480 lines
24 KiB
Text
480 lines
24 KiB
Text
/-
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Copyright (c) 2014 Floris van Doorn. All rights reserved.
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Released under Apache 2.0 license as described in the file LICENSE.
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Module: data.int.order
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Authors: Floris van Doorn, Jeremy Avigad
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The order relation on the integers. We show that int is an instance of linear_comm_ordered_ring
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and transfer the results.
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-/
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import .basic algebra.ordered_ring
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open nat
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open decidable
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open fake_simplifier
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open int eq.ops
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namespace int
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private definition nonneg (a : ℤ) : Prop := cases_on a (take n, true) (take n, false)
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definition le (a b : ℤ) : Prop := nonneg (sub b a)
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definition lt (a b : ℤ) : Prop := le (add a 1) b
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infix - := int.sub
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infix <= := int.le
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infix ≤ := int.le
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infix < := int.lt
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private definition decidable_nonneg [instance] (a : ℤ) : decidable (nonneg a) := cases_on a _ _
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definition decidable_le [instance] (a b : ℤ) : decidable (a ≤ b) := decidable_nonneg _
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definition decidable_lt [instance] (a b : ℤ) : decidable (a < b) := decidable_nonneg _
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private theorem nonneg.elim {a : ℤ} : nonneg a → ∃n : ℕ, a = n :=
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cases_on a (take n H, exists.intro n rfl) (take n' H, false.elim H)
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private theorem nonneg_or_nonneg_neg (a : ℤ) : nonneg a ∨ nonneg (-a) :=
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cases_on a (take n, or.inl trivial) (take n, or.inr trivial)
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theorem le.intro {a b : ℤ} {n : ℕ} (H : a + n = b) : a ≤ b :=
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have H1 : b - a = n, from (eq_add_neg_of_add_eq (!add.comm ▸ H))⁻¹,
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have H2 : nonneg n, from true.intro,
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show nonneg (b - a), from H1⁻¹ ▸ H2
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theorem le.elim {a b : ℤ} (H : a ≤ b) : ∃n : ℕ, a + n = b :=
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obtain (n : ℕ) (H1 : b - a = n), from nonneg.elim H,
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exists.intro n (!add.comm ▸ iff.mp' !add_eq_iff_eq_add_neg (H1⁻¹))
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theorem le.total (a b : ℤ) : a ≤ b ∨ b ≤ a :=
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or.elim (nonneg_or_nonneg_neg (b - a))
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(assume H, or.inl H)
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(assume H : nonneg (-(b - a)),
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have H0 : -(b - a) = a - b, from neg_sub_eq b a,
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have H1 : nonneg (a - b), from H0 ▸ H, -- too bad: can't do it in one step
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or.inr H1)
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theorem of_nat_le_of_nat (n m : ℕ) : of_nat n ≤ of_nat m ↔ n ≤ m :=
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iff.intro
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(assume H : of_nat n ≤ of_nat m,
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obtain (k : ℕ) (Hk : of_nat n + of_nat k = of_nat m), from le.elim H,
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have H2 : n + k = m, from of_nat_inj ((add_of_nat n k)⁻¹ ⬝ Hk),
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nat.le_intro H2)
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(assume H : n ≤ m,
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obtain (k : ℕ) (Hk : n + k = m), from nat.le_elim H,
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have H2 : of_nat n + of_nat k = of_nat m, from Hk ▸ add_of_nat n k,
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le.intro H2)
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theorem lt_add_succ (a : ℤ) (n : ℕ) : a < a + succ n :=
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le.intro (show a + 1 + n = a + succ n, from
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calc
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a + 1 + n = a + (1 + n) : add.assoc
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... = a + (n + 1) : add.comm
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... = a + succ n : rfl)
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theorem lt.intro {a b : ℤ} {n : ℕ} (H : a + succ n = b) : a < b :=
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H ▸ lt_add_succ a n
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theorem lt.elim {a b : ℤ} (H : a < b) : ∃n : ℕ, a + succ n = b :=
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obtain (n : ℕ) (Hn : a + 1 + n = b), from le.elim H,
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have H2 : a + succ n = b, from
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calc
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a + succ n = a + 1 + n : by simp
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... = b : Hn,
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exists.intro n H2
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theorem of_nat_lt_of_nat (n m : ℕ) : of_nat n < of_nat m ↔ n < m :=
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calc
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of_nat n < of_nat m ↔ of_nat n + 1 ≤ of_nat m : iff.refl
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... ↔ of_nat (succ n) ≤ of_nat m : of_nat_succ n ▸ !iff.refl
