/- Copyright (c) 2014 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura Definitions and properties of gcd, lcm, and coprime. -/ import .div data.nat.gcd open eq.ops open - [notations] algebra namespace int /- gcd -/ definition gcd (a b : ℤ) : ℤ := of_nat (nat.gcd (nat_abs a) (nat_abs b)) theorem gcd_nonneg (a b : ℤ) : gcd a b ≥ 0 := of_nat_nonneg (nat.gcd (nat_abs a) (nat_abs b)) theorem gcd.comm (a b : ℤ) : gcd a b = gcd b a := by rewrite [↑gcd, nat.gcd.comm] theorem gcd_zero_right (a : ℤ) : gcd a 0 = abs a := by krewrite [↑gcd, nat.gcd_zero_right, of_nat_nat_abs] theorem gcd_zero_left (a : ℤ) : gcd 0 a = abs a := by rewrite [gcd.comm, gcd_zero_right] theorem gcd_one_right (a : ℤ) : gcd a 1 = 1 := by krewrite [↑gcd, nat.gcd_one_right] theorem gcd_one_left (a : ℤ) : gcd 1 a = 1 := by rewrite [gcd.comm, gcd_one_right] theorem gcd_abs_left (a b : ℤ) : gcd (abs a) b = gcd a b := by rewrite [↑gcd, *nat_abs_abs] theorem gcd_abs_right (a b : ℤ) : gcd (abs a) b = gcd a b := by rewrite [↑gcd, *nat_abs_abs] theorem gcd_abs_abs (a b : ℤ) : gcd (abs a) (abs b) = gcd a b := by rewrite [↑gcd, *nat_abs_abs] theorem gcd_of_ne_zero (a : ℤ) {b : ℤ} (H : b ≠ 0) : gcd a b = gcd b (abs a mod abs b) := sorry /- have nat_abs b ≠ nat.zero, from assume H', H (eq_zero_of_nat_abs_eq_zero H'), have (#nat nat_abs b > nat.zero), from nat.pos_of_ne_zero this, assert nat.gcd (nat_abs a) (nat_abs b) = (#nat nat.gcd (nat_abs b) (nat_abs a mod nat_abs b)), from @nat.gcd_of_pos (nat_abs a) (nat_abs b) this, calc gcd a b = nat.gcd (nat_abs b) (#nat nat_abs a mod nat_abs b) : by rewrite [↑gcd, this] ... = gcd (abs b) (abs a mod abs b) : by rewrite [↑gcd, -*of_nat_nat_abs, of_nat_mod] ... = gcd b (abs a mod abs b) : by rewrite [↑gcd, *nat_abs_abs] -/ theorem gcd_of_pos (a : ℤ) {b : ℤ} (H : b > 0) : gcd a b = gcd b (abs a mod b) := by rewrite [!gcd_of_ne_zero (ne_of_gt H), abs_of_pos H] theorem gcd_of_nonneg_of_pos {a b : ℤ} (H1 : a ≥ 0) (H2 : b > 0) : gcd a b = gcd b (a mod b) := by rewrite [!gcd_of_pos H2, abs_of_nonneg H1] theorem gcd_self (a : ℤ) : gcd a a = abs a := by rewrite [↑gcd, nat.gcd_self, of_nat_nat_abs] theorem gcd_dvd_left (a b : ℤ) : gcd a b ∣ a := have gcd a b ∣ abs a, by rewrite [↑gcd, -of_nat_nat_abs, of_nat_dvd_of_nat_iff]; apply nat.gcd_dvd_left, iff.mp !dvd_abs_iff this theorem gcd_dvd_right (a b : ℤ) : gcd a b ∣ b := by rewrite gcd.comm; apply gcd_dvd_left theorem dvd_gcd {a b c : ℤ} : a ∣ b → a ∣ c → a ∣ gcd b c := begin rewrite [↑gcd, -*(abs_dvd_iff a), -(dvd_abs_iff _ b), -(dvd_abs_iff _ c), -*of_nat_nat_abs], rewrite [*of_nat_dvd_of_nat_iff] , apply nat.dvd_gcd