b35abcc6a8
"inst_simp" means "instantiate simplification lemmas" The idea is to make it clear that this strategy is *not* a simplifier.
616 lines
25 KiB
Text
616 lines
25 KiB
Text
/-
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Copyright (c) 2014 Jeremy Avigad. All rights reserved.
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Released under Apache 2.0 license as described in the file LICENSE.
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Authors: Jeremy Avigad, Leonardo de Moura
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Definitions and properties of div and mod. Much of the development follows Isabelle's library.
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-/
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import data.nat.sub
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open eq.ops well_founded decidable prod
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namespace nat
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/- div -/
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-- auxiliary lemma used to justify div
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private definition div_rec_lemma {x y : nat} : 0 < y ∧ y ≤ x → x - y < x :=
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and.rec (λ ypos ylex, sub_lt (lt_of_lt_of_le ypos ylex) ypos)
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private definition div.F (x : nat) (f : Π x₁, x₁ < x → nat → nat) (y : nat) : nat :=
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if H : 0 < y ∧ y ≤ x then f (x - y) (div_rec_lemma H) y + 1 else zero
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protected definition div := fix div.F
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definition nat_has_divide [reducible] [instance] [priority nat.prio] : has_div nat :=
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has_div.mk nat.div
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theorem div_def (x y : nat) : div x y = if 0 < y ∧ y ≤ x then div (x - y) y + 1 else 0 :=
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congr_fun (fix_eq div.F x) y
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protected theorem div_zero [simp] (a : ℕ) : a / 0 = 0 :=
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div_def a 0 ⬝ if_neg (!not_and_of_not_left (lt.irrefl 0))
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theorem div_eq_zero_of_lt {a b : ℕ} (h : a < b) : a / b = 0 :=
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div_def a b ⬝ if_neg (!not_and_of_not_right (not_le_of_gt h))
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protected theorem zero_div [simp] (b : ℕ) : 0 / b = 0 :=
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div_def 0 b ⬝ if_neg (and.rec not_le_of_gt)
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theorem div_eq_succ_sub_div {a b : ℕ} (h₁ : b > 0) (h₂ : a ≥ b) : a / b = succ ((a - b) / b) :=
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div_def a b ⬝ if_pos (and.intro h₁ h₂)
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theorem add_div_self (x : ℕ) {z : ℕ} (H : z > 0) : (x + z) / z = succ (x / z) :=
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calc
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(x + z) / z = if 0 < z ∧ z ≤ x + z then (x + z - z) / z + 1 else 0 : !div_def
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... = (x + z - z) / z + 1 : if_pos (and.intro H (le_add_left z x))
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... = succ (x / z) : {!nat.add_sub_cancel}
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theorem add_div_self_left {x : ℕ} (z : ℕ) (H : x > 0) : (x + z) / x = succ (z / x) :=
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!add.comm ▸ !add_div_self H
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local attribute succ_mul [simp]
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theorem add_mul_div_self {x y z : ℕ} (H : z > 0) : (x + y * z) / z = x / z + y :=
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nat.induction_on y
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(by simp)
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(take y,
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assume IH : (x + y * z) / z = x / z + y, calc
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(x + succ y * z) / z = (x + y * z + z) / z : by inst_simp
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... = succ ((x + y * z) / z) : !add_div_self H
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... = succ (x / z + y) : IH)
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theorem add_mul_div_self_left (x z : ℕ) {y : ℕ} (H : y > 0) : (x + y * z) / y = x / y + z :=