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... ↔ succ n ≤ m : of_nat_le_of_nat
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... ↔ n < m : iff.symm (lt_iff_succ_le _ _)
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/- show that the integers form an ordered additive group -/
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theorem le.refl (a : ℤ) : a ≤ a :=
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le.intro (add_zero a)
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theorem le.trans {a b c : ℤ} (H1 : a ≤ b) (H2 : b ≤ c) : a ≤ c :=
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obtain (n : ℕ) (Hn : a + n = b), from le.elim H1,
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obtain (m : ℕ) (Hm : b + m = c), from le.elim H2,
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have H3 : a + of_nat (n + m) = c, from
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calc
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a + of_nat (n + m) = a + (of_nat n + m) : {(add_of_nat n m)⁻¹}
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... = a + n + m : (add.assoc a n m)⁻¹
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... = b + m : {Hn}
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... = c : Hm,
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le.intro H3
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theorem le.antisymm {a b : ℤ} (H1 : a ≤ b) (H2 : b ≤ a) : a = b :=
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obtain (n : ℕ) (Hn : a + n = b), from le.elim H1,
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obtain (m : ℕ) (Hm : b + m = a), from le.elim H2,
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have H3 : a + of_nat (n + m) = a + 0, from
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calc
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a + of_nat (n + m) = a + (of_nat n + m) : {(add_of_nat n m)⁻¹}
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... = a + n + m : (add.assoc a n m)⁻¹
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... = b + m : {Hn}
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... = a : Hm
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... = a + 0 : (add_zero a)⁻¹,
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have H4 : of_nat (n + m) = of_nat 0, from add.left_cancel H3,
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have H5 : n + m = 0, from of_nat_inj H4,
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have H6 : n = 0, from nat.eq_zero_of_add_eq_zero_right H5,
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show a = b, from
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calc
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a = a + of_nat 0 : (add_zero a)⁻¹
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... = a + n : {H6⁻¹}
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... = b : Hn
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theorem lt.irrefl (a : ℤ) : ¬ a < a :=
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(assume H : a < a,
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obtain (n : ℕ) (Hn : a + succ n = a), from lt.elim H,
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have H2 : a + succ n = a + 0, from
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calc
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a + succ n = a : Hn
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... = a + 0 : by simp,
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have H3 : succ n = 0, from add.left_cancel H2,
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have H4 : succ n = 0, from of_nat_inj H3,
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absurd H4 !succ_ne_zero)
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theorem ne_of_lt {a b : ℤ} (H : a < b) : a ≠ b :=
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(assume H2 : a = b, absurd (H2 ▸ H) (lt.irrefl b))
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theorem succ_le_of_lt {a b : ℤ} (H : a < b) : a + 1 ≤ b := H
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theorem lt_of_le_succ {a b : ℤ} (H : a + 1 ≤ b) : a < b := H
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theorem le_of_lt {a b : ℤ} (H : a < b) : a ≤ b :=
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obtain (n : ℕ) (Hn : a + succ n = b), from lt.elim H,
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le.intro Hn
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theorem lt_iff_le_and_ne (a b : ℤ) : a < b ↔ (a ≤ b ∧ a ≠ b) :=
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iff.intro
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(assume H, and.intro (le_of_lt H) (ne_of_lt H))
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(assume H,
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have H1 : a ≤ b, from and.elim_left H,
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have H2 : a ≠ b, from and.elim_right H,
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obtain (n : ℕ) (Hn : a + n = b), from le.elim H1,
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have H3 : n ≠ 0, from (assume H' : n = 0, H2 (!add_zero ▸ H' ▸ Hn)),
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obtain (k : ℕ) (Hk : n = succ k), from nat.exists_eq_succ_of_ne_zero H3,
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lt.intro (Hk ▸ Hn))
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theorem le_iff_lt_or_eq (a b : ℤ) : a ≤ b ↔ (a < b ∨ a = b) :=
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iff.intro
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(assume H,
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by_cases
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(assume H1 : a = b, or.inr H1)
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(assume H1 : a ≠ b,
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obtain (n : ℕ) (Hn : a + n = b), from le.elim H,
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have H2 : n ≠ 0, from (assume H' : n = 0, H1 (!add_zero ▸ H' ▸ Hn)),
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obtain (k : ℕ) (Hk : n = succ k), from nat.exists_eq_succ_of_ne_zero H2,
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or.inl (lt.intro (Hk ▸ Hn))))
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(assume H,
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or.elim H
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(assume H1, le_of_lt H1)
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(assume H1, H1 ▸ !le.refl))
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theorem lt_succ (a : ℤ) : a < a + 1 :=