end theorem gcd.assoc (a b c : ℤ) : gcd (gcd a b) c = gcd a (gcd b c) := dvd.antisymm !gcd_nonneg !gcd_nonneg (dvd_gcd (dvd.trans !gcd_dvd_left !gcd_dvd_left) (dvd_gcd (dvd.trans !gcd_dvd_left !gcd_dvd_right) !gcd_dvd_right)) (dvd_gcd (dvd_gcd !gcd_dvd_left (dvd.trans !gcd_dvd_right !gcd_dvd_left)) (dvd.trans !gcd_dvd_right !gcd_dvd_right)) theorem gcd_mul_left (a b c : ℤ) : gcd (a * b) (a * c) = abs a * gcd b c := by rewrite [↑gcd, *nat_abs_mul, nat.gcd_mul_left, of_nat_mul, of_nat_nat_abs] theorem gcd_mul_right (a b c : ℤ) : gcd (a * b) (c * b) = gcd a c * abs b := by rewrite [mul.comm a, mul.comm c, mul.comm (gcd a c), gcd_mul_left] theorem gcd_pos_of_ne_zero_left {a : ℤ} (b : ℤ) (H : a ≠ 0) : gcd a b > 0 := have gcd a b ≠ 0, from suppose gcd a b = 0, have 0 ∣ a, from this ▸ gcd_dvd_left a b, show false, from H (eq_zero_of_zero_dvd this), lt_of_le_of_ne (gcd_nonneg a b) (ne.symm this) theorem gcd_pos_of_ne_zero_right (a : ℤ) {b : ℤ} (H : b ≠ 0) : gcd a b > 0 := by rewrite gcd.comm; apply !gcd_pos_of_ne_zero_left H theorem eq_zero_of_gcd_eq_zero_left {a b : ℤ} (H : gcd a b = 0) : a = 0 := decidable.by_contradiction (suppose a ≠ 0, have gcd a b > 0, from !gcd_pos_of_ne_zero_left this, ne_of_lt this H⁻¹) theorem eq_zero_of_gcd_eq_zero_right {a b : ℤ} (H : gcd a b = 0) : b = 0 := by rewrite gcd.comm at H; apply !eq_zero_of_gcd_eq_zero_left H theorem gcd_div {a b c : ℤ} (H1 : c ∣ a) (H2 : c ∣ b) : gcd (a div c) (b div c) = gcd a b div (abs c) := decidable.by_cases (suppose c = 0, calc gcd (a div c) (b div c) = gcd 0 0 : by subst c; rewrite *div_zero ... = 0 : gcd_zero_left ... = gcd a b div 0 : div_zero ... = gcd a b div (abs c) : by subst c) (suppose c ≠ 0, have abs c ≠ 0, from assume H', this (eq_zero_of_abs_eq_zero H'), eq.symm (div_eq_of_eq_mul_left this (eq.symm (calc gcd (a div c) (b div c) * abs c = gcd (a div c * c) (b div c * c) : gcd_mul_right ... = gcd a (b div c * c) : div_mul_cancel H1 ... = gcd a b : div_mul_cancel H2)))) theorem gcd_dvd_gcd_mul_left (a b c : ℤ) : gcd a b ∣ gcd (c * a) b := dvd_gcd (dvd.trans !gcd_dvd_left !dvd_mul_left) !gcd_dvd_right theorem gcd_dvd_gcd_mul_right (a b c : ℤ) : gcd a b ∣ gcd (a * c) b := !mul.comm ▸ !gcd_dvd_gcd_mul_left theorem div_gcd_eq_div_gcd_of_nonneg {a₁ b₁ a₂ b₂ : ℤ} (H : a₁ * b₂ = a₂ * b₁) (H1 : b₁ ≠ 0) (H2 : b₂ ≠ 0) (H3 : a₁ ≥ 0) (H4 : a₂ ≥ 0) : a₁ div (gcd a₁ b₁) = a₂ div (gcd a₂ b₂) := begin apply div_eq_div_of_dvd_of_dvd, repeat (apply gcd_dvd_left), intro H', apply H1, apply eq_zero_of_gcd_eq_zero_right H', intro H', apply H2, apply eq_zero_of_gcd_eq_zero_right H', rewrite [-abs_of_nonneg