282 lines
9.7 KiB
Text
282 lines
9.7 KiB
Text
/-
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Copyright (c) 2015 Microsoft Corporation. All rights reserved.
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Released under Apache 2.0 license as described in the file LICENSE.
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Authors: Leonardo de Moura
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Parity
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-/
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import data.nat.power logic.identities
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namespace nat
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open decidable
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definition even (n : nat) := n mod 2 = 0
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definition decidable_even [instance] : ∀ n, decidable (even n) :=
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take n, !nat.has_decidable_eq
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definition odd (n : nat) := ¬even n
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definition decidable_odd [instance] : ∀ n, decidable (odd n) :=
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take n, decidable_not
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lemma even_of_dvd {n} : 2 ∣ n → even n :=
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mod_eq_zero_of_dvd
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lemma dvd_of_even {n} : even n → 2 ∣ n :=
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dvd_of_mod_eq_zero
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lemma not_odd_zero : ¬ odd 0 :=
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dec_trivial
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lemma even_zero : even 0 :=
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dec_trivial
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lemma odd_one : odd 1 :=
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dec_trivial
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lemma not_even_one : ¬ even 1 :=
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dec_trivial
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lemma odd_eq_not_even (n : nat) : odd n = ¬ even n :=
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rfl
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lemma odd_iff_not_even (n : nat) : odd n ↔ ¬ even n :=
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!iff.refl
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lemma odd_of_not_even {n} : ¬ even n → odd n :=
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suppose ¬ even n,
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iff.mpr !odd_iff_not_even this
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lemma even_of_not_odd {n} : ¬ odd n → even n :=
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suppose ¬ odd n,
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not_not_elim (iff.mp (not_iff_not_of_iff !odd_iff_not_even) this)
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lemma not_odd_of_even {n} : even n → ¬ odd n :=
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suppose even n,
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iff.mpr (not_iff_not_of_iff !odd_iff_not_even) (not_not_intro this)
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lemma not_even_of_odd {n} : odd n → ¬ even n :=
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suppose odd n,
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iff.mp !odd_iff_not_even this
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lemma odd_succ_of_even {n} : even n → odd (succ n) :=
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suppose even n,
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by_contradiction (suppose ¬ odd (succ n),
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assert 0 = 1, from calc
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0 = (n+1) mod 2 : even_of_not_odd this
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... = 1 mod 2 : add_mod_eq_add_mod_right 1 `even n`,
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by contradiction)
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lemma eq_1_of_ne_0_lt_2 : ∀ {n : nat}, n ≠ 0 → n < 2 → n = 1
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| 0 h₁ h₂ := absurd rfl h₁
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| 1 h₁ h₂ := rfl
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| (n+2) h₁ h₂ := absurd (lt_of_succ_lt_succ (lt_of_succ_lt_succ h₂)) !not_lt_zero
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lemma mod_eq_of_odd {n} : odd n → n mod 2 = 1 :=
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suppose odd n,
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have ¬ n mod 2 = 0, from this,
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have n mod 2 < 2, from mod_lt n dec_trivial,
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eq_1_of_ne_0_lt_2 `¬ n mod 2 = 0` `n mod 2 < 2`
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lemma odd_of_mod_eq {n} : n mod 2 = 1 → odd n :=
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suppose n mod 2 = 1,
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by_contradiction (suppose ¬ odd n,
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assert n mod 2 = 0, from even_of_not_odd this,
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by rewrite this at *; contradiction)
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lemma even_succ_of_odd {n} : odd n → even (succ n) :=
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suppose odd n,
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assert n mod 2 = 1 mod 2, from mod_eq_of_odd this,
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assert (n+1) mod 2 = 2 mod 2, from add_mod_eq_add_mod_right 1 this,
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by rewrite mod_self at this; exact this
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lemma odd_succ_succ_of_odd {n} : odd n → odd (succ (succ n)) :=
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suppose odd n,
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odd_succ_of_even (even_succ_of_odd this)
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lemma even_succ_succ_of_even {n} : even n → even (succ (succ n)) :=
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suppose even n,
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even_succ_of_odd (odd_succ_of_even this)
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lemma even_of_odd_succ {n} : odd (succ n) → even n :=
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suppose odd (succ n),
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by_contradiction (suppose ¬ even n,
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have odd n, from odd_of_not_even this,
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have even (succ n), from even_succ_of_odd this,
