b)" proof (cases "c = 0") case True thenshow ?thesis by simp next case False thenhave *: "c * gcd a b dvd gcd (c * a) (c * b)" by (auto intro: gcd_greatest) moreoverfrom False * have"gcd (c * a) (c * b) dvd c * gcd a b" by (metis div_dvd_iff_mult dvd_mult_left gcd_dvd1 gcd_dvd2 gcd_greatest mult_commute) ultimatelyhave"normalize (gcd (c * a) (c * b)) = normalize (c * gcd a b)" by (auto intro: associated_eqI) thenshow ?thesis by (simp add: normalize_mult) qed
lemma gcd_mult_right: "gcd (a * c) (b * c) = normalize (gcd b a * c)" using gcd_mult_left [of c a b] by (simp add: ac_simps)
lemma dvd_lcm1 [iff]: "a dvd lcm a b" by (metis div_mult_swap dvd_mult2 dvd_normalize_iff dvd_refl gcd_dvd2 lcm_gcd)
lemma dvd_lcm2 [iff]: "b dvd lcm a b" by (metis dvd_div_mult dvd_mult dvd_normalize_iff dvd_refl gcd_dvd1 lcm_gcd)
lemma dvd_lcmI1: "a dvd b \ a dvd lcm b c" by (rule dvd_trans) (assumption, blast)
lemma dvd_lcmI2: "a dvd c \ a dvd lcm b c" by (rule dvd_trans) (assumption, blast)
lemma lcm_dvdD1: "lcm a b dvd c \ a dvd c" using dvd_lcm1 [of a b] by (blast intro: dvd_trans)
lemma lcm_dvdD2: "lcm a b dvd c \ b dvd c" using dvd_lcm2 [of a b] by (blast intro: dvd_trans)
lemma lcm_least: assumes"a dvd c"and"b dvd c" shows"lcm a b dvd c" proof (cases "c = 0") case True thenshow ?thesis by simp next case False thenhave *: "is_unit (unit_factor c)" by simp show ?thesis proof (cases "gcd a b = 0") case True with assms show ?thesis by simp next case False have"a * b dvd normalize (c * gcd a b)" using assms by (subst gcd_mult_left [symmetric]) (auto intro!: gcd_greatest simp: mult_ac) with False have"(a * b div gcd a b) dvd c" by (subst div_dvd_iff_mult) auto thus ?thesis by (simp add: lcm_gcd) qed qed
lemma lcm_least_iff [simp]: "lcm a b dvd c \ a dvd c \ b dvd c" by (blast intro!: lcm_least intro: dvd_trans)
lemma normalize_lcm [simp]: "normalize (lcm a b) = lcm a b" by (simp add: lcm_gcd dvd_normalize_div)
lemma lcm_0_left [simp]: "lcm 0 a = 0" by (simp add: lcm_gcd)
lemma lcm_0_right [simp]: "lcm a 0 = 0" by (simp add: lcm_gcd)
lemma lcm_eq_0_iff: "lcm a b = 0 \ a = 0 \ b = 0"
(is"?P \ ?Q") proof assume ?P thenhave"0 dvd lcm a b" by simp alsohave"lcm a b dvd (a * b)" by simp finallyshow ?Q by auto next assume ?Q thenshow ?P by auto qed
lemma zero_eq_lcm_iff: "0 = lcm a b \ a = 0 \ b = 0" using lcm_eq_0_iff[of a b] by auto
lemma lcm_eq_1_iff [simp]: "lcm a b = 1 \ is_unit a \ is_unit b" by (auto intro: associated_eqI)
lemma unit_factor_lcm: "unit_factor (lcm a b) = (if a = 0 \ b = 0 then 0 else 1)" using lcm_eq_0_iff[of a b] by (cases "lcm a b = 0") (auto simp: lcm_gcd)
sublocale lcm: abel_semigroup lcm proof fix a b c show"lcm a b = lcm b a" by (simp add: lcm_gcd ac_simps normalize_mult dvd_normalize_div) have"lcm (lcm a b) c dvd lcm a (lcm b c)" and"lcm a (lcm b c) dvd lcm (lcm a b) c" by (auto intro: lcm_least
dvd_trans [of b "lcm b c""lcm a (lcm b c)"]
dvd_trans [of c "lcm b c""lcm a (lcm b c)"]
dvd_trans [of a "lcm a b""lcm (lcm a b) c"]
dvd_trans [of b "lcm a b""lcm (lcm a b) c"]) thenshow"lcm (lcm a b) c = lcm a (lcm b c)" by (rule associated_eqI) simp_all qed
sublocale lcm: bounded_quasi_semilattice lcm 1 0 normalize proof show"lcm a a = normalize a"for a proof - have"lcm a a dvd a" by (rule lcm_least) simp_all thenshow ?thesis by (auto intro: associated_eqI) qed show"lcm (normalize a) b = lcm a b"for a b using dvd_lcm1 [of "normalize a" b] unfolding normalize_dvd_iff by (auto intro: associated_eqI) show"lcm 1 a = normalize a"for a by (rule associated_eqI) simp_all qed simp_all
lemma lcm_self: "lcm a a = normalize a" by (fact lcm.idem_normalize)
lemma lcm_left_idem: "lcm a (lcm a b) = lcm a b" by (fact lcm.left_idem)
lemma lcm_right_idem: "lcm (lcm a b) b = lcm a b" by (fact lcm.right_idem)
lemma gcd_lcm: assumes"a \ 0" and "b \ 0" shows"gcd a b = normalize (a * b div lcm a b)" proof - from assms have [simp]: "a * b div gcd a b \ 0" by (subst dvd_div_eq_0_iff) auto let ?u = "unit_factor (a * b div gcd a b)" have"gcd a b * normalize (a * b div gcd a b) =
gcd a b * ((a * b div gcd a b) * (1 div ?u))" by simp alsohave"\ = a * b div ?u" by (subst mult.assoc [symmetric]) auto alsohave"\ dvd a * b" by (subst div_unit_dvd_iff) auto finallyhave"gcd a b dvd ((a * b) div lcm a b)" by (intro dvd_mult_imp_div) (auto simp: lcm_gcd) moreoverhave"a * b div lcm a b dvd a"and"a * b div lcm a b dvd b" using assms by (subst div_dvd_iff_mult; simp add: lcm_eq_0_iff mult.commute[of b "lcm a b"])+ ultimatelyhave"normalize (gcd a b) = normalize (a * b div lcm a b)" apply - apply (rule associated_eqI) using assms apply (auto simp: div_dvd_iff_mult zero_eq_lcm_iff) done thus ?thesis by simp qed
lemma lcm_1_left: "lcm 1 a = normalize a" by (fact lcm.top_left_normalize)
lemma lcm_1_right: "lcm a 1 = normalize a" by (fact lcm.top_right_normalize)
lemma lcm_mult_left: "lcm (c * a) (c * b) = normalize (c * lcm a b)" proof (cases "c = 0") case True thenshow ?thesis by simp next case False thenhave *: "lcm (c * a) (c * b) dvd c * lcm a b" by (auto intro: lcm_least) moreoverhave"lcm a b dvd lcm (c * a) (c * b) div c" by (intro lcm_least) (auto intro!: dvd_mult_imp_div simp: mult_ac) hence"c * lcm a b dvd lcm (c * a) (c * b)" using False by (subst (asm) dvd_div_iff_mult) (auto simp: mult_ac intro: dvd_lcmI1) ultimatelyhave"normalize (lcm (c * a) (c * b)) = normalize (c * lcm a b)" by (auto intro: associated_eqI) thenshow ?thesis by (simp add: normalize_mult) qed
lemma lcm_mult_right: "lcm (a * c) (b * c) = normalize (lcm b a * c)" using lcm_mult_left [of c a b] by (simp add: ac_simps)
lemma lcm_mult_unit1: "is_unit a \ lcm (b * a) c = lcm b c" by (rule associated_eqI) (simp_all add: mult_unit_dvd_iff dvd_lcmI1)