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!mul.comm ▸ add_mul_div_self H
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protected theorem mul_div_cancel (m : ℕ) {n : ℕ} (H : n > 0) : m * n / n = m :=
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calc
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m * n / n = (0 + m * n) / n : by simp
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... = 0 / n + m : add_mul_div_self H
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... = m : by simp
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protected theorem mul_div_cancel_left {m : ℕ} (n : ℕ) (H : m > 0) : m * n / m = n :=
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!mul.comm ▸ !nat.mul_div_cancel H
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/- mod -/
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private definition mod.F (x : nat) (f : Π x₁, x₁ < x → nat → nat) (y : nat) : nat :=
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if H : 0 < y ∧ y ≤ x then f (x - y) (div_rec_lemma H) y else x
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protected definition mod := fix mod.F
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definition nat_has_mod [reducible] [instance] [priority nat.prio] : has_mod nat :=
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has_mod.mk nat.mod
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notation [priority nat.prio] a ≡ b `[mod `:0 c:0 `]` := a % c = b % c
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theorem mod_def (x y : nat) : mod x y = if 0 < y ∧ y ≤ x then mod (x - y) y else x :=
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congr_fun (fix_eq mod.F x) y
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theorem mod_zero [simp] (a : ℕ) : a % 0 = a :=
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mod_def a 0 ⬝ if_neg (!not_and_of_not_left (lt.irrefl 0))
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theorem mod_eq_of_lt {a b : ℕ} (h : a < b) : a % b = a :=
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mod_def a b ⬝ if_neg (!not_and_of_not_right (not_le_of_gt h))
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theorem zero_mod [simp] (b : ℕ) : 0 % b = 0 :=
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mod_def 0 b ⬝ if_neg (λ h, and.rec_on h (λ l r, absurd (lt_of_lt_of_le l r) (lt.irrefl 0)))
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theorem mod_eq_sub_mod {a b : ℕ} (h₁ : b > 0) (h₂ : a ≥ b) : a % b = (a - b) % b :=
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mod_def a b ⬝ if_pos (and.intro h₁ h₂)
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theorem add_mod_self [simp] (x z : ℕ) : (x + z) % z = x % z :=
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by_cases_zero_pos z
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(by rewrite add_zero)
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(take z, assume H : z > 0,
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calc
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(x + z) % z = if 0 < z ∧ z ≤ x + z then (x + z - z) % z else _ : mod_def
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... = (x + z - z) % z : if_pos (and.intro H (le_add_left z x))
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... = x % z : nat.add_sub_cancel)
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theorem add_mod_self_left [simp] (x z : ℕ) : (x + z) % x = z % x :=
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!add.comm ▸ !add_mod_self
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local attribute succ_mul [simp]
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theorem add_mul_mod_self [simp] (x y z : ℕ) : (x + y * z) % z = x % z :=
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nat.induction_on y (by simp) (by inst_simp)
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theorem add_mul_mod_self_left [simp] (x y z : ℕ) : (x + y * z) % y = x % y :=
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by inst_simp
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theorem mul_mod_left [simp] (m n : ℕ) : (m * n) % n = 0 :=
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calc (m * n) % n = (0 + m * n) % n : by simp
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... = 0 : by inst_simp
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theorem mul_mod_right [simp] (m n : ℕ) : (m * n) % m = 0 :=
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by inst_simp
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theorem mod_lt (x : ℕ) {y : ℕ} (H : y > 0) : x % y < y :=
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nat.case_strong_induction_on x