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absurd this (not_even_of_odd `odd (succ n)`))
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lemma odd_of_even_succ {n} : even (succ n) → odd n :=
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suppose even (succ n),
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by_contradiction (suppose ¬ odd n,
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have even n, from even_of_not_odd this,
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have odd (succ n), from odd_succ_of_even this,
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absurd `even (succ n)` (not_even_of_odd this))
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lemma even_of_even_succ_succ {n} : even (succ (succ n)) → even n :=
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suppose even (n+2),
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even_of_odd_succ (odd_of_even_succ this)
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lemma odd_of_odd_succ_succ {n} : odd (succ (succ n)) → odd n :=
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suppose odd (n+2),
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odd_of_even_succ (even_of_odd_succ this)
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lemma dvd_of_odd {n} : odd n → 2 ∣ n+1 :=
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suppose odd n,
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dvd_of_even (even_succ_of_odd this)
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lemma odd_of_dvd {n} : 2 ∣ n+1 → odd n :=
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suppose 2 ∣ n+1,
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odd_of_even_succ (even_of_dvd this)
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lemma even_two_mul : ∀ n, even (2 * n) :=
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take n, even_of_dvd (dvd_mul_right 2 n)
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lemma odd_two_mul_plus_one : ∀ n, odd (2 * n + 1) :=
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take n, odd_succ_of_even (even_two_mul n)
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lemma not_even_two_mul_plus_one : ∀ n, ¬ even (2 * n + 1) :=
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take n, not_even_of_odd (odd_two_mul_plus_one n)
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lemma not_odd_two_mul : ∀ n, ¬ odd (2 * n) :=
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take n, not_odd_of_even (even_two_mul n)
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lemma even_pred_of_odd : ∀ {n}, odd n → even (pred n)
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| 0 h := absurd h not_odd_zero
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| (n+1) h := even_of_odd_succ h
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lemma even_or_odd : ∀ n, even n ∨ odd n :=
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λ n, by_cases
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(λ h : even n, or.inl h)
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(λ h : ¬ even n, or.inr (odd_of_not_even h))
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lemma exists_of_even {n} : even n → ∃ k, n = 2*k :=
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λ h, exists_eq_mul_right_of_dvd (dvd_of_even h)
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lemma exists_of_odd : ∀ {n}, odd n → ∃ k, n = 2*k + 1
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| 0 h := absurd h not_odd_zero
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| (n+1) h :=
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obtain k (hk : n = 2*k), from exists_of_even (even_of_odd_succ h),
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exists.intro k (by subst n)
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lemma even_of_exists {n} : (∃ k, n = 2 * k) → even n :=
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suppose ∃ k, n = 2 * k,
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obtain k (hk : n = 2 * k), from this,
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have 2 ∣ n, by subst n; apply dvd_mul_right,
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even_of_dvd this
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lemma odd_of_exists {n} : (∃ k, n = 2 * k + 1) → odd n :=
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assume h, by_contradiction (λ hn,
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have even n, from even_of_not_odd hn,
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have ∃ k, n = 2 * k, from exists_of_even this,
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obtain k₁ (hk₁ : n = 2 * k₁ + 1), from h,
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obtain k₂ (hk₂ : n = 2 * k₂), from this,
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assert (2 * k₁ + 1) mod 2 = (2 * k₂) mod 2, by rewrite [-hk₁, -hk₂],
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begin
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rewrite [mul_mod_right at this, add.comm at this, add_mul_mod_self_left at this],
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contradiction
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end)
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lemma even_add_of_even_of_even {n m} : even n → even m → even (n+m) :=
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suppose even n, suppose even m,
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obtain k₁ (hk₁ : n = 2 * k₁), from exists_of_even `even n`,
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obtain k₂ (hk₂ : m = 2 * k₂), from exists_of_even `even m`,
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even_of_exists (exists.intro (k₁+k₂) (by rewrite [hk₁, hk₂, mul.left_distrib]))
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lemma even_add_of_odd_of_odd {n m} : odd n → odd m → even (n+m) :=
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suppose odd n, suppose odd m,
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assert even (succ n + succ m), from even_add_of_even_of_even (even_succ_of_odd `odd n`) (even_succ_of_odd `odd m`),
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have even(succ (succ (n + m))), by rewrite [add_succ at this, succ_add at this]; exact this,
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even_of_even_succ_succ this
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lemma odd_add_of_even_of_odd {n m} : even n → odd m → odd (n+m) :=
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suppose even n, suppose odd m,
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assert even (n + succ m), from even_add_of_even_of_even `even n` (even_succ_of_odd `odd m`),
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odd_of_even_succ this
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lemma odd_add_of_odd_of_even {n m} : odd n → even m → odd (n+m) :=
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suppose odd n, suppose even m,
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assert odd (m+n), from odd_add_of_even_of_odd `even m` `odd n`,