lemma lcm_mult_unit2: "is_unit a \ lcm b (c * a) = lcm b c" using lcm_mult_unit1 [of a c b] by (simp add: ac_simps)
lemma lcm_div_unit1: "is_unit a \ lcm (b div a) c = lcm b c" by (erule is_unitE [of _ b]) (simp add: lcm_mult_unit1)
lemma lcm_div_unit2: "is_unit a \ lcm b (c div a) = lcm b c" by (erule is_unitE [of _ c]) (simp add: lcm_mult_unit2)
lemma normalize_lcm_left: "lcm (normalize a) b = lcm a b" by (fact lcm.normalize_left_idem)
lemma normalize_lcm_right: "lcm a (normalize b) = lcm a b" by (fact lcm.normalize_right_idem)
lemma comp_fun_idem_gcd: "comp_fun_idem gcd" by standard (simp_all add: fun_eq_iff ac_simps)
lemma comp_fun_idem_lcm: "comp_fun_idem lcm" by standard (simp_all add: fun_eq_iff ac_simps)
lemma gcd_dvd_antisym: "gcd a b dvd gcd c d \ gcd c d dvd gcd a b \ gcd a b = gcd c d" proof (rule gcdI) assume *: "gcd a b dvd gcd c d" and **: "gcd c d dvd gcd a b" have"gcd c d dvd c" by simp with * show"gcd a b dvd c" by (rule dvd_trans) have"gcd c d dvd d" by simp with * show"gcd a b dvd d" by (rule dvd_trans) show"normalize (gcd a b) = gcd a b" by simp fix l assume"l dvd c"and"l dvd d" thenhave"l dvd gcd c d" by (rule gcd_greatest) from this and ** show"l dvd gcd a b" by (rule dvd_trans) qed
declare unit_factor_lcm [simp]
lemma lcmI: assumes"a dvd c"and"b dvd c"and"\d. a dvd d \ b dvd d \ c dvd d" and"normalize c = c" shows"c = lcm a b" by (rule associated_eqI) (auto simp: assms intro: lcm_least)
lemma gcd_dvd_lcm [simp]: "gcd a b dvd lcm a b" using gcd_dvd2 by (rule dvd_lcmI2)
lemmas lcm_0 = lcm_0_right
lemma lcm_unique: "a dvd d \ b dvd d \ normalize d = d \ (\e. a dvd e \ b dvd e \ d dvd e) \ d = lcm a b" by rule (auto intro: lcmI simp: lcm_least lcm_eq_0_iff)
lemma lcm_proj1_if_dvd: assumes"b dvd a"shows"lcm a b = normalize a" proof - have"normalize (lcm a b) = normalize a" by (rule associatedI) (use assms in auto) thus ?thesis by simp qed
lemma lcm_proj2_if_dvd: "a dvd b \ lcm a b = normalize b" using lcm_proj1_if_dvd [of a b] by (simp add: ac_simps)
lemma lcm_proj1_iff: "lcm m n = normalize m \ n dvd m" proof assume *: "lcm m n = normalize m" show"n dvd m" proof (cases "m = 0") case True thenshow ?thesis by simp next case [simp]: False from * have **: "m = lcm m n * unit_factor m" by (simp add: unit_eq_div2) show ?thesis by (subst **) simp qed next assume"n dvd m" thenshow"lcm m n = normalize m" by (rule lcm_proj1_if_dvd) qed
lemma lcm_proj2_iff: "lcm m n = normalize n \ m dvd n" using lcm_proj1_iff [of n m] by (simp add: ac_simps)
lemma gcd_mono: "a dvd c \ b dvd d \ gcd a b dvd gcd c d" by (simp add: gcd_dvdI1 gcd_dvdI2)
lemma lcm_mono: "a dvd c \ b dvd d \ lcm a b dvd lcm c d" by (simp add: dvd_lcmI1 dvd_lcmI2)
lemma dvd_productE: assumes"p dvd a * b" obtains x y where"p = x * y""x dvd a""y dvd b" proof (cases "a = 0") case True thus ?thesis by (intro that[of p 1]) simp_all next case False
define x y where"x = gcd a p"and"y = p div x" have"p = x * y"by (simp add: x_def y_def) moreoverhave"x dvd a"by (simp add: x_def) moreoverfrom assms have"p dvd gcd (b * a) (b * p)" by (intro gcd_greatest) (simp_all add: mult.commute) hence"p dvd b * gcd a p"by (subst (asm) gcd_mult_left) auto with False have"y dvd b" by (simp add: x_def y_def div_dvd_iff_mult assms) ultimatelyshow ?thesis by (rule that) qed
lemma gcd_mult_unit1: assumes"is_unit a"shows"gcd (b * a) c = gcd b c" proof - have"gcd (b * a) c dvd b" using assms dvd_mult_unit_iff by blast thenshow ?thesis by (rule gcdI) simp_all qed
lemma gcd_mult_unit2: "is_unit a \ gcd b (c * a) = gcd b c" using gcd.commute gcd_mult_unit1 by auto
lemma gcd_div_unit1: "is_unit a \ gcd (b div a) c = gcd b c" by (erule is_unitE [of _ b]) (simp add: gcd_mult_unit1)
lemma gcd_div_unit2: "is_unit a \ gcd b (c div a) = gcd b c" by (erule is_unitE [of _ c]) (simp add: gcd_mult_unit2)
lemma normalize_gcd_left: "gcd (normalize a) b = gcd a b" by (fact gcd.normalize_left_idem)
lemma normalize_gcd_right: "gcd a (normalize b) = gcd a b" by (fact gcd.normalize_right_idem)
lemma gcd_add1 [simp]: "gcd (m + n) n = gcd m n" by (rule gcdI [symmetric]) (simp_all add: dvd_add_left_iff)
lemma gcd_add2 [simp]: "gcd m (m + n) = gcd m n" using gcd_add1 [of n m] by (simp add: ac_simps)
lemma gcd_add_mult: "gcd m (k * m + n) = gcd m n" by (rule gcdI [symmetric]) (simp_all add: dvd_add_right_iff)
end
class ring_gcd = comm_ring_1 + semiring_gcd begin
lemma gcd_neg1 [simp]: "gcd (-a) b = gcd a b" by (rule sym, rule gcdI) (simp_all add: gcd_greatest)
lemma gcd_neg2 [simp]: "gcd a (-b) = gcd a b" by (rule sym, rule gcdI) (simp_all add: gcd_greatest)
lemma gcd_neg_numeral_1 [simp]: "gcd (- numeral n) a = gcd (numeral n) a" by (fact gcd_neg1)
lemma gcd_neg_numeral_2 [simp]: "gcd a (- numeral n) = gcd a (numeral n)" by (fact gcd_neg2)
lemma gcd_diff1: "gcd (m - n) n = gcd m n" by (subst diff_conv_add_uminus, subst gcd_neg2[symmetric], subst gcd_add1, simp)
lemma gcd_diff2: "gcd (n - m) n = gcd m n" by (subst gcd_neg1[symmetric]) (simp only: minus_diff_eq gcd_diff1)
lemma lcm_neg1 [simp]: "lcm (-a) b = lcm a b" by (rule sym, rule lcmI) (simp_all add: lcm_least lcm_eq_0_iff)
lemma lcm_neg2 [simp]: "lcm a (-b) = lcm a b" by (rule sym, rule lcmI) (simp_all add: lcm_least lcm_eq_0_iff)
lemma lcm_neg_numeral_1 [simp]: "lcm (- numeral n) a = lcm (numeral n) a" by (fact lcm_neg1)
lemma lcm_neg_numeral_2 [simp]: "lcm a (- numeral n) = lcm a (numeral n)" by (fact lcm_neg2)
end
class semiring_Gcd = semiring_gcd + Gcd + assumes Gcd_dvd: "a \ A \ Gcd A dvd a" and Gcd_greatest: "(\b. b \ A \ a dvd b) \ a dvd Gcd A" and normalize_Gcd [simp]: "normalize (Gcd A) = Gcd A" assumes dvd_Lcm: "a \ A \ a dvd Lcm A" and Lcm_least: "(\b. b \ A \ b dvd a) \ Lcm A dvd a" and normalize_Lcm [simp]: "normalize (Lcm A) = Lcm A" begin