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(show 0 % y < y, from !zero_mod⁻¹ ▸ H)
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(take x,
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assume IH : ∀x', x' ≤ x → x' % y < y,
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show succ x % y < y, from
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by_cases -- (succ x < y)
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(assume H1 : succ x < y,
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have succ x % y = succ x, from mod_eq_of_lt H1,
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show succ x % y < y, from this⁻¹ ▸ H1)
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(assume H1 : ¬ succ x < y,
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have y ≤ succ x, from le_of_not_gt H1,
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have h : succ x % y = (succ x - y) % y, from mod_eq_sub_mod H this,
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have succ x - y < succ x, from sub_lt !succ_pos H,
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have succ x - y ≤ x, from le_of_lt_succ this,
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show succ x % y < y, from h⁻¹ ▸ IH _ this))
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theorem mod_one (n : ℕ) : n % 1 = 0 :=
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have H1 : n % 1 < 1, from !mod_lt !succ_pos,
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eq_zero_of_le_zero (le_of_lt_succ H1)
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/- properties of div and mod -/
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-- the quotient - remainder theorem
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theorem eq_div_mul_add_mod (x y : ℕ) : x = x / y * y + x % y :=
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begin
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eapply by_cases_zero_pos y,
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show x = x / 0 * 0 + x % 0, from
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(calc
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x / 0 * 0 + x % 0 = 0 + x % 0 : mul_zero
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... = x % 0 : zero_add
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... = x : mod_zero)⁻¹,
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intro y H,
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show x = x / y * y + x % y,
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begin
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eapply nat.case_strong_induction_on x,
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show 0 = (0 / y) * y + 0 % y, by rewrite [zero_mod, add_zero, nat.zero_div, zero_mul],
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intro x IH,
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show succ x = succ x / y * y + succ x % y, from
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if H1 : succ x < y then
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assert H2 : succ x / y = 0, from div_eq_zero_of_lt H1,
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assert H3 : succ x % y = succ x, from mod_eq_of_lt H1,
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begin rewrite [H2, H3, zero_mul, zero_add] end
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else
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have H2 : y ≤ succ x, from le_of_not_gt H1,
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assert H3 : succ x / y = succ ((succ x - y) / y), from div_eq_succ_sub_div H H2,
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assert H4 : succ x % y = (succ x - y) % y, from mod_eq_sub_mod H H2,
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have H5 : succ x - y < succ x, from sub_lt !succ_pos H,
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assert H6 : succ x - y ≤ x, from le_of_lt_succ H5,
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(calc
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succ x / y * y + succ x % y =
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succ ((succ x - y) / y) * y + succ x % y : by rewrite H3
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... = ((succ x - y) / y) * y + y + succ x % y : by rewrite succ_mul
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... = ((succ x - y) / y) * y + y + (succ x - y) % y : by rewrite H4
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... = ((succ x - y) / y) * y + (succ x - y) % y + y : add.right_comm
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... = succ x - y + y : by rewrite -(IH _ H6)