H3 at {1}, -abs_of_nonneg H4 at {2}], rewrite [-gcd_mul_left, -gcd_mul_right, H, mul.comm b₁] end theorem div_gcd_eq_div_gcd {a₁ b₁ a₂ b₂ : ℤ} (H : a₁ * b₂ = a₂ * b₁) (H1 : b₁ > 0) (H2 : b₂ > 0) : a₁ div (gcd a₁ b₁) = a₂ div (gcd a₂ b₂) := or.elim (le_or_gt 0 a₁) (assume H3 : a₁ ≥ 0, have H4 : a₂ * b₁ ≥ 0, by rewrite -H; apply mul_nonneg H3 (le_of_lt H2), have H5 : a₂ ≥ 0, from nonneg_of_mul_nonneg_right H4 H1, div_gcd_eq_div_gcd_of_nonneg H (ne_of_gt H1) (ne_of_gt H2) H3 H5) (assume H3 : a₁ < 0, have H4 : a₂ * b₁ < 0, by rewrite -H; apply mul_neg_of_neg_of_pos H3 H2, assert H5 : a₂ < 0, from neg_of_mul_neg_right H4 (le_of_lt H1), assert H6 : abs a₁ div (gcd (abs a₁) (abs b₁)) = abs a₂ div (gcd (abs a₂) (abs b₂)), begin apply div_gcd_eq_div_gcd_of_nonneg, rewrite [abs_of_pos H1, abs_of_pos H2, abs_of_neg H3, abs_of_neg H5], rewrite [-*neg_mul_eq_neg_mul, H], apply ne_of_gt (abs_pos_of_pos H1), apply ne_of_gt (abs_pos_of_pos H2), repeat (apply abs_nonneg) end, have H7 : -a₁ div (gcd a₁ b₁) = -a₂ div (gcd a₂ b₂), begin rewrite [-abs_of_neg H3, -abs_of_neg H5, -gcd_abs_abs a₁], rewrite [-gcd_abs_abs a₂ b₂], exact H6 end, calc a₁ div (gcd a₁ b₁) = -(-a₁ div (gcd a₁ b₁)) : by rewrite [neg_div_of_dvd !gcd_dvd_left, neg_neg] ... = -(-a₂ div (gcd a₂ b₂)) : H7 ... = a₂ div (gcd a₂ b₂) : by rewrite [neg_div_of_dvd !gcd_dvd_left, neg_neg]) /- lcm -/ definition lcm (a b : ℤ) : ℤ := of_nat (nat.lcm (nat_abs a) (nat_abs b)) theorem lcm_nonneg (a b : ℤ) : lcm a b ≥ 0 := of_nat_nonneg (nat.lcm (nat_abs a) (nat_abs b)) theorem lcm.comm (a b : ℤ) : lcm a b = lcm b a := by rewrite [↑lcm, nat.lcm.comm] theorem lcm_zero_left (a : ℤ) : lcm 0 a = 0 := by krewrite [↑lcm, nat.lcm_zero_left] theorem lcm_zero_right (a : ℤ) : lcm a 0 = 0 := !lcm.comm ▸ !lcm_zero_left theorem lcm_one_left (a : ℤ) : lcm 1 a = abs a := by krewrite [↑lcm, nat.lcm_one_left, of_nat_nat_abs] theorem lcm_one_right (a : ℤ) : lcm a 1 = abs a := !lcm.comm ▸ !lcm_one_left theorem lcm_abs_left (a b : ℤ) : lcm (abs a) b = lcm a b := by rewrite [↑lcm, *nat_abs_abs] theorem lcm_abs_right (a b : ℤ) : lcm (abs a) b = lcm a b := by rewrite [↑lcm, *nat_abs_abs] theorem lcm_abs_abs (a b : ℤ) : lcm (abs a) (abs b) = lcm a b := by rewrite [↑lcm, *nat_abs_abs] theorem lcm_self (a : ℤ) : lcm a a = abs a := by krewrite [↑lcm, nat.lcm_self, of_nat_nat_abs] theorem dvd_lcm_left (a b : ℤ) : a ∣ lcm a b := by rewrite [↑lcm, -abs_dvd_iff, -of_nat_nat_abs, of_nat_dvd_of_nat_iff]; apply nat.dvd_lcm_left theorem dvd_lcm_right (a b : ℤ) : b ∣ lcm a b := !lcm.comm ▸ !dvd_lcm_left theorem gcd_mul_lcm (a b : ℤ) : gcd a b * lcm a b = abs (a * b) := begin rewrite [↑gcd, ↑lcm, -of_nat_nat_abs, -of_nat_mul, of_nat_eq_of_nat_iff, nat_abs_mul], apply nat.gcd_mul_lcm end theorem lcm_dvd {a b c : ℤ} : a ∣ c → b ∣ c → lcm a b ∣ c := begin rewrite [↑lcm, -(abs_dvd_iff a), -(abs_dvd_iff b), -*(dvd_abs_iff _ c), -*of_nat_nat_abs], rewrite [*of_nat_dvd_of_nat_iff] , apply nat.lcm_dvd end theorem lcm_assoc (a b c : ℤ) : lcm (lcm a b) c = lcm a (lcm b c) := dvd.antisymm !lcm_nonneg !lcm_nonneg (lcm_dvd (lcm_dvd !dvd_lcm_left (dvd.trans !dvd_lcm_left !dvd_lcm_right)) (dvd.trans !dvd_lcm_right !dvd_lcm_right)) (lcm_dvd (dvd.trans !dvd_lcm_left !dvd_lcm_left) (lcm_dvd (dvd.trans !dvd_lcm_right !dvd_lcm_left) !dvd_lcm_right)) /- coprime -/ abbreviation coprime (a b : ℤ) : Prop := gcd a b = 1 theorem coprime_swap {a b : ℤ} (H : coprime b a) : coprime a b := !gcd.comm ▸ H theorem dvd_of_coprime_of_dvd_mul_right {a b c : ℤ} (H1 : coprime c b) (H2 : c ∣ a * b) : c ∣ a := assert H3 : gcd (a * c) (a * b) = abs a, from calc gcd (a * c) (a * b) = abs a * gcd c b : gcd_mul_left ... = abs a * 1 : H1 ... = abs a : mul_one, assert H4 : (c ∣ gcd (a * c) (a * b)), from dvd_gcd !dvd_mul_left H2, by rewrite [-dvd_abs_iff, -H3]; apply H4 theorem dvd_of_coprime_of_dvd_mul_left {a b c : ℤ} (H1 : coprime c a) (H2 : c ∣ a * b) : c ∣ b := dvd_of_coprime_of_dvd_mul_right H1 (!mul.comm ▸ H2) theorem gcd_mul_left_cancel_of_coprime {c : ℤ} (a : ℤ) {b : ℤ} (H : coprime c b) : gcd (c * a) b = gcd a b := begin revert H, rewrite [↑coprime, ↑gcd, *of_nat_eq_of_nat_iff, nat_abs_mul], apply nat.gcd_mul_left_cancel_of_coprime end theorem gcd_mul_right_cancel_of_coprime (a : ℤ) {c b : ℤ} (H : coprime c b) : gcd (a * c) b = gcd a b := !mul.comm ▸ !gcd_mul_left_cancel_of_coprime H theorem gcd_mul_left_cancel_of_coprime_right {c a : ℤ} (b : ℤ) (H : coprime c a) : gcd a (c * b) = gcd a b := !gcd.comm ▸ !gcd.comm ▸ !gcd_mul_left_cancel_of_coprime H theorem gcd_mul_right_cancel_of_coprime_right {c a : ℤ} (b : ℤ) (H : coprime c a) : gcd a (b * c) = gcd a b := !gcd.comm ▸ !gcd.comm ▸ !gcd_mul_right_cancel_of_coprime H theorem coprime_div_gcd_div_gcd {a b : ℤ} (H : gcd a b ≠ 0) : coprime (a div gcd a b) (b div gcd a b) := calc gcd (a div gcd a b) (b div gcd a b) = gcd a b div abs (gcd a b) : gcd_div !gcd_dvd_left !gcd_dvd_right ... = 1 : by rewrite [abs_of_nonneg !gcd_nonneg, div_self H] theorem not_coprime_of_dvd_of_dvd {m n d : ℤ} (dgt1 : d > 1) (Hm : d ∣ m) (Hn : d ∣ n) : ¬ coprime m n := assume co : coprime m n, assert d ∣ gcd m n, from dvd_gcd Hm Hn, have d ∣ 1, by rewrite [↑coprime at co, co at this]; apply this, have d ≤ 1, from le_of_dvd