lemma Lcm_Gcd: "Lcm A = Gcd {b. \a\A. a dvd b}" by (rule associated_eqI) (auto intro: Gcd_dvd dvd_Lcm Gcd_greatest Lcm_least)
lemma Gcd_Lcm: "Gcd A = Lcm {b. \a\A. b dvd a}" by (rule associated_eqI) (auto intro: Gcd_dvd dvd_Lcm Gcd_greatest Lcm_least)
lemma Gcd_insert [simp]: "Gcd (insert a A) = gcd a (Gcd A)" proof - have"Gcd (insert a A) dvd gcd a (Gcd A)" by (auto intro: Gcd_dvd Gcd_greatest) moreoverhave"gcd a (Gcd A) dvd Gcd (insert a A)" proof (rule Gcd_greatest) fix b assume"b \ insert a A" thenshow"gcd a (Gcd A) dvd b" proof assume"b = a" thenshow ?thesis by simp next assume"b \ A" thenhave"Gcd A dvd b" by (rule Gcd_dvd) moreoverhave"gcd a (Gcd A) dvd Gcd A" by simp ultimatelyshow ?thesis by (blast intro: dvd_trans) qed qed ultimatelyshow ?thesis by (auto intro: associated_eqI) qed
lemma Lcm_insert [simp]: "Lcm (insert a A) = lcm a (Lcm A)" proof (rule sym) have"lcm a (Lcm A) dvd Lcm (insert a A)" by (auto intro: dvd_Lcm Lcm_least) moreoverhave"Lcm (insert a A) dvd lcm a (Lcm A)" proof (rule Lcm_least) fix b assume"b \ insert a A" thenshow"b dvd lcm a (Lcm A)" proof assume"b = a" thenshow ?thesis by simp next assume"b \ A" thenhave"b dvd Lcm A" by (rule dvd_Lcm) moreoverhave"Lcm A dvd lcm a (Lcm A)" by simp ultimatelyshow ?thesis by (blast intro: dvd_trans) qed qed ultimatelyshow"lcm a (Lcm A) = Lcm (insert a A)" by (rule associated_eqI) (simp_all add: lcm_eq_0_iff) qed
lemma LcmI: assumes"\a. a \ A \ a dvd b" and"\c. (\a. a \ A \ a dvd c) \ b dvd c" and"normalize b = b" shows"b = Lcm A" by (rule associated_eqI) (auto simp: assms dvd_Lcm intro: Lcm_least)
lemma Lcm_subset: "A \ B \ Lcm A dvd Lcm B" by (blast intro: Lcm_least dvd_Lcm)
lemma Lcm_Un: "Lcm (A \ B) = lcm (Lcm A) (Lcm B)" proof - have"\d. \Lcm A dvd d; Lcm B dvd d\ \ Lcm (A \ B) dvd d" by (meson UnE Lcm_least dvd_Lcm dvd_trans) thenshow ?thesis by (meson Lcm_subset lcm_unique normalize_Lcm sup.cobounded1 sup.cobounded2) qed
lemma Gcd_0_iff [simp]: "Gcd A = 0 \ A \ {0}"
(is"?P \ ?Q") proof assume ?P show ?Q proof fix a assume"a \ A" thenhave"Gcd A dvd a" by (rule Gcd_dvd) with\<open>?P\<close> have "a = 0" by simp thenshow"a \ {0}" by simp qed next assume ?Q have"0 dvd Gcd A" proof (rule Gcd_greatest) fix a assume"a \ A" with\<open>?Q\<close> have "a = 0" by auto thenshow"0 dvd a" by simp qed thenshow ?P by simp qed
lemma Lcm_1_iff [simp]: "Lcm A = 1 \ (\a\A. is_unit a)"
(is"?P \ ?Q") proof assume ?P show ?Q proof fix a assume"a \ A" thenhave"a dvd Lcm A" by (rule dvd_Lcm) with\<open>?P\<close> show "is_unit a" by simp qed next assume ?Q thenhave"is_unit (Lcm A)" by (blast intro: Lcm_least) thenhave"normalize (Lcm A) = 1" by (rule is_unit_normalize) thenshow ?P by simp qed
lemma unit_factor_Lcm: "unit_factor (Lcm A) = (if Lcm A = 0 then 0 else 1)" proof (cases "Lcm A = 0") case True thenshow ?thesis by simp next case False with unit_factor_normalize have"unit_factor (normalize (Lcm A)) = 1" by blast with False show ?thesis by simp qed
lemma unit_factor_Gcd: "unit_factor (Gcd A) = (if Gcd A = 0 then 0 else 1)" by (simp add: Gcd_Lcm unit_factor_Lcm)
lemma GcdI: assumes"\a. a \ A \ b dvd a" and"\c. (\a. a \ A \ c dvd a) \ c dvd b" and"normalize b = b" shows"b = Gcd A" by (rule associated_eqI) (auto simp: assms Gcd_dvd intro: Gcd_greatest)
lemma Gcd_eq_1_I: assumes"is_unit a"and"a \ A" shows"Gcd A = 1" proof - from assms have"is_unit (Gcd A)" by (blast intro: Gcd_dvd dvd_unit_imp_unit) thenhave"normalize (Gcd A) = 1" by (rule is_unit_normalize) thenshow ?thesis by simp qed
lemma Lcm_eq_0_I: assumes"0 \ A" shows"Lcm A = 0" proof - from assms have"0 dvd Lcm A" by (rule dvd_Lcm) thenshow ?thesis by simp qed
lemma Gcd_UNIV [simp]: "Gcd UNIV = 1" using dvd_refl by (rule Gcd_eq_1_I) simp
lemma Lcm_0_iff: assumes"finite A" shows"Lcm A = 0 \ 0 \ A" proof (cases "A = {}") case True thenshow ?thesis by simp next case False with assms show ?thesis by (induct A rule: finite_ne_induct) (auto simp: lcm_eq_0_iff) qed
lemma Gcd_image_normalize [simp]: "Gcd (normalize ` A) = Gcd A" proof - have"Gcd (normalize ` A) dvd a"if"a \ A" for a proof - from that obtain B where"A = insert a B" by blast moreoverhave"gcd (normalize a) (Gcd (normalize ` B)) dvd normalize a" by (rule gcd_dvd1) ultimatelyshow"Gcd (normalize ` A) dvd a" by simp qed thenhave"Gcd (normalize ` A) dvd Gcd A"and"Gcd A dvd Gcd (normalize ` A)" by (auto intro!: Gcd_greatest intro: Gcd_dvd) thenshow ?thesis by (auto intro: associated_eqI) qed
lemma Gcd_eqI: assumes"normalize a = a" assumes"\b. b \ A \ a dvd b" and"\c. (\b. b \ A \ c dvd b) \ c dvd a" shows"Gcd A = a" using assms by (blast intro: associated_eqI Gcd_greatest Gcd_dvd normalize_Gcd)
lemma dvd_GcdD: "x dvd Gcd A \ y \ A \ x dvd y" using Gcd_dvd dvd_trans by blast
lemma dvd_Gcd_iff: "x dvd Gcd A \ (\y\A. x dvd y)" by (blast dest: dvd_GcdD intro: Gcd_greatest)
lemma Gcd_mult: "Gcd ((*) c ` A) = normalize (c * Gcd A)" proof (cases "c = 0") case True thenshow ?thesis by auto next case [simp]: False have"Gcd ((*) c ` A) div c dvd Gcd A" by (intro Gcd_greatest, subst div_dvd_iff_mult)
(auto intro!: Gcd_greatest Gcd_dvd simp: mult.commute[of _ c]) thenhave"Gcd ((*) c ` A) dvd c * Gcd A" by (subst (asm) div_dvd_iff_mult) (auto intro: Gcd_greatest simp: mult_ac) moreoverhave"c * Gcd A dvd Gcd ((*) c ` A)" by (intro Gcd_greatest) (auto intro: mult_dvd_mono Gcd_dvd) ultimatelyhave"normalize (Gcd ((*) c ` A)) = normalize (c * Gcd A)" by (rule associatedI) thenshow ?thesis by simp qed
lemma Lcm_eqI: assumes"normalize a = a" and"\b. b \ A \ b dvd a" and"\c. (\b. b \ A \ b dvd c) \ a dvd c" shows"Lcm A = a" using assms by (blast intro: associated_eqI Lcm_least dvd_Lcm normalize_Lcm)