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... = succ x : nat.sub_add_cancel H2)⁻¹
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end
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end
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theorem mod_eq_sub_div_mul (x y : ℕ) : x % y = x - x / y * y :=
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nat.eq_sub_of_add_eq (!add.comm ▸ !eq_div_mul_add_mod)⁻¹
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theorem mod_add_mod (m n k : ℕ) : (m % n + k) % n = (m + k) % n :=
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by rewrite [eq_div_mul_add_mod m n at {2}, add.assoc, add.comm (m / n * n), add_mul_mod_self]
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theorem add_mod_mod (m n k : ℕ) : (m + n % k) % k = (m + n) % k :=
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by rewrite [add.comm, mod_add_mod, add.comm]
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theorem add_mod_eq_add_mod_right {m n k : ℕ} (i : ℕ) (H : m % n = k % n) :
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(m + i) % n = (k + i) % n :=
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by rewrite [-mod_add_mod, -mod_add_mod k, H]
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theorem add_mod_eq_add_mod_left {m n k : ℕ} (i : ℕ) (H : m % n = k % n) :
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(i + m) % n = (i + k) % n :=
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by rewrite [add.comm, add_mod_eq_add_mod_right _ H, add.comm]
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theorem mod_eq_mod_of_add_mod_eq_add_mod_right {m n k i : ℕ} :
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(m + i) % n = (k + i) % n → m % n = k % n :=
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by_cases_zero_pos n
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(by rewrite [*mod_zero]; apply eq_of_add_eq_add_right)
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(take n,
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assume npos : n > 0,
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assume H1 : (m + i) % n = (k + i) % n,
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have H2 : (m + i % n) % n = (k + i % n) % n, by rewrite [*add_mod_mod, H1],
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assert H3 : (m + i % n + (n - i % n)) % n = (k + i % n + (n - i % n)) % n,
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from add_mod_eq_add_mod_right _ H2,
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begin
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revert H3,
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rewrite [*add.assoc, add_sub_of_le (le_of_lt (!mod_lt npos)), *add_mod_self],
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intros, assumption
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end)
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theorem mod_eq_mod_of_add_mod_eq_add_mod_left {m n k i : ℕ} :
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(i + m) % n = (i + k) % n → m % n = k % n :=
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by rewrite [add.comm i m, add.comm i k]; apply mod_eq_mod_of_add_mod_eq_add_mod_right
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theorem mod_le {x y : ℕ} : x % y ≤ x :=
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!eq_div_mul_add_mod⁻¹ ▸ !le_add_left
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theorem eq_remainder {q1 r1 q2 r2 y : ℕ} (H1 : r1 < y) (H2 : r2 < y)
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(H3 : q1 * y + r1 = q2 * y + r2) : r1 = r2 :=
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calc
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r1 = r1 % y : mod_eq_of_lt H1
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... = (r1 + q1 * y) % y : !add_mul_mod_self⁻¹
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... = (q1 * y + r1) % y : add.comm
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... = (r2 + q2 * y) % y : by rewrite [H3, add.comm]
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... = r2 % y : !add_mul_mod_self
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... = r2 : mod_eq_of_lt H2
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theorem eq_quotient {q1 r1 q2 r2 y : ℕ} (H1 : r1 < y) (H2 : r2 < y)
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(H3 : q1 * y + r1 = q2 * y + r2) : q1 = q2 :=
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have H4 : q1 * y + r2 = q2 * y + r2, from (eq_remainder H1 H2 H3) ▸ H3,
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have H5 : q1 * y = q2 * y, from add.right_cancel H4,
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have H6 : y > 0, from lt_of_le_of_lt !zero_le H1,
