/- Copyright (c) 2014 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn, Leonardo de Moura, Jeremy Avigad Basic operations on the natural numbers. -/ import logic.connectives data.num algebra.binary algebra.ring open binary eq.ops namespace nat /- a variant of add, defined by recursion on the first argument -/ definition addl (x y : ℕ) : ℕ := nat.rec y (λ n r, succ r) x infix ` ⊕ `:65 := addl theorem addl_succ_right (n m : ℕ) : n ⊕ succ m = succ (n ⊕ m) := nat.induction_on n rfl (λ n₁ ih, calc succ n₁ ⊕ succ m = succ (n₁ ⊕ succ m) : rfl ... = succ (succ (n₁ ⊕ m)) : ih ... = succ (succ n₁ ⊕ m) : rfl) theorem add_eq_addl (x : ℕ) : ∀y, x + y = x ⊕ y := nat.induction_on x (λ y, nat.induction_on y rfl (λ y₁ ih, calc 0 + succ y₁ = succ (0 + y₁) : rfl ... = succ (0 ⊕ y₁) : {ih} ... = 0 ⊕ (succ y₁) : rfl)) (λ x₁ ih₁ y, nat.induction_on y (calc succ x₁ + 0 = succ (x₁ + 0) : rfl ... = succ (x₁ ⊕ 0) : {ih₁ 0} ... = succ x₁ ⊕ 0 : rfl) (λ y₁ ih₂, calc succ x₁ + succ y₁ = succ (succ x₁ + y₁) : rfl ... = succ (succ x₁ ⊕ y₁) : {ih₂} ... = succ x₁ ⊕ succ y₁ : addl_succ_right)) /- successor and predecessor -/ theorem succ_ne_zero (n : ℕ) : succ n ≠ 0 := by contradiction -- add_rewrite succ_ne_zero theorem pred_zero [simp] : pred 0 = 0 := rfl theorem pred_succ [simp] (n : ℕ) : pred (succ n) = n := rfl theorem eq_zero_or_eq_succ_pred (n : ℕ) : n = 0 ∨ n = succ (pred n) := nat.induction_on n (or.inl rfl) (take m IH, or.inr (show succ m = succ (pred (succ m)), from congr_arg succ !pred_succ⁻¹)) theorem exists_eq_succ_of_ne_zero {n : ℕ} (H : n ≠ 0) : ∃k : ℕ, n = succ k := exists.intro _ (or_resolve_right !eq_zero_or_eq_succ_pred H) theorem succ.inj {n m : ℕ} (H : succ n = succ m) : n = m := nat.no_confusion H imp.id abbreviation eq_of_succ_eq_succ := @succ.inj theorem succ_ne_self {n : ℕ} : succ n ≠ n := nat.induction_on n (take H : 1 = 0, have ne : 1 ≠ 0, from !succ_ne_zero, absurd H ne) (take k IH H, IH (succ.inj H)) theorem discriminate {B : Prop} {n : ℕ} (H1: n = 0 → B) (H2 : ∀m, n = succ m → B) : B := have H : n = n → B, from nat.cases_on n H1 H2, H rfl theorem two_step_induction_on {P : ℕ → Prop} (a : ℕ) (H1 : P 0) (H2 : P 1) (H3 : ∀ (n : ℕ) (IH1 : P n) (IH2 : P (succ n)), P (succ (succ n))) : P a := have stronger : P a ∧ P (succ a), from nat.induction_on a (and.intro H1 H2) (take k IH, have IH1 : P k, from and.elim_left IH, have IH2 : P (succ k), from and.elim_right IH, and.intro IH2 (H3 k IH1 IH2)), and.elim_left stronger theorem sub_induction {P : ℕ → ℕ → Prop} (n m : ℕ) (H1 : ∀m, P 0 m) (H2 : ∀n, P (succ n) 0) (H3 : ∀n m, P n m → P (succ n) (succ m)) : P n m := have general : ∀m, P n m, from nat.induction_on n H1 (take k : ℕ, assume IH : ∀m, P k m, take m : ℕ, nat.cases_on m (H2 k) (take l, (H3 k l (IH l)))), general m /- addition -/ theorem add_zero [simp] (n : ℕ) : n + 0 = n := rfl theorem add_succ [simp] (n m : ℕ) : n + succ m = succ (n + m) := rfl theorem zero_add [simp] (n : ℕ) : 0 + n = n := nat.induction_on n !add_zero (take m IH, show 0 + succ m = succ m, from calc 0 + succ m = succ (0 + m) : add_succ ... = succ m : IH) theorem succ_add [simp] (n m : ℕ) : (succ n) + m = succ (n + m) := nat.induction_on m (!add_zero ▸ !add_zero) (take k IH, calc succ n + succ k = succ (succ n + k) : add_succ ... = succ (succ (n + k)) : IH ... = succ (n + succ k) : add_succ) theorem add.comm [simp] (n m : ℕ) : n + m = m + n := nat.induction_on m (by rewrite [add_zero, zero_add]) (take k IH, calc n + succ k = succ (n+k) : add_succ ... = succ (k + n) : IH ... = succ k + n : succ_add) theorem succ_add_eq_succ_add (n m : ℕ) : succ n + m = n + succ m := !succ_add ⬝ !add_succ⁻¹ theorem add.assoc [simp] (n m k : ℕ) : (n + m) + k = n + (m + k) := nat.induction_on k (by rewrite +add_zero) (take l IH, calc (n + m) + succ l = succ ((n + m) + l) : add_succ ... = succ (n + (m + l)) : IH ... = n + succ (m + l) : add_succ ... = n + (m + succ l) : add_succ) theorem add.left_comm [simp] : Π (n m k : ℕ), n + (m + k) = m + (n + k) := left_comm add.comm add.assoc theorem add.right_comm : Π (n m k : ℕ), n + m + k = n + k + m := right_comm add.comm add.assoc theorem add.comm4 : Π {n m k l : ℕ}, n + m + (k + l) = n + k + (m + l) := comm4 add.comm add.assoc theorem add.cancel_left {n m k : ℕ} : n + m = n + k → m = k := nat.induction_on n (take H : 0 + m = 0 + k, !zero_add⁻¹ ⬝ H ⬝ !zero_add) (take (n : ℕ) (IH : n + m = n + k → m = k) (H : succ n + m = succ n + k), have succ (n + m) = succ (n + k), from calc succ (n + m) = succ n + m : succ_add ... = succ n + k : H ... = succ (n + k) : succ_add, have n + m = n + k, from succ.inj this, IH this) theorem add.cancel_right {n m k : ℕ} (H : n + m = k + m) : n = k := have H2 : m + n = m + k, from !add.comm ⬝ H ⬝ !add.comm, add.cancel_left H2 theorem eq_zero_of_add_eq_zero_right {n m : ℕ} : n + m = 0 → n = 0 := nat.induction_on n (take (H : 0 + m = 0), rfl) (take k IH, assume H : succ k + m = 0, absurd (show succ (k + m) = 0, from calc succ (k + m) = succ k + m : succ_add ... = 0 : H) !succ_ne_zero) theorem eq_zero_of_add_eq_zero_left {n m : ℕ} (H : n + m = 0) : m = 0 := eq_zero_of_add_eq_zero_right (!add.comm ⬝ H) theorem eq_zero_and_eq_zero_of_add_eq_zero {n m : ℕ} (H : n + m = 0) : n = 0 ∧ m = 0 := and.intro (eq_zero_of_add_eq_zero_right H) (eq_zero_of_add_eq_zero_left H) theorem add_one [simp] (n : ℕ) : n + 1 = succ n := !add_zero ▸ !add_succ theorem one_add (n : ℕ) : 1 + n = succ n := !zero_add ▸ !succ_add /- multiplication -/ theorem mul_zero [simp] (n : ℕ) : n * 0 = 0 := rfl theorem mul_succ [simp] (n m : ℕ) : n * succ m = n * m + n := rfl -- commutativity, distributivity, associativity, identity theorem zero_mul [simp] (n : ℕ) : 0 * n = 0 := nat.induction_on n !mul_zero (take m IH, !mul_succ ⬝ !add_zero ⬝ IH) theorem