lemma Lcm_dvdD: "Lcm A dvd x \ y \ A \ y dvd x" using dvd_Lcm dvd_trans by blast
lemma Lcm_dvd_iff: "Lcm A dvd x \ (\y\A. y dvd x)" by (blast dest: Lcm_dvdD intro: Lcm_least)
lemma Lcm_mult: assumes"A \ {}" shows"Lcm ((*) c ` A) = normalize (c * Lcm A)" proof (cases "c = 0") case True with assms have"(*) c ` A = {0}" by auto with True show ?thesis by auto next case [simp]: False from assms obtain x where x: "x \ A" by blast have"c dvd c * x" by simp alsofrom x have"c * x dvd Lcm ((*) c ` A)" by (intro dvd_Lcm) auto finallyhave dvd: "c dvd Lcm ((*) c ` A)" . moreoverhave"Lcm A dvd Lcm ((*) c ` A) div c" by (intro Lcm_least dvd_mult_imp_div)
(auto intro!: Lcm_least dvd_Lcm simp: mult.commute[of _ c]) ultimatelyhave"c * Lcm A dvd Lcm ((*) c ` A)" by auto moreoverhave"Lcm ((*) c ` A) dvd c * Lcm A" by (intro Lcm_least) (auto intro: mult_dvd_mono dvd_Lcm) ultimatelyhave"normalize (c * Lcm A) = normalize (Lcm ((*) c ` A))" by (rule associatedI) thenshow ?thesis by simp qed
lemma Lcm_no_units: "Lcm A = Lcm (A - {a. is_unit a})" proof - have"(A - {a. is_unit a}) \ {a\A. is_unit a} = A" by blast thenhave"Lcm A = lcm (Lcm (A - {a. is_unit a})) (Lcm {a\A. is_unit a})" by (simp add: Lcm_Un [symmetric]) alsohave"Lcm {a\A. is_unit a} = 1" by simp finallyshow ?thesis by simp qed
lemma Lcm_0_iff': "Lcm A = 0 \ (\l. l \ 0 \ (\a\A. a dvd l))" by (metis Lcm_least dvd_0_left dvd_Lcm)
lemma Lcm_no_multiple: "(\m. m \ 0 \ (\a\A. \ a dvd m)) \ Lcm A = 0" by (auto simp: Lcm_0_iff')
lemma Lcm_singleton [simp]: "Lcm {a} = normalize a" by simp
lemma Lcm_2 [simp]: "Lcm {a, b} = lcm a b" by simp
lemma Gcd_1: "1 \ A \ Gcd A = 1" by (auto intro!: Gcd_eq_1_I)
lemma Gcd_singleton [simp]: "Gcd {a} = normalize a" by simp
lemma Gcd_2 [simp]: "Gcd {a, b} = gcd a b" by simp
lemma Gcd_mono: assumes"\x. x \ A \ f x dvd g x" shows"(GCD x\A. f x) dvd (GCD x\A. g x)" proof (intro Gcd_greatest, safe) fix x assume"x \ A" hence"(GCD x\A. f x) dvd f x" by (intro Gcd_dvd) auto alsohave"f x dvd g x" using\<open>x \<in> A\<close> assms by blast finallyshow"(GCD x\A. f x) dvd \" . qed
lemma Lcm_mono: assumes"\x. x \ A \ f x dvd g x" shows"(LCM x\A. f x) dvd (LCM x\A. g x)" proof (intro Lcm_least, safe) fix x assume"x \ A" hence"f x dvd g x"by (rule assms) alsohave"g x dvd (LCM x\A. g x)" using\<open>x \<in> A\<close> by (intro dvd_Lcm) auto finallyshow"f x dvd \" . qed
end
subsection \<open>An aside: GCD and LCM on finite sets for incomplete gcd rings\<close>
context semiring_gcd begin
sublocale Gcd_fin: bounded_quasi_semilattice_set gcd 0 1 normalize defines
Gcd_fin (\<open>Gcd\<^sub>f\<^sub>i\<^sub>n\<close>) = "Gcd_fin.F :: 'a set \<Rightarrow> 'a" ..
lemma Gcd_fin_dvd: "a \ A \ Gcd\<^sub>f\<^sub>i\<^sub>n A dvd a" by (induct A rule: infinite_finite_induct)
(auto intro: dvd_trans)
lemma dvd_Lcm_fin: "a \ A \ a dvd Lcm\<^sub>f\<^sub>i\<^sub>n A" by (induct A rule: infinite_finite_induct)
(auto intro: dvd_trans)
lemma Gcd_fin_greatest: "a dvd Gcd\<^sub>f\<^sub>i\<^sub>n A" if "finite A" and "\b. b \ A \ a dvd b" using that by (induct A) simp_all
lemma Lcm_fin_least: "Lcm\<^sub>f\<^sub>i\<^sub>n A dvd a" if "finite A" and "\b. b \ A \ b dvd a" using that by (induct A) simp_all
lemma gcd_list_greatest: "a dvd gcd_list bs"if"\b. b \ set bs \ a dvd b" by (rule Gcd_fin_greatest) (simp_all add: that)
lemma lcm_list_least: "lcm_list bs dvd a"if"\b. b \ set bs \ b dvd a" by (rule Lcm_fin_least) (simp_all add: that)
lemma dvd_Gcd_fin_iff: "b dvd Gcd\<^sub>f\<^sub>i\<^sub>n A \ (\a\A. b dvd a)" if "finite A" using that by (auto intro: Gcd_fin_greatest Gcd_fin_dvd dvd_trans [of b "Gcd\<^sub>f\<^sub>i\<^sub>n A"])
lemma dvd_gcd_list_iff: "b dvd gcd_list xs \ (\a\set xs. b dvd a)" by (simp add: dvd_Gcd_fin_iff)
lemma Lcm_fin_dvd_iff: "Lcm\<^sub>f\<^sub>i\<^sub>n A dvd b \ (\a\A. a dvd b)" if "finite A" using that by (auto intro: Lcm_fin_least dvd_Lcm_fin dvd_trans [of _ "Lcm\<^sub>f\<^sub>i\<^sub>n A" b])
lemma lcm_list_dvd_iff: "lcm_list xs dvd b \ (\a\set xs. a dvd b)" by (simp add: Lcm_fin_dvd_iff)
lemma Gcd_fin_mult: "Gcd\<^sub>f\<^sub>i\<^sub>n (image (times b) A) = normalize (b * Gcd\<^sub>f\<^sub>i\<^sub>n A)" if "finite A" using that byinduction (auto simp: gcd_mult_left)
lemma Lcm_fin_mult: "Lcm\<^sub>f\<^sub>i\<^sub>n (image (times b) A) = normalize (b * Lcm\<^sub>f\<^sub>i\<^sub>n A)" if "A \ {}" proof (cases "b = 0") case True moreoverfrom that have"times 0 ` A = {0}" by auto ultimatelyshow ?thesis by simp next case False show ?thesis proof (cases "finite A") case False moreoverhave"inj_on (times b) A" using\<open>b \<noteq> 0\<close> by (rule inj_on_mult) ultimatelyhave"infinite (times b ` A)" by (simp add: finite_image_iff) with False show ?thesis by simp next case True thenshow ?thesis using that by (induct A rule: finite_ne_induct) (auto simp: lcm_mult_left) qed qed
lemma unit_factor_Gcd_fin: "unit_factor (Gcd\<^sub>f\<^sub>i\<^sub>n A) = of_bool (Gcd\<^sub>f\<^sub>i\<^sub>n A \ 0)" by (rule normalize_idem_imp_unit_factor_eq) simp
lemma unit_factor_Lcm_fin: "unit_factor (Lcm\<^sub>f\<^sub>i\<^sub>n A) = of_bool (Lcm\<^sub>f\<^sub>i\<^sub>n A \ 0)" by (rule normalize_idem_imp_unit_factor_eq) simp
lemma is_unit_Gcd_fin_iff [simp]: "is_unit (Gcd\<^sub>f\<^sub>i\<^sub>n A) \ Gcd\<^sub>f\<^sub>i\<^sub>n A = 1" by (rule normalize_idem_imp_is_unit_iff) simp
lemma is_unit_Lcm_fin_iff [simp]: "is_unit (Lcm\<^sub>f\<^sub>i\<^sub>n A) \ Lcm\<^sub>f\<^sub>i\<^sub>n A = 1" by (rule normalize_idem_imp_is_unit_iff) simp
lemma Gcd_fin_0_iff: "Gcd\<^sub>f\<^sub>i\<^sub>n A = 0 \ A \ {0} \ finite A" by (induct A rule: infinite_finite_induct) simp_all
lemma Lcm_fin_0_iff: "Lcm\<^sub>f\<^sub>i\<^sub>n A = 0 \ 0 \ A" if "finite A" using that by (induct A) (auto simp: lcm_eq_0_iff)