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show q1 = q2, from eq_of_mul_eq_mul_right H6 H5
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protected theorem mul_div_mul_left {z : ℕ} (x y : ℕ) (zpos : z > 0) :
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(z * x) / (z * y) = x / y :=
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if H : y = 0 then
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by rewrite [H, mul_zero, *nat.div_zero]
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else
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have ypos : y > 0, from pos_of_ne_zero H,
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have zypos : z * y > 0, from mul_pos zpos ypos,
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have H1 : (z * x) % (z * y) < z * y, from !mod_lt zypos,
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have H2 : z * (x % y) < z * y, from mul_lt_mul_of_pos_left (!mod_lt ypos) zpos,
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eq_quotient H1 H2
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(calc
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((z * x) / (z * y)) * (z * y) + (z * x) % (z * y) = z * x : eq_div_mul_add_mod
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... = z * (x / y * y + x % y) : eq_div_mul_add_mod
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... = z * (x / y * y) + z * (x % y) : left_distrib
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... = (x / y) * (z * y) + z * (x % y) : mul.left_comm)
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protected theorem mul_div_mul_right {x z y : ℕ} (zpos : z > 0) : (x * z) / (y * z) = x / y :=
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!mul.comm ▸ !mul.comm ▸ !nat.mul_div_mul_left zpos
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theorem mul_mod_mul_left (z x y : ℕ) : (z * x) % (z * y) = z * (x % y) :=
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or.elim (eq_zero_or_pos z)
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(assume H : z = 0, H⁻¹ ▸ calc
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(0 * x) % (z * y) = 0 % (z * y) : zero_mul
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... = 0 : zero_mod
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... = 0 * (x % y) : zero_mul)
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(assume zpos : z > 0,
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or.elim (eq_zero_or_pos y)
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(assume H : y = 0, by rewrite [H, mul_zero, *mod_zero])
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(assume ypos : y > 0,
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have zypos : z * y > 0, from mul_pos zpos ypos,
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have H1 : (z * x) % (z * y) < z * y, from !mod_lt zypos,
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have H2 : z * (x % y) < z * y, from mul_lt_mul_of_pos_left (!mod_lt ypos) zpos,
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eq_remainder H1 H2
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(calc
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((z * x) / (z * y)) * (z * y) + (z * x) % (z * y) = z * x : eq_div_mul_add_mod
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... = z * (x / y * y + x % y) : eq_div_mul_add_mod
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... = z * (x / y * y) + z * (x % y) : left_distrib
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... = (x / y) * (z * y) + z * (x % y) : mul.left_comm)))
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theorem mul_mod_mul_right (x z y : ℕ) : (x * z) % (y * z) = (x % y) * z :=
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mul.comm z x ▸ mul.comm z y ▸ !mul.comm ▸ !mul_mod_mul_left
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theorem mod_self (n : ℕ) : n % n = 0 :=
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nat.cases_on n (by rewrite zero_mod)
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(take n, by rewrite [-zero_add (succ n) at {1}, add_mod_self])
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theorem mul_mod_eq_mod_mul_mod (m n k : nat) : (m * n) % k = ((m % k) * n) % k :=
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calc
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(m * n) % k = (((m / k) * k + m % k) * n) % k : eq_div_mul_add_mod
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... = ((m % k) * n) % k :
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by rewrite [right_distrib, mul.right_comm, add.comm, add_mul_mod_self]