succ_mul [simp] (n m : ℕ) : (succ n) * m = (n * m) + m := nat.induction_on m (by rewrite mul_zero) (take k IH, calc succ n * succ k = succ n * k + succ n : mul_succ ... = n * k + k + succ n : IH ... = n * k + (k + succ n) : add.assoc ... = n * k + (succ n + k) : add.comm ... = n * k + (n + succ k) : succ_add_eq_succ_add ... = n * k + n + succ k : add.assoc ... = n * succ k + succ k : mul_succ) theorem mul.comm [simp] (n m : ℕ) : n * m = m * n := nat.induction_on m (!mul_zero ⬝ !zero_mul⁻¹) (take k IH, calc n * succ k = n * k + n : mul_succ ... = k * n + n : IH ... = (succ k) * n : succ_mul) theorem mul.right_distrib (n m k : ℕ) : (n + m) * k = n * k + m * k := nat.induction_on k (calc (n + m) * 0 = 0 : mul_zero ... = 0 + 0 : add_zero ... = n * 0 + 0 : mul_zero ... = n * 0 + m * 0 : mul_zero) (take l IH, calc (n + m) * succ l = (n + m) * l + (n + m) : mul_succ ... = n * l + m * l + (n + m) : IH ... = n * l + m * l + n + m : add.assoc ... = n * l + n + m * l + m : add.right_comm ... = n * l + n + (m * l + m) : add.assoc ... = n * succ l + (m * l + m) : mul_succ ... = n * succ l + m * succ l : mul_succ) theorem mul.left_distrib (n m k : ℕ) : n * (m + k) = n * m + n * k := calc n * (m + k) = (m + k) * n : mul.comm ... = m * n + k * n : mul.right_distrib ... = n * m + k * n : mul.comm ... = n * m + n * k : mul.comm theorem mul.assoc [simp] (n m k : ℕ) : (n * m) * k = n * (m * k) := nat.induction_on k (calc (n * m) * 0 = n * (m * 0) : mul_zero) (take l IH, calc (n * m) * succ l = (n * m) * l + n * m : mul_succ ... = n * (m * l) + n * m : IH ... = n * (m * l + m) : mul.left_distrib ... = n * (m * succ l) : mul_succ) theorem mul_one [simp] (n : ℕ) : n * 1 = n := calc n * 1 = n * 0 + n : mul_succ ... = 0 + n : mul_zero ... = n : zero_add theorem one_mul [simp] (n : ℕ) : 1 * n = n := calc 1 * n = n * 1 : mul.comm ... = n : mul_one theorem eq_zero_or_eq_zero_of_mul_eq_zero {n m : ℕ} : n * m = 0 → n = 0 ∨ m = 0 := nat.cases_on n (assume H, or.inl rfl) (take n', nat.cases_on m (assume H, or.inr rfl) (take m', assume H : succ n' * succ m' = 0, absurd (calc 0 = succ n' * succ m' : H ... = succ n' * m' + succ n' : mul_succ ... = succ (succ n' * m' + n') : add_succ)⁻¹ !succ_ne_zero)) open algebra protected definition comm_semiring [reducible] [trans_instance] : algebra.comm_semiring nat := ⦃algebra.comm_semiring, add := nat.add, add_assoc := add.assoc, zero := nat.zero, zero_add := zero_add, add_zero := add_zero, add_comm := add.comm, mul := nat.mul, mul_assoc := mul.assoc, one := nat.succ nat.zero, one_mul := one_mul, mul_one := mul_one, left_distrib := mul.left_distrib, right_distrib := mul.right_distrib, zero_mul := zero_mul, mul_zero := mul_zero, mul_comm := mul.comm⦄ end nat section open nat definition iterate {A : Type} (op : A → A) : ℕ → A → A | 0 := λ a, a | (succ k) := λ a, op (iterate k a) notation f`^[`n`]` := iterate f n end