lemma Lcm_fin_1_iff: "Lcm\<^sub>f\<^sub>i\<^sub>n A = 1 \ (\a\A. is_unit a) \ finite A" by (induct A rule: infinite_finite_induct) simp_all
end
context semiring_Gcd begin
lemma Gcd_fin_eq_Gcd [simp]: "Gcd\<^sub>f\<^sub>i\<^sub>n A = Gcd A" if "finite A" for A :: "'a set" using that by induct simp_all
lemma coprime_imp_gcd_eq_1 [simp]: "gcd a b = 1"if"coprime a b" proof -
define t r s where"t = gcd a b"and"r = a div t"and"s = b div t" thenhave"a = t * r"and"b = t * s" by simp_all with that have"coprime (t * r) (t * s)" by simp thenshow ?thesis by (simp add: t_def) qed
lemma gcd_eq_1_imp_coprime [dest!]: "coprime a b"if"gcd a b = 1" proof (rule coprimeI) fix c assume"c dvd a"and"c dvd b" thenhave"c dvd gcd a b" by (rule gcd_greatest) with that show"is_unit c" by simp qed
lemma coprime_iff_gcd_eq_1 [presburger, code]: "coprime a b \ gcd a b = 1" by rule (simp_all add: gcd_eq_1_imp_coprime)
lemma is_unit_gcd [simp]: "is_unit (gcd a b) \ coprime a b" by (simp add: coprime_iff_gcd_eq_1)
lemma coprime_add_one_left [simp]: "coprime (a + 1) a" by (simp add: gcd_eq_1_imp_coprime ac_simps)
lemma coprime_add_one_right [simp]: "coprime a (a + 1)" using coprime_add_one_left [of a] by (simp add: ac_simps)
lemma coprime_mult_left_iff [simp]: "coprime (a * b) c \ coprime a c \ coprime b c" proof assume"coprime (a * b) c" with coprime_common_divisor [of "a * b" c] have *: "is_unit d"if"d dvd a * b"and"d dvd c"for d using that by blast have"coprime a c" by (rule coprimeI, rule *) simp_all moreoverhave"coprime b c" by (rule coprimeI, rule *) simp_all ultimatelyshow"coprime a c \ coprime b c" .. next assume"coprime a c \ coprime b c" thenhave"coprime a c""coprime b c" by simp_all show"coprime (a * b) c" proof (rule coprimeI) fix d assume"d dvd a * b" thenobtain r s where d: "d = r * s""r dvd a""s dvd b" by (rule dvd_productE) assume"d dvd c" with d have"r * s dvd c" by simp thenhave"r dvd c""s dvd c" by (auto intro: dvd_mult_left dvd_mult_right) from\<open>coprime a c\<close> \<open>r dvd a\<close> \<open>r dvd c\<close> have"is_unit r" by (rule coprime_common_divisor) moreoverfrom\<open>coprime b c\<close> \<open>s dvd b\<close> \<open>s dvd c\<close> have"is_unit s" by (rule coprime_common_divisor) ultimatelyshow"is_unit d" by (simp add: d is_unit_mult_iff) qed qed
lemma coprime_mult_right_iff [simp]: "coprime c (a * b) \ coprime c a \ coprime c b" using coprime_mult_left_iff [of a b c] by (simp add: ac_simps)
lemma coprime_power_left_iff [simp]: "coprime (a ^ n) b \ coprime a b \ n = 0" proof (cases "n = 0") case True thenshow ?thesis by simp next case False thenhave"n > 0" by simp thenshow ?thesis by (induction n rule: nat_induct_non_zero) simp_all qed
lemma coprime_power_right_iff [simp]: "coprime a (b ^ n) \ coprime a b \ n = 0" using coprime_power_left_iff [of b n a] by (simp add: ac_simps)
lemma prod_coprime_left: "coprime (\i\A. f i) a" if "\i. i \ A \ coprime (f i) a" using that by (induct A rule: infinite_finite_induct) simp_all
lemma prod_coprime_right: "coprime a (\i\A. f i)" if "\i. i \ A \ coprime a (f i)" using that prod_coprime_left [of A f a] by (simp add: ac_simps)
lemma prod_list_coprime_left: "coprime (prod_list xs) a"if"\x. x \ set xs \ coprime x a" using that by (induct xs) simp_all
lemma prod_list_coprime_right: "coprime a (prod_list xs)"if"\x. x \ set xs \ coprime a x" using that prod_list_coprime_left [of xs a] by (simp add: ac_simps)
lemma coprime_dvd_mult_left_iff: "a dvd b * c \ a dvd b" if "coprime a c" proof assume"a dvd b" thenshow"a dvd b * c" by simp next assume"a dvd b * c" show"a dvd b" proof (cases "b = 0") case True thenshow ?thesis by simp next case False thenhave unit: "is_unit (unit_factor b)" by simp from\<open>coprime a c\<close> have"gcd (b * a) (b * c) * unit_factor b = b" by (subst gcd_mult_left) (simp add: ac_simps) moreoverfrom\<open>a dvd b * c\<close> have"a dvd gcd (b * a) (b * c) * unit_factor b" by (simp add: dvd_mult_unit_iff unit) ultimatelyshow ?thesis by simp qed qed
lemma coprime_dvd_mult_right_iff: "a dvd c * b \ a dvd b" if "coprime a c" using that coprime_dvd_mult_left_iff [of a c b] by (simp add: ac_simps)
lemma divides_mult: "a * b dvd c"if"a dvd c"and"b dvd c"and"coprime a b" proof - from\<open>b dvd c\<close> obtain b' where "c = b * b'" .. with\<open>a dvd c\<close> have "a dvd b' * b" by (simp add: ac_simps) with\<open>coprime a b\<close> have "a dvd b'" by (simp add: coprime_dvd_mult_left_iff) thenobtain a' where "b' = a * a'" .. with\<open>c = b * b'\<close> have "c = (a * b) * a'" by (simp add: ac_simps) thenshow ?thesis .. qed
lemma div_gcd_coprime: assumes"a \ 0 \ b \ 0" shows"coprime (a div gcd a b) (b div gcd a b)" proof - let ?g = "gcd a b" let ?a' = "a div ?g" let ?b' = "b div ?g" let ?g' = "gcd ?a' ?b'" have dvdg: "?g dvd a""?g dvd b" by simp_all have dvdg': "?g' dvd ?a'" "?g' dvd ?b'" by simp_all from dvdg dvdg' obtain ka kb ka' kb' where
kab: "a = ?g * ka""b = ?g * kb""?a' = ?g' * ka'""?b' = ?g' * kb'" unfolding dvd_def by blast from this [symmetric] have"?g * ?a' = (?g * ?g') * ka'""?g * ?b' = (?g * ?g') * kb'" by (simp_all add: mult.assoc mult.left_commute [of "gcd a b"]) thenhave dvdgg':"?g * ?g' dvd a" "?g* ?g' dvd b" by (auto simp: dvd_mult_div_cancel [OF dvdg(1)] dvd_mult_div_cancel [OF dvdg(2)] dvd_def) have"?g \ 0" using assms by simp moreoverfrom gcd_greatest [OF dvdgg'] have "?g * ?g' dvd ?g" . ultimatelyshow ?thesis using dvd_times_left_cancel_iff [of "gcd a b" _ 1] by simp (simp only: coprime_iff_gcd_eq_1) qed