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theorem mul_mod_eq_mul_mod_mod (m n k : nat) : (m * n) % k = (m * (n % k)) % k :=
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!mul.comm ▸ !mul.comm ▸ !mul_mod_eq_mod_mul_mod
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protected theorem div_one (n : ℕ) : n / 1 = n :=
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assert n / 1 * 1 + n % 1 = n, from !eq_div_mul_add_mod⁻¹,
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begin rewrite [-this at {2}, mul_one, mod_one] end
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protected theorem div_self {n : ℕ} (H : n > 0) : n / n = 1 :=
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assert (n * 1) / (n * 1) = 1 / 1, from !nat.mul_div_mul_left H,
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by rewrite [nat.div_one at this, -this, *mul_one]
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theorem div_mul_cancel_of_mod_eq_zero {m n : ℕ} (H : m % n = 0) : m / n * n = m :=
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by rewrite [eq_div_mul_add_mod m n at {2}, H, add_zero]
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theorem mul_div_cancel_of_mod_eq_zero {m n : ℕ} (H : m % n = 0) : n * (m / n) = m :=
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!mul.comm ▸ div_mul_cancel_of_mod_eq_zero H
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/- dvd -/
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theorem dvd_of_mod_eq_zero {m n : ℕ} (H : n % m = 0) : m ∣ n :=
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dvd.intro (!mul.comm ▸ div_mul_cancel_of_mod_eq_zero H)
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theorem mod_eq_zero_of_dvd {m n : ℕ} (H : m ∣ n) : n % m = 0 :=
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dvd.elim H (take z, assume H1 : n = m * z, H1⁻¹ ▸ !mul_mod_right)
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theorem dvd_iff_mod_eq_zero (m n : ℕ) : m ∣ n ↔ n % m = 0 :=
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iff.intro mod_eq_zero_of_dvd dvd_of_mod_eq_zero
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definition dvd.decidable_rel [instance] : decidable_rel dvd :=
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take m n, decidable_of_decidable_of_iff _ (iff.symm !dvd_iff_mod_eq_zero)
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protected theorem div_mul_cancel {m n : ℕ} (H : n ∣ m) : m / n * n = m :=
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div_mul_cancel_of_mod_eq_zero (mod_eq_zero_of_dvd H)
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protected theorem mul_div_cancel' {m n : ℕ} (H : n ∣ m) : n * (m / n) = m :=
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!mul.comm ▸ nat.div_mul_cancel H
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theorem dvd_of_dvd_add_left {m n₁ n₂ : ℕ} (H₁ : m ∣ n₁ + n₂) (H₂ : m ∣ n₁) : m ∣ n₂ :=
|
||
obtain (c₁ : nat) (Hc₁ : n₁ + n₂ = m * c₁), from H₁,
|
||
obtain (c₂ : nat) (Hc₂ : n₁ = m * c₂), from H₂,
|
||
have aux : m * (c₁ - c₂) = n₂, from calc
|
||
m * (c₁ - c₂) = m * c₁ - m * c₂ : nat.mul_sub_left_distrib
|
||
... = n₁ + n₂ - m * c₂ : Hc₁
|
||
... = n₁ + n₂ - n₁ : Hc₂
|
||
... = n₂ : nat.add_sub_cancel_left,
|
||
dvd.intro aux
|
||
|
||
theorem dvd_of_dvd_add_right {m n₁ n₂ : ℕ} (H : m ∣ n₁ + n₂) : m ∣ n₂ → m ∣ n₁ :=
|
||
nat.dvd_of_dvd_add_left (!add.comm ▸ H)
|
||
|
||
theorem dvd_sub {m n₁ n₂ : ℕ} (H1 : m ∣ n₁) (H2 : m ∣ n₂) : m ∣ n₁ - n₂ :=
|
||
by_cases
|
||
(assume H3 : n₁ ≥ n₂,
|
||
have H4 : n₁ = n₁ - n₂ + n₂, from (nat.sub_add_cancel H3)⁻¹,
|
||
show m ∣ n₁ - n₂, from nat.dvd_of_dvd_add_right (H4 ▸ H1) H2)
|
||
(assume H3 : ¬ (n₁ ≥ n₂),
|
||
have H4 : n₁ - n₂ = 0, from sub_eq_zero_of_le (le_of_lt (lt_of_not_ge H3)),
|
||
show m ∣ n₁ - n₂, from H4⁻¹ ▸ dvd_zero _)
|
||
|
||
theorem dvd.antisymm {m n : ℕ} : m ∣ n → n ∣ m → m = n :=
|
||
by_cases_zero_pos n
|
||
(assume H1, assume H2 : 0 ∣ m, eq_zero_of_zero_dvd H2)
|
||
(take n,
|
||
assume Hpos : n > 0,
|
||
assume H1 : m ∣ n,
|
||
assume H2 : n ∣ m,
|
||
obtain k (Hk : n = m * k), from exists_eq_mul_right_of_dvd H1,
|
||
obtain l (Hl : m = n * l), from exists_eq_mul_right_of_dvd H2,
|
||
have n * (l * k) = n, from !mul.assoc ▸ Hl ▸ Hk⁻¹,
|
||
have l * k = 1, from eq_one_of_mul_eq_self_right Hpos this,
|
||
have k = 1, from eq_one_of_mul_eq_one_left this,
|
||
show m = n, from (mul_one m)⁻¹ ⬝ (this ▸ Hk⁻¹))
|
||
|
||
protected theorem mul_div_assoc (m : ℕ) {n k : ℕ} (H : k ∣ n) : m * n / k = m * (n / k) :=
|
||
or.elim (eq_zero_or_pos k)
|
||
(assume H1 : k = 0,
|
||
calc
|
||
m * n / k = m * n / 0 : H1
|
||
... = 0 : nat.div_zero
|
||
... = m * 0 : mul_zero m
|
||
... = m * (n / 0) : nat.div_zero
|
||
... = m * (n / k) : H1)
|
||