dec_trivial this, show false, from not_lt_of_ge `d ≤ 1` `d > 1` theorem exists_coprime {a b : ℤ} (H : gcd a b ≠ 0) : exists a' b', coprime a' b' ∧ a = a' * gcd a b ∧ b = b' * gcd a b := have H1 : a = (a div gcd a b) * gcd a b, from (div_mul_cancel !gcd_dvd_left)⁻¹, have H2 : b = (b div gcd a b) * gcd a b, from (div_mul_cancel !gcd_dvd_right)⁻¹, exists.intro _ (exists.intro _ (and.intro (coprime_div_gcd_div_gcd H) (and.intro H1 H2))) theorem coprime_mul {a b c : ℤ} (H1 : coprime a c) (H2 : coprime b c) : coprime (a * b) c := calc gcd (a * b) c = gcd b c : !gcd_mul_left_cancel_of_coprime H1 ... = 1 : H2 theorem coprime_mul_right {c a b : ℤ} (H1 : coprime c a) (H2 : coprime c b) : coprime c (a * b) := coprime_swap (coprime_mul (coprime_swap H1) (coprime_swap H2)) theorem coprime_of_coprime_mul_left {c a b : ℤ} (H : coprime (c * a) b) : coprime a b := have H1 : (gcd a b ∣ gcd (c * a) b), from !gcd_dvd_gcd_mul_left, eq_one_of_dvd_one !gcd_nonneg (H ▸ H1) theorem coprime_of_coprime_mul_right {c a b : ℤ} (H : coprime (a * c) b) : coprime a b := coprime_of_coprime_mul_left (!mul.comm ▸ H) theorem coprime_of_coprime_mul_left_right {c a b : ℤ} (H : coprime a (c * b)) : coprime a b := coprime_swap (coprime_of_coprime_mul_left (coprime_swap H)) theorem coprime_of_coprime_mul_right_right {c a b : ℤ} (H : coprime a (b * c)) : coprime a b := coprime_of_coprime_mul_left_right (!mul.comm ▸ H) theorem exists_eq_prod_and_dvd_and_dvd {a b c : ℤ} (H : c ∣ a * b) : ∃ a' b', c = a' * b' ∧ a' ∣ a ∧ b' ∣ b := decidable.by_cases (suppose gcd c a = 0, have c = 0, from eq_zero_of_gcd_eq_zero_left `gcd c a = 0`, have a = 0, from eq_zero_of_gcd_eq_zero_right `gcd c a = 0`, have c = 0 * b, from `c = 0` ⬝ !zero_mul⁻¹, have 0 ∣ a, from `a = 0`⁻¹ ▸ !dvd.refl, have b ∣ b, from !dvd.refl, exists.intro _ (exists.intro _ (and.intro `c = 0 * b` (and.intro `0 ∣ a` `b ∣ b`)))) (suppose gcd c a ≠ 0, have gcd c a ∣ c, from !gcd_dvd_left, have H3 : c div gcd c a ∣ (a * b) div gcd c a, from div_dvd_div this H, have H4 : (a * b) div gcd c a = (a div gcd c a) * b, from calc a * b div gcd c a = b * a div gcd c a : mul.comm ... = b * (a div gcd c a) : !mul_div_assoc !gcd_dvd_right ... = a div gcd c a * b : mul.comm, have H5 : c div gcd c a ∣ (a div gcd c a) * b, from H4 ▸ H3, have H6 : coprime (c div gcd c a) (a div gcd c a), from coprime_div_gcd_div_gcd `gcd c a ≠ 0`, have H7 : c div gcd c a ∣ b, from dvd_of_coprime_of_dvd_mul_left H6 H5, have H8 : c = gcd c a * (c div gcd c a), from (mul_div_cancel' `gcd c a ∣ c`)⁻¹, exists.intro _ (exists.intro _ (and.intro H8 (and.intro !gcd_dvd_right H7)))) end int