lemma gcd_coprime: assumes c: "gcd a b \ 0" and a: "a = a' * gcd a b" and b: "b = b' * gcd a b" shows"coprime a' b'" proof - from c have"a \ 0 \ b \ 0" by simp with div_gcd_coprime have"coprime (a div gcd a b) (b div gcd a b)" . alsofrom assms have"a div gcd a b = a'" using dvd_div_eq_mult gcd_dvd1 by blast alsofrom assms have"b div gcd a b = b'" using dvd_div_eq_mult gcd_dvd1 by blast finallyshow ?thesis . qed
lemma gcd_coprime_exists: assumes"gcd a b \ 0" shows"\a' b'. a = a' * gcd a b \ b = b' * gcd a b \ coprime a' b'" proof - have"coprime (a div gcd a b) (b div gcd a b)" using assms div_gcd_coprime by auto thenshow ?thesis by force qed
lemma pow_divides_pow_iff [simp]: "a ^ n dvd b ^ n \ a dvd b" if "n > 0" proof (cases "gcd a b = 0") case True thenshow ?thesis by simp next case False show ?thesis proof let ?d = "gcd a b" from\<open>n > 0\<close> obtain m where m: "n = Suc m" by (cases n) simp_all from False have zn: "?d ^ n \ 0" by (rule power_not_zero) from gcd_coprime_exists [OF False] obtain a' b'where ab': "a = a' * ?d" "b = b' * ?d" "coprime a' b'" by blast assume"a ^ n dvd b ^ n" thenhave"(a' * ?d) ^ n dvd (b' * ?d) ^ n" by (simp add: ab'(1,2)[symmetric]) thenhave"?d^n * a'^n dvd ?d^n * b'^n" by (simp only: power_mult_distrib ac_simps) with zn have"a' ^ n dvd b' ^ n" by simp thenhave"a' dvd b' ^ n" using dvd_trans[of a' "a'^n" "b'^n"] by (simp add: m) thenhave"a' dvd b' ^ m * b'" by (simp add: m ac_simps) moreoverhave"coprime a' (b' ^ n)" using\<open>coprime a' b'\<close> by simp thenhave"a' dvd b'" using\<open>a' dvd b' ^ n\<close> coprime_dvd_mult_left_iff dvd_mult by blast thenhave"a' * ?d dvd b' * ?d" by (rule mult_dvd_mono) simp with ab'(1,2) show "a dvd b" by simp next assume"a dvd b" with\<open>n > 0\<close> show "a ^ n dvd b ^ n" by (induction rule: nat_induct_non_zero)
(simp_all add: mult_dvd_mono) qed qed
lemma coprime_crossproduct: fixes a b c d :: 'a assumes"coprime a d"and"coprime b c" shows"normalize a * normalize c = normalize b * normalize d \
normalize a = normalize b \<and> normalize c = normalize d"
(is"?lhs \ ?rhs") proof assume ?rhs thenshow ?lhs by simp next assume ?lhs from\<open>?lhs\<close> have "normalize a dvd normalize b * normalize d" by (auto intro: dvdI dest: sym) with\<open>coprime a d\<close> have "a dvd b" by (simp add: coprime_dvd_mult_left_iff normalize_mult [symmetric]) from\<open>?lhs\<close> have "normalize b dvd normalize a * normalize c" by (auto intro: dvdI dest: sym) with\<open>coprime b c\<close> have "b dvd a" by (simp add: coprime_dvd_mult_left_iff normalize_mult [symmetric]) from\<open>?lhs\<close> have "normalize c dvd normalize d * normalize b" by (auto intro: dvdI dest: sym simp add: mult.commute) with\<open>coprime b c\<close> have "c dvd d" by (simp add: coprime_dvd_mult_left_iff coprime_commute normalize_mult [symmetric]) from\<open>?lhs\<close> have "normalize d dvd normalize c * normalize a" by (auto intro: dvdI dest: sym simp add: mult.commute) with\<open>coprime a d\<close> have "d dvd c" by (simp add: coprime_dvd_mult_left_iff coprime_commute normalize_mult [symmetric]) from\<open>a dvd b\<close> \<open>b dvd a\<close> have "normalize a = normalize b" by (rule associatedI) moreoverfrom\<open>c dvd d\<close> \<open>d dvd c\<close> have "normalize c = normalize d" by (rule associatedI) ultimatelyshow ?rhs .. qed
lemma gcd_mult_left_left_cancel: "gcd (c * a) b = gcd a b"if"coprime b c" proof - have"coprime (gcd b (a * c)) c" by (rule coprimeI) (auto intro: that coprime_common_divisor) thenhave"gcd b (a * c) dvd a" using coprime_dvd_mult_left_iff [of "gcd b (a * c)" c a] by simp thenshow ?thesis by (auto intro: associated_eqI simp add: ac_simps) qed
lemma gcd_mult_left_right_cancel: "gcd (a * c) b = gcd a b"if"coprime b c" using that gcd_mult_left_left_cancel [of b c a] by (simp add: ac_simps)
lemma gcd_mult_right_left_cancel: "gcd a (c * b) = gcd a b"if"coprime a c" using that gcd_mult_left_left_cancel [of a c b] by (simp add: ac_simps)
lemma gcd_mult_right_right_cancel: "gcd a (b * c) = gcd a b"if"coprime a c" using that gcd_mult_right_left_cancel [of a c b] by (simp add: ac_simps)
lemma gcd_exp_weak: "gcd (a ^ n) (b ^ n) = normalize (gcd a b ^ n)" proof (cases "a = 0 \ b = 0 \ n = 0") case True thenshow ?thesis by (cases n) simp_all next case False thenhave"coprime (a div gcd a b) (b div gcd a b)"and"n > 0" by (auto intro: div_gcd_coprime) thenhave"coprime ((a div gcd a b) ^ n) ((b div gcd a b) ^ n)" by simp thenhave"1 = gcd ((a div gcd a b) ^ n) ((b div gcd a b) ^ n)" by simp thenhave"normalize (gcd a b ^ n) = normalize (gcd a b ^ n * \)" by simp alsohave"\ = gcd (gcd a b ^ n * (a div gcd a b) ^ n) (gcd a b ^ n * (b div gcd a b) ^ n)" by (rule gcd_mult_left [symmetric]) alsohave"(gcd a b) ^ n * (a div gcd a b) ^ n = a ^ n" by (simp add: ac_simps div_power dvd_power_same) alsohave"(gcd a b) ^ n * (b div gcd a b) ^ n = b ^ n" by (simp add: ac_simps div_power dvd_power_same) finallyshow ?thesis by simp qed
lemma division_decomp: assumes"a dvd b * c" shows"\b' c'. a = b' * c' \ b' dvd b \ c' dvd c" proof (cases "gcd a b = 0") case True thenhave"a = 0 \ b = 0" by simp thenhave"a = 0 * c \ 0 dvd b \ c dvd c" by simp thenshow ?thesis by blast next case False let ?d = "gcd a b" from gcd_coprime_exists [OF False] obtain a' b'where ab': "a = a' * ?d" "b = b' * ?d" "coprime a' b'" by blast from ab'(1) have "a' dvd a" .. with assms have"a' dvd b * c" using dvd_trans [of a' a "b * c"] by simp from assms ab'(1,2) have "a' * ?d dvd (b' * ?d) * c" by simp thenhave"?d * a' dvd ?d * (b' * c)" by (simp add: mult_ac) with\<open>?d \<noteq> 0\<close> have "a' dvd b' * c" by simp thenhave"a' dvd c" using\<open>coprime a' b'\<close> by (simp add: coprime_dvd_mult_right_iff) with ab'(1) have "a = ?d * a'\<and> ?d dvd b \<and> a' dvd c" by (simp add: ac_simps) thenshow ?thesis by blast qed