(assume H1 : k > 0,
|
||
have H2 : n = n / k * k, from (nat.div_mul_cancel H)⁻¹,
|
||
calc
|
||
m * n / k = m * (n / k * k) / k : H2
|
||
... = m * (n / k) * k / k : mul.assoc
|
||
... = m * (n / k) : nat.mul_div_cancel _ H1)
|
||
|
||
theorem dvd_of_mul_dvd_mul_left {m n k : ℕ} (kpos : k > 0) (H : k * m ∣ k * n) : m ∣ n :=
|
||
dvd.elim H
|
||
(take l,
|
||
assume H1 : k * n = k * m * l,
|
||
have H2 : n = m * l, from eq_of_mul_eq_mul_left kpos (H1 ⬝ !mul.assoc),
|
||
dvd.intro H2⁻¹)
|
||
|
||
theorem dvd_of_mul_dvd_mul_right {m n k : ℕ} (kpos : k > 0) (H : m * k ∣ n * k) : m ∣ n :=
|
||
nat.dvd_of_mul_dvd_mul_left kpos (!mul.comm ▸ !mul.comm ▸ H)
|
||
|
||
lemma dvd_of_eq_mul (i j n : nat) : n = j*i → j ∣ n :=
|
||
begin intros, subst n, apply dvd_mul_right end
|
||
|
||
theorem div_dvd_div {k m n : ℕ} (H1 : k ∣ m) (H2 : m ∣ n) : m / k ∣ n / k :=
|
||
have H3 : m = m / k * k, from (nat.div_mul_cancel H1)⁻¹,
|
||
have H4 : n = n / k * k, from (nat.div_mul_cancel (dvd.trans H1 H2))⁻¹,
|
||
or.elim (eq_zero_or_pos k)
|
||
(assume H5 : k = 0,
|
||
have H6: n / k = 0, from (congr_arg _ H5 ⬝ !nat.div_zero),
|
||
H6⁻¹ ▸ !dvd_zero)
|
||
(assume H5 : k > 0,
|
||
nat.dvd_of_mul_dvd_mul_right H5 (H3 ▸ H4 ▸ H2))
|
||
|
||
protected theorem div_eq_iff_eq_mul_right {m n : ℕ} (k : ℕ) (H : n > 0) (H' : n ∣ m) :
|
||
m / n = k ↔ m = n * k :=
|
||
iff.intro
|
||
(assume H1, by rewrite [-H1, nat.mul_div_cancel' H'])
|
||
(assume H1, by rewrite [H1, !nat.mul_div_cancel_left H])
|
||
|
||
protected theorem div_eq_iff_eq_mul_left {m n : ℕ} (k : ℕ) (H : n > 0) (H' : n ∣ m) :
|
||
m / n = k ↔ m = k * n :=
|
||
!mul.comm ▸ !nat.div_eq_iff_eq_mul_right H H'
|
||
|
||
protected theorem eq_mul_of_div_eq_right {m n k : ℕ} (H1 : n ∣ m) (H2 : m / n = k) :
|
||
m = n * k :=
|
||
calc
|
||
m = n * (m / n) : nat.mul_div_cancel' H1
|
||
... = n * k : H2
|
||
|
||
protected theorem div_eq_of_eq_mul_right {m n k : ℕ} (H1 : n > 0) (H2 : m = n * k) :
|
||
m / n = k :=
|
||
calc
|
||
m / n = n * k / n : H2
|
||
... = k : !nat.mul_div_cancel_left H1
|
||
|
||
protected theorem eq_mul_of_div_eq_left {m n k : ℕ} (H1 : n ∣ m) (H2 : m / n = k) :
|
||
m = k * n :=
|
||
!mul.comm ▸ !nat.eq_mul_of_div_eq_right H1 H2
|
||
|
||
protected theorem div_eq_of_eq_mul_left {m n k : ℕ} (H1 : n > 0) (H2 : m = k * n) :
|
||
m / n = k :=
|
||
!nat.div_eq_of_eq_mul_right H1 (!mul.comm ▸ H2)
|
||
|
||
lemma add_mod_eq_of_dvd (i j n : nat) : n ∣ j → (i + j) % n = i % n :=
|
||
assume h,
|
||
obtain k (hk : j = n * k), from exists_eq_mul_right_of_dvd h,
|
||
begin
|
||
subst j, rewrite mul.comm,
|
||
apply add_mul_mod_self
|
||
end
|
||
|
||
/- / and ordering -/
|
||
|
||
lemma le_of_dvd {m n : nat} : n > 0 → m ∣ n → m ≤ n :=
|
||
assume (h₁ : n > 0) (h₂ : m ∣ n),
|
||
assert h₃ : n % m = 0, from mod_eq_zero_of_dvd h₂,
|
||
by_contradiction
|
||
(λ nle : ¬ m ≤ n,
|
||
have h₄ : m > n, from lt_of_not_ge nle,
|
||
assert h₅ : n % m = n, from mod_eq_of_lt h₄,
|
||
begin
|
||
rewrite h₃ at h₅, subst n,
|
||
exact absurd h₁ (lt.irrefl 0)
|
||
end)
|
||
|
||
theorem div_mul_le (m n : ℕ) : m / n * n ≤ m :=
|
||
calc
|
||
m = m / n * n + m % n : eq_div_mul_add_mod
|
||
... ≥ m / n * n : le_add_right
|
||
|
||
protected theorem div_le_of_le_mul {m n k : ℕ} (H : m ≤ n * k) : m / k ≤ n :=
|
||
or.elim (eq_zero_or_pos k)
|
||
(assume H1 : k = 0,
|
||
calc
|
||
m / k = m / 0 : H1
|
||
... = 0 : nat.div_zero
|
||
... ≤ n : zero_le)
|
||
(assume H1 : k > 0,
|
||
le_of_mul_le_mul_right (calc
|
||
m / k * k ≤ m / k * k + m % k : le_add_right
|
||
... = m : eq_div_mul_add_mod
|
||
... ≤ n * k : H) H1)
|
||
|
||
protected theorem div_le_self (m n : ℕ) : m / n ≤ m :=
|
||
nat.cases_on n (!nat.div_zero⁻¹ ▸ !zero_le)
|
||
take n,
|
||
have H : m ≤ m * succ n, from calc
|
||
m = m * 1 : mul_one
|
||
... ≤ m * succ n : !mul_le_mul_left (succ_le_succ !zero_le),
|
||
nat.div_le_of_le_mul H
|
||
|
||
protected theorem mul_le_of_le_div {m n k : ℕ} (H : m ≤ n / k) : m * k ≤ n :=
|
||
calc
|
||
m * k ≤ n / k * k : !mul_le_mul_right H
|
||
... ≤ n : div_mul_le
|
||
|
||
protected theorem le_div_of_mul_le {m n k : ℕ} (H1 : k > 0) (H2 : m * k ≤ n) : m ≤ n / k :=
|
||
have H3 : m * k < (succ (n / k)) * k, from
|
||
calc
|
||
m * k ≤ n : H2
|
||
... = n / k * k + n % k : eq_div_mul_add_mod
|
||
... < n / k * k + k : add_lt_add_left (!mod_lt H1)
|
||
... = (succ (n / k)) * k : succ_mul,
|
||
le_of_lt_succ (lt_of_mul_lt_mul_right H3)
|
||
|
||
protected theorem le_div_iff_mul_le {m n k : ℕ} (H : k > 0) : m ≤ n / k ↔ m * k ≤ n :=
|
||
iff.intro !nat.mul_le_of_le_div (!nat.le_div_of_mul_le H)
|
||
|
||
protected theorem div_le_div {m n : ℕ} (k : ℕ) (H : m ≤ n) : m / k ≤ n / k :=
|
||
by_cases_zero_pos k
|
||
(by rewrite [*nat.div_zero])
|
||