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by rewrite add.comm at this; exact this
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lemma even_mul_of_even_left {n} (m) : even n → even (n*m) :=
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suppose even n,
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obtain k (hk : n = 2*k), from exists_of_even this,
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even_of_exists (exists.intro (k*m) (by rewrite [hk, mul.assoc]))
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lemma even_mul_of_even_right {n} (m) : even n → even (m*n) :=
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suppose even n,
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assert even (n*m), from even_mul_of_even_left _ this,
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by rewrite mul.comm at this; exact this
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lemma odd_mul_of_odd_of_odd {n m} : odd n → odd m → odd (n*m) :=
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suppose odd n, suppose odd m,
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assert even (n * succ m), from even_mul_of_even_right _ (even_succ_of_odd `odd m`),
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assert even (n * m + n), by rewrite mul_succ at this; exact this,
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by_contradiction (suppose ¬ odd (n*m),
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assert even (n*m), from even_of_not_odd this,
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absurd `even (n * m + n)` (not_even_of_odd (odd_add_of_even_of_odd this `odd n`)))
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lemma even_of_even_mul_self {n} : even (n * n) → even n :=
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suppose even (n * n),
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by_contradiction (suppose odd n,
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have odd (n * n), from odd_mul_of_odd_of_odd this this,
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show false, from this `even (n * n)`)
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lemma odd_of_odd_mul_self {n} : odd (n * n) → odd n :=
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suppose odd (n * n),
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suppose even n,
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have even (n * n), from !even_mul_of_even_left this,
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show false, from `odd (n * n)` this
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lemma odd_pow {n m} (h : odd n) : odd (n^m) :=
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nat.induction_on m
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(show odd (n^0), from dec_trivial)
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(take m, suppose odd (n^m),
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show odd (n^(m+1)), from odd_mul_of_odd_of_odd h this)
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lemma even_pow {n m} (mpos : m > 0) (h : even n) : even (n^m) :=
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have h₁ : ∀ m, even (n^succ m),
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from take m, nat.induction_on m
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(show even (n^1), by rewrite pow_one; apply h)
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(take m, suppose even (n^succ m),
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show even (n^(succ (succ m))), from !even_mul_of_even_left h),
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obtain m' (h₂ : m = succ m'), from exists_eq_succ_of_pos mpos,
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show even (n^m), by rewrite h₂; apply h₁
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lemma odd_of_odd_pow {n m} (mpos : m > 0) (h : odd (n^m)) : odd n :=
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suppose even n,
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have even (n^m), from even_pow mpos this,
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show false, from `odd (n^m)` this
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lemma even_of_even_pow {n m} (h : even (n^m)) : even n :=
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by_contradiction
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(suppose odd n,
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have odd (n^m), from odd_pow this,
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show false, from this `even (n^m)`)
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lemma eq_of_div2_of_even {n m : nat} : n div 2 = m div 2 → (even n ↔ even m) → n = m :=
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assume h₁ h₂,
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or.elim (em (even n))
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(suppose even n, or.elim (em (even m))
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(suppose even m,
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obtain w₁ (hw₁ : n = 2*w₁), from exists_of_even `even n`,
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obtain w₂ (hw₂ : m = 2*w₂), from exists_of_even `even m`,
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begin
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substvars, rewrite [mul.comm 2 w₁ at h₁, mul.comm 2 w₂ at h₁,
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*mul_div_cancel _ (dec_trivial : 2 > 0) at h₁, h₁]
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end)
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(suppose odd m, absurd `odd m` (not_odd_of_even (iff.mp h₂ `even n`))))
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(suppose odd n, or.elim (em (even m))
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(suppose even m, absurd `odd n` (not_odd_of_even (iff.mpr h₂ `even m`)))
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(suppose odd m,
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assert d : 1 div 2 = 0, from dec_trivial,
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obtain w₁ (hw₁ : n = 2*w₁ + 1), from exists_of_odd `odd n`,
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obtain w₂ (hw₂ : m = 2*w₂ + 1), from exists_of_odd `odd m`,
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begin
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substvars,
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rewrite [add.comm at h₁, add_mul_div_self_left _ _ (dec_trivial : 2 > 0) at h₁, d at h₁, zero_add at h₁],
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rewrite [add.comm at h₁, add_mul_div_self_left _ _ (dec_trivial : 2 > 0) at h₁, d at h₁, zero_add at h₁],
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rewrite h₁
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end))
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end nat
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