lemma lcm_coprime: "coprime a b \ lcm a b = normalize (a * b)" by (subst lcm_gcd) simp
end
context ring_gcd begin
lemma coprime_minus_left_iff [simp]: "coprime (- a) b \ coprime a b" by (rule; rule coprimeI) (auto intro: coprime_common_divisor)
lemma coprime_minus_right_iff [simp]: "coprime a (- b) \ coprime a b" using coprime_minus_left_iff [of b a] by (simp add: ac_simps)
lemma coprime_diff_one_left [simp]: "coprime (a - 1) a" using coprime_add_one_right [of "a - 1"] by simp
lemma coprime_doff_one_right [simp]: "coprime a (a - 1)" using coprime_diff_one_left [of a] by (simp add: ac_simps)
end
context semiring_Gcd begin
lemma Lcm_coprime: assumes"finite A" and"A \ {}" and"\a b. a \ A \ b \ A \ a \ b \ coprime a b" shows"Lcm A = normalize (\A)" using assms proof (induct rule: finite_ne_induct) case singleton thenshow ?caseby simp next case (insert a A) have"Lcm (insert a A) = lcm a (Lcm A)" by simp alsofrom insert have"Lcm A = normalize (\A)" by blast alsohave"lcm a \ = lcm a (\A)" by (cases "\A = 0") (simp_all add: lcm_div_unit2) alsofrom insert have"coprime a (\A)" by (subst coprime_commute, intro prod_coprime_left) auto with insert have"lcm a (\A) = normalize (\(insert a A))" by (simp add: lcm_coprime) finallyshow ?case . qed
lemma Lcm_coprime': "card A \ 0 \
(\<And>a b. a \<in> A \<Longrightarrow> b \<in> A \<Longrightarrow> a \<noteq> b \<Longrightarrow> coprime a b) \<Longrightarrow>
Lcm A = normalize (\<Prod>A)" by (rule Lcm_coprime) (simp_all add: card_eq_0_iff)
end
text\<open>And some consequences: cancellation modulo @{term m}\<close> lemma mult_mod_cancel_right: fixes m :: "'a::{euclidean_ring_cancel,semiring_gcd}" assumes eq: "(a * n) mod m = (b * n) mod m"and"coprime m n" shows"a mod m = b mod m" proof - have"m dvd (a*n - b*n)" using eq mod_eq_dvd_iff by blast thenhave"m dvd a-b" by (metis \<open>coprime m n\<close> coprime_dvd_mult_left_iff left_diff_distrib') thenshow ?thesis using mod_eq_dvd_iff by blast qed
lemma mult_mod_cancel_left: fixes m :: "'a::{euclidean_ring_cancel,semiring_gcd}" assumes"(n * a) mod m = (n * b) mod m"and"coprime m n" shows"a mod m = b mod m" by (metis assms mult.commute mult_mod_cancel_right)
subsection \<open>GCD and LCM for multiplicative normalisation functions\<close>
class semiring_gcd_mult_normalize = semiring_gcd + normalization_semidom_multiplicative begin
lemma mult_gcd_left: "c * gcd a b = unit_factor c * gcd (c * a) (c * b)" by (simp add: gcd_mult_left normalize_mult mult.assoc [symmetric])
lemma mult_gcd_right: "gcd a b * c = gcd (a * c) (b * c) * unit_factor c" using mult_gcd_left [of c a b] by (simp add: ac_simps)
lemma gcd_mult_distrib': "normalize c * gcd a b = gcd (c * a) (c * b)" by (subst gcd_mult_left) (simp_all add: normalize_mult)
lemma gcd_mult_distrib: "k * gcd a b = gcd (k * a) (k * b) * unit_factor k"
proof- have"normalize k * gcd a b = gcd (k * a) (k * b)" by (simp add: gcd_mult_distrib') thenhave"normalize k * gcd a b * unit_factor k = gcd (k * a) (k * b) * unit_factor k" by simp thenhave"normalize k * unit_factor k * gcd a b = gcd (k * a) (k * b) * unit_factor k" by (simp only: ac_simps) thenshow ?thesis by simp qed
lemma gcd_mult_lcm [simp]: "gcd a b * lcm a b = normalize a * normalize b" by (simp add: lcm_gcd normalize_mult dvd_normalize_div)
lemma lcm_mult_gcd [simp]: "lcm a b * gcd a b = normalize a * normalize b" using gcd_mult_lcm [of a b] by (simp add: ac_simps)
lemma mult_lcm_left: "c * lcm a b = unit_factor c * lcm (c * a) (c * b)" by (simp add: lcm_mult_left mult.assoc [symmetric] normalize_mult)
lemma mult_lcm_right: "lcm a b * c = lcm (a * c) (b * c) * unit_factor c" using mult_lcm_left [of c a b] by (simp add: ac_simps)
lemma lcm_gcd_prod: "lcm a b * gcd a b = normalize (a * b)" by (simp add: lcm_gcd dvd_normalize_div normalize_mult)
lemma lcm_mult_distrib': "normalize c * lcm a b = lcm (c * a) (c * b)" by (subst lcm_mult_left) (simp add: normalize_mult)
lemma lcm_mult_distrib: "k * lcm a b = lcm (k * a) (k * b) * unit_factor k"
proof- have"normalize k * lcm a b = lcm (k * a) (k * b)" by (simp add: lcm_mult_distrib') thenhave"normalize k * lcm a b * unit_factor k = lcm (k * a) (k * b) * unit_factor k" by simp thenhave"normalize k * unit_factor k * lcm a b = lcm (k * a) (k * b) * unit_factor k" by (simp only: ac_simps) thenshow ?thesis by simp qed
lemma coprime_crossproduct': fixes a b c d assumes"b \ 0" assumes unit_factors: "unit_factor b = unit_factor d" assumes coprime: "coprime a b""coprime c d" shows"a * d = b * c \ a = c \ b = d" proof safe assume eq: "a * d = b * c" hence"normalize a * normalize d = normalize c * normalize b" by (simp only: normalize_mult [symmetric] mult_ac) with coprime have"normalize b = normalize d" by (subst (asm) coprime_crossproduct) simp_all from this and unit_factors show"b = d" by (rule normalize_unit_factor_eqI) from eq have"a * d = c * d"by (simp only: \<open>b = d\<close> mult_ac) with\<open>b \<noteq> 0\<close> \<open>b = d\<close> show "a = c" by simp qed (simp_all add: mult_ac)
lemma gcd_exp [simp]: "gcd (a ^ n) (b ^ n) = gcd a b ^ n" using gcd_exp_weak[of a n b] by (simp add: normalize_power)
end
subsection \<open>GCD and LCM on \<^typ>\<open>nat\<close> and \<^typ>\<open>int\<close>\<close>
instantiation nat :: gcd begin
fun gcd_nat :: "nat \ nat \ nat" where"gcd_nat x y = (if y = 0 then x else gcd y (x mod y))"
definition lcm_nat :: "nat \ nat \ nat" where"lcm_nat x y = x * y div (gcd x y)"
instance ..
end
instantiation int :: gcd begin
definition gcd_int :: "int \ int \ int" where"gcd_int x y = int (gcd (nat \x\) (nat \y\))"
definition lcm_int :: "int \ int \ int" where"lcm_int x y = int (lcm (nat \x\) (nat \y\))"
instance ..