(take k, assume H1 : k > 0, nat.le_div_of_mul_le H1 (le.trans !div_mul_le H))
|
||
|
||
protected theorem div_lt_of_lt_mul {m n k : ℕ} (H : m < n * k) : m / k < n :=
|
||
lt_of_mul_lt_mul_right (calc
|
||
m / k * k ≤ m / k * k + m % k : le_add_right
|
||
... = m : eq_div_mul_add_mod
|
||
... < n * k : H)
|
||
|
||
protected theorem lt_mul_of_div_lt {m n k : ℕ} (H1 : k > 0) (H2 : m / k < n) : m < n * k :=
|
||
assert H3 : succ (m / k) * k ≤ n * k, from !mul_le_mul_right (succ_le_of_lt H2),
|
||
have H4 : m / k * k + k ≤ n * k, by rewrite [succ_mul at H3]; apply H3,
|
||
calc
|
||
m = m / k * k + m % k : eq_div_mul_add_mod
|
||
... < m / k * k + k : add_lt_add_left (!mod_lt H1)
|
||
... ≤ n * k : H4
|
||
|
||
protected theorem div_lt_iff_lt_mul {m n k : ℕ} (H : k > 0) : m / k < n ↔ m < n * k :=
|
||
iff.intro (!nat.lt_mul_of_div_lt H) !nat.div_lt_of_lt_mul
|
||
|
||
protected theorem div_le_iff_le_mul_of_div {m n : ℕ} (k : ℕ) (H : n > 0) (H' : n ∣ m) :
|
||
m / n ≤ k ↔ m ≤ k * n :=
|
||
by rewrite [propext (!le_iff_mul_le_mul_right H), !nat.div_mul_cancel H']
|
||
|
||
protected theorem le_mul_of_div_le_of_div {m n k : ℕ} (H1 : n > 0) (H2 : n ∣ m) (H3 : m / n ≤ k) :
|
||
m ≤ k * n :=
|
||
iff.mp (!nat.div_le_iff_le_mul_of_div H1 H2) H3
|
||
|
||
-- needed for integer division
|
||
theorem mul_sub_div_of_lt {m n k : ℕ} (H : k < m * n) :
|
||
(m * n - (k + 1)) / m = n - k / m - 1 :=
|
||
begin
|
||
have H1 : k / m < n, from nat.div_lt_of_lt_mul (!mul.comm ▸ H),
|
||
have H2 : n - k / m ≥ 1, from
|
||
nat.le_sub_of_add_le (calc
|
||
1 + k / m = succ (k / m) : add.comm
|
||
... ≤ n : succ_le_of_lt H1),
|
||
have H3 : n - k / m = n - k / m - 1 + 1, from (nat.sub_add_cancel H2)⁻¹,
|
||
have H4 : m > 0, from pos_of_ne_zero (assume H': m = 0, not_lt_zero k (begin rewrite [H' at H, zero_mul at H], exact H end)),
|
||
have H5 : k % m + 1 ≤ m, from succ_le_of_lt (!mod_lt H4),
|
||
have H6 : m - (k % m + 1) < m, from nat.sub_lt_self H4 !succ_pos,
|
||
calc
|
||
(m * n - (k + 1)) / m = (m * n - (k / m * m + k % m + 1)) / m : eq_div_mul_add_mod
|
||
... = (m * n - k / m * m - (k % m + 1)) / m : by rewrite [*nat.sub_sub]
|
||
... = ((n - k / m) * m - (k % m + 1)) / m :
|
||
by rewrite [mul.comm m, nat.mul_sub_right_distrib]
|
||
... = ((n - k / m - 1) * m + m - (k % m + 1)) / m :
|
||
by rewrite [H3 at {1}, right_distrib, nat.one_mul]
|
||
... = ((n - k / m - 1) * m + (m - (k % m + 1))) / m : {nat.add_sub_assoc H5 _}
|
||
... = (m - (k % m + 1)) / m + (n - k / m - 1) :
|
||
by rewrite [add.comm, (add_mul_div_self H4)]
|
||
... = n - k / m - 1 :
|
||
by rewrite [div_eq_zero_of_lt H6, zero_add]
|
||
end
|
||
|
||
private lemma div_div_aux (a b c : nat) : b > 0 → c > 0 → (a / b) / c = a / (b * c) :=
|
||
suppose b > 0, suppose c > 0,
|
||
nat.strong_induction_on a
|
||
(λ a ih,
|
||
let k₁ := a / (b*c) in
|
||
let k₂ := a %(b*c) in
|
||
assert bc_pos : b*c > 0, from mul_pos `b > 0` `c > 0`,
|
||
assert k₂ < b * c, from mod_lt _ bc_pos,
|
||
assert k₂ ≤ a, from !mod_le,
|
||
or.elim (eq_or_lt_of_le this)
|
||
(suppose k₂ = a,
|
||
assert i₁ : a < b * c, by rewrite -this; assumption,
|
||
assert k₁ = 0, from div_eq_zero_of_lt i₁,
|
||
assert a / b < c, by rewrite [mul.comm at i₁]; exact nat.div_lt_of_lt_mul i₁,
|
||
begin
|
||
rewrite [`k₁ = 0`],
|
||
show (a / b) / c = 0, from div_eq_zero_of_lt `a / b < c`
|
||
end)
|
||
(suppose k₂ < a,
|
||
assert a = k₁*(b*c) + k₂, from eq_div_mul_add_mod a (b*c),
|
||
assert a / b = k₁*c + k₂ / b, by
|
||
rewrite [this at {1}, mul.comm b c at {2}, -mul.assoc,
|
||
add.comm, add_mul_div_self `b > 0`, add.comm],
|
||
assert e₁ : (a / b) / c = k₁ + (k₂ / b) / c, by
|
||
rewrite [this, add.comm, add_mul_div_self `c > 0`, add.comm],
|
||
assert e₂ : (k₂ / b) / c = k₂ / (b * c), from ih k₂ `k₂ < a`,
|
||
assert e₃ : k₂ / (b * c) = 0, from div_eq_zero_of_lt `k₂ < b * c`,
|
||
assert (k₂ / b) / c = 0, by rewrite [e₂, e₃],
|
||
show (a / b) / c = k₁, by rewrite [e₁, this]))
|
||
|
||
protected lemma div_div_eq_div_mul (a b c : nat) : (a / b) / c = a / (b * c) :=
|
||
begin
|
||
cases b with b,
|
||
rewrite [zero_mul, *nat.div_zero, nat.zero_div],
|
||
cases c with c,
|
||
rewrite [mul_zero, *nat.div_zero],
|
||
apply div_div_aux a (succ b) (succ c) dec_trivial dec_trivial
|
||
end
|
||
|
||
lemma div_lt_of_ne_zero : ∀ {n : nat}, n ≠ 0 → n / 2 < n
|
||
| 0 h := absurd rfl h
|
||
| (succ n) h :=
|
||
begin
|
||
apply nat.div_lt_of_lt_mul,
|
||
rewrite [-add_one, right_distrib],
|
||
change n + 1 < (n * 1 + n) + (1 + 1),
|
||
rewrite [mul_one, -add.assoc],
|
||
apply add_lt_add_right,
|
||
show n < n + n + 1,
|
||
begin
|
||
rewrite [add.assoc, -add_zero n at {1}],
|
||
apply add_lt_add_left,
|
||
apply zero_lt_succ
|
||
end
|
||
end
|
||
end nat
|