end
lemma gcd_int_int_eq [simp]: "gcd (int m) (int n) = int (gcd m n)" by (simp add: gcd_int_def)
lemma gcd_nat_abs_left_eq [simp]: "gcd (nat \k\) n = nat (gcd k (int n))" by (simp add: gcd_int_def)
lemma gcd_nat_abs_right_eq [simp]: "gcd n (nat \k\) = nat (gcd (int n) k)" by (simp add: gcd_int_def)
lemma abs_gcd_int [simp]: "\gcd x y\ = gcd x y" for x y :: int by (simp only: gcd_int_def)
lemma gcd_abs1_int [simp]: "gcd \x\ y = gcd x y" for x y :: int by (simp only: gcd_int_def) simp
lemma gcd_abs2_int [simp]: "gcd x \y\ = gcd x y" for x y :: int by (simp only: gcd_int_def) simp
lemma lcm_int_int_eq [simp]: "lcm (int m) (int n) = int (lcm m n)" by (simp add: lcm_int_def)
lemma lcm_nat_abs_left_eq [simp]: "lcm (nat \k\) n = nat (lcm k (int n))" by (simp add: lcm_int_def)
lemma lcm_nat_abs_right_eq [simp]: "lcm n (nat \k\) = nat (lcm (int n) k)" by (simp add: lcm_int_def)
lemma lcm_abs1_int [simp]: "lcm \x\ y = lcm x y" for x y :: int by (simp only: lcm_int_def) simp
lemma lcm_abs2_int [simp]: "lcm x \y\ = lcm x y" for x y :: int by (simp only: lcm_int_def) simp
lemma abs_lcm_int [simp]: "\lcm i j\ = lcm i j" for i j :: int by (simp only: lcm_int_def)
lemma gcd_nat_induct [case_names base step]: fixes m n :: nat assumes"\m. P m 0" and"\m n. 0 < n \ P n (m mod n) \ P m n" shows"P m n" proof (induction m n rule: gcd_nat.induct) case (1 x y) thenshow ?case using assms neq0_conv by blast qed
lemma gcd_neg1_int [simp]: "gcd (- x) y = gcd x y" for x y :: int by (simp only: gcd_int_def) simp
lemma gcd_neg2_int [simp]: "gcd x (- y) = gcd x y" for x y :: int by (simp only: gcd_int_def) simp
lemma gcd_cases_int: fixes x y :: int assumes"x \ 0 \ y \ 0 \ P (gcd x y)" and"x \ 0 \ y \ 0 \ P (gcd x (- y))" and"x \ 0 \ y \ 0 \ P (gcd (- x) y)" and"x \ 0 \ y \ 0 \ P (gcd (- x) (- y))" shows"P (gcd x y)" using assms by auto arith
lemma gcd_ge_0_int [simp]: "gcd (x::int) y >= 0" for x y :: int by (simp add: gcd_int_def)
lemma lcm_neg1_int: "lcm (- x) y = lcm x y" for x y :: int by (simp only: lcm_int_def) simp
lemma lcm_neg2_int: "lcm x (- y) = lcm x y" for x y :: int by (simp only: lcm_int_def) simp
lemma lcm_cases_int: fixes x y :: int assumes"x \ 0 \ y \ 0 \ P (lcm x y)" and"x \ 0 \ y \ 0 \ P (lcm x (- y))" and"x \ 0 \ y \ 0 \ P (lcm (- x) y)" and"x \ 0 \ y \ 0 \ P (lcm (- x) (- y))" shows"P (lcm x y)" using assms by (auto simp: lcm_neg1_int lcm_neg2_int) arith
lemma lcm_ge_0_int [simp]: "lcm x y \ 0" for x y :: int by (simp only: lcm_int_def)
lemma gcd_0_nat: "gcd x 0 = x" for x :: nat by simp
lemma gcd_0_int [simp]: "gcd x 0 = \x\" for x :: int by (auto simp: gcd_int_def)
lemma gcd_0_left_nat: "gcd 0 x = x" for x :: nat by simp
lemma gcd_0_left_int [simp]: "gcd 0 x = \x\" for x :: int by (auto simp: gcd_int_def)
lemma gcd_red_nat: "gcd x y = gcd y (x mod y)" for x y :: nat by (cases "y = 0") auto
text\<open>Weaker, but useful for the simplifier.\<close>
lemma gcd_non_0_nat: "y \ 0 \ gcd x y = gcd y (x mod y)" for x y :: nat by simp
lemma gcd_1_nat [simp]: "gcd m 1 = 1" for m :: nat by simp
lemma gcd_Suc_0 [simp]: "gcd m (Suc 0) = Suc 0" for m :: nat by simp
lemma gcd_1_int [simp]: "gcd m 1 = 1" for m :: int by (simp add: gcd_int_def)
lemma gcd_idem_nat: "gcd x x = x" for x :: nat by simp
lemma gcd_idem_int: "gcd x x = \x\" for x :: int by (auto simp: gcd_int_def)
declare gcd_nat.simps [simp del]
text\<open> \<^medskip> \<^term>\<open>gcd m n\<close> divides \<open>m\<close> and \<open>n\<close>.
The conjunctions don't seem provable separately. \<close>
instance nat :: semiring_gcd proof fix m n :: nat show"gcd m n dvd m"and"gcd m n dvd n" proof (induct m n rule: gcd_nat_induct) case (step m n) thenhave"gcd n (m mod n) dvd m" by (metis dvd_mod_imp_dvd) with step show"gcd m n dvd m" by (simp add: gcd_non_0_nat) qed (simp_all add: gcd_0_nat gcd_non_0_nat) next fix m n k :: nat assume"k dvd m"and"k dvd n" thenshow"k dvd gcd m n" by (induct m n rule: gcd_nat_induct) (simp_all add: gcd_non_0_nat dvd_mod gcd_0_nat) qed (simp_all add: lcm_nat_def)
instance int :: ring_gcd proof fix k l r :: int show [simp]: "gcd k l dvd k""gcd k l dvd l" using gcd_dvd1 [of "nat \k\" "nat \l\"]
gcd_dvd2 [of "nat \k\" "nat \l\"] by simp_all show"lcm k l = normalize (k * l div gcd k l)" using lcm_gcd [of "nat \k\" "nat \l\"] by (simp add: nat_eq_iff of_nat_div abs_mult abs_div) assume"r dvd k""r dvd l" thenshow"r dvd gcd k l" using gcd_greatest [of "nat \r\" "nat \k\" "nat \l\"] by simp qed simp
lemma gcd_le1_nat [simp]: "a \ 0 \ gcd a b \ a" for a b :: nat by (rule dvd_imp_le) auto
lemma gcd_le2_nat [simp]: "b \ 0 \ gcd a b \ b" for a b :: nat by (rule dvd_imp_le) auto
lemma gcd_le1_int [simp]: "a > 0 \ gcd a b \ a" for a b :: int by (rule zdvd_imp_le) auto
lemma gcd_le2_int [simp]: "b > 0 \ gcd a b \ b" for a b :: int by (rule zdvd_imp_le) auto
lemma gcd_pos_nat [simp]: "gcd m n > 0 \ m \ 0 \ n \ 0" for m n :: nat using gcd_eq_0_iff [of m n] by arith
lemma gcd_pos_int [simp]: "gcd m n > 0 \ m \ 0 \ n \ 0" for m n :: int using gcd_eq_0_iff [of m n] gcd_ge_0_int [of m n] by arith
lemma gcd_unique_nat: "d dvd a \ d dvd b \ (\e. e dvd a \ e dvd b \ e dvd d) \ d = gcd a b" for d a :: nat using gcd_unique by fastforce
lemma gcd_unique_int: "d \ 0 \ d dvd a \ d dvd b \ (\e. e dvd a \ e dvd b \ e dvd d) \ d = gcd a b" for d a :: int using zdvd_antisym_nonneg by auto
interpretation gcd_nat:
semilattice_neutr_order gcd "0::nat" Rings.dvd "\m n. m dvd n \ m \ n" by standard (auto simp: gcd_unique_nat [symmetric] intro: dvd_antisym dvd_trans)
lemma gcd_proj1_if_dvd_int [simp]: "x dvd y \ gcd x y = \x\" for x y :: int by (metis abs_dvd_iff gcd_0_left_int gcd_unique_int)
lemma gcd_proj2_if_dvd_int [simp]: "y dvd x \ gcd x y = \y\" for x y :: int by (metis gcd_proj1_if_dvd_int gcd.commute)
lemma gcd_mult_distrib_nat: "k * gcd m n = gcd (k * m) (k * n)" for k m n :: nat \<comment> \<open>\<^cite>\<open>\<open>page 27\<close> in davenport92\<close>\<close> by (simp add: gcd_mult_left)
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