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le.refl (a + 1)
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theorem add_le_add_left {a b : ℤ} (H : a ≤ b) (c : ℤ) : c + a ≤ c + b :=
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obtain (n : ℕ) (Hn : a + n = b), from le.elim H,
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have H2 : c + a + n = c + b, from
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calc
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c + a + n = c + (a + n) : add.assoc c a n
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... = c + b : {Hn},
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le.intro H2
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theorem mul_nonneg {a b : ℤ} (Ha : 0 ≤ a) (Hb : 0 ≤ b) : 0 ≤ a * b :=
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obtain (n : ℕ) (Hn : 0 + n = a), from le.elim Ha,
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obtain (m : ℕ) (Hm : 0 + m = b), from le.elim Hb,
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le.intro
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(eq.symm
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(calc
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a * b = (0 + n) * b : Hn
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... = n * b : zero_add
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... = n * (0 + m) : Hm
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... = n * m : zero_add
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... = 0 + n * m : zero_add))
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theorem mul_pos {a b : ℤ} (Ha : 0 < a) (Hb : 0 < b) : 0 < a * b :=
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obtain (n : ℕ) (Hn : 0 + succ n = a), from lt.elim Ha,
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obtain (m : ℕ) (Hm : 0 + succ m = b), from lt.elim Hb,
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lt.intro
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(eq.symm
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(calc
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a * b = (0 + succ n) * b : Hn
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... = succ n * b : zero_add
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... = succ n * (0 + succ m) : Hm
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... = succ n * succ m : zero_add
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... = of_nat (succ n * succ m) : mul_of_nat
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... = of_nat (succ n * m + succ n) : nat.mul_succ
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... = of_nat (succ (succ n * m + n)) : nat.add_succ
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... = 0 + succ (succ n * m + n) : zero_add))
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section
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open [classes] algebra
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protected definition linear_ordered_comm_ring [instance] : algebra.linear_ordered_comm_ring int :=
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algebra.linear_ordered_comm_ring.mk add add.assoc zero zero_add add_zero neg add.left_inv
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add.comm mul mul.assoc (of_num 1) one_mul mul_one mul.left_distrib mul.right_distrib
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zero_ne_one le le.refl @le.trans @le.antisymm lt lt_iff_le_and_ne @add_le_add_left
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@mul_nonneg @mul_pos le_iff_lt_or_eq le.total mul.comm
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end
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/- instantiate ordered ring theorems to int -/
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section port_algebra
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definition ge (a b : ℤ) := algebra.has_le.ge a b
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definition gt (a b : ℤ) := algebra.has_lt.gt a b
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infix >= := int.ge
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infix ≥ := int.ge
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infix > := int.gt
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definition decidable_ge [instance] (a b : ℤ) : decidable (a ≥ b) := _
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definition decidable_gt [instance] (a b : ℤ) : decidable (a > b) := _
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theorem le_of_eq_of_le : ∀{a b c : ℤ}, a = b → b ≤ c → a ≤ c := @algebra.le_of_eq_of_le _ _
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theorem le_of_le_of_eq : ∀{a b c : ℤ}, a ≤ b → b = c → a ≤ c := @algebra.le_of_le_of_eq _ _
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theorem lt_of_eq_of_lt : ∀{a b c : ℤ}, a = b → b < c → a < c := @algebra.lt_of_eq_of_lt _ _
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theorem lt_of_lt_of_eq : ∀{a b c : ℤ}, a < b → b = c → a < c := @algebra.lt_of_lt_of_eq _ _
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calc_trans int.le_of_eq_of_le
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calc_trans int.le_of_le_of_eq
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calc_trans int.lt_of_eq_of_lt
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calc_trans int.lt_of_lt_of_eq
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theorem lt.asymm : ∀{a b : ℤ}, a < b → ¬ b < a := @algebra.lt.asymm _ _
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theorem lt_of_le_of_ne : ∀{a b : ℤ}, a ≤ b → a ≠ b → a < b := @algebra.lt_of_le_of_ne _ _
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theorem lt_of_lt_of_le : ∀{a b c : ℤ}, a < b → b ≤ c → a < c := @algebra.lt_of_lt_of_le _ _
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theorem lt_of_le_of_lt : ∀{a b c : ℤ}, a ≤ b → b < c → a < c := @algebra.lt_of_le_of_lt _ _
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theorem not_le_of_lt : ∀{a b : ℤ}, a < b → ¬ b ≤ a := @algebra.not_le_of_lt _ _
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theorem not_lt_of_le : ∀{a b : ℤ}, a ≤ b → ¬ b < a := @algebra.not_lt_of_le _ _
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theorem lt_or_eq_of_le : ∀{a b : ℤ}, a ≤ b → a < b ∨ a = b := @algebra.lt_or_eq_of_le _ _
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theorem lt.trichotomy : ∀a b : ℤ, a < b ∨ a = b ∨ b < a := algebra.lt.trichotomy
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theorem lt.by_cases : ∀{a b : ℤ} {P : Prop}, (a < b → P) → (a = b → P) → (b < a → P) → P :=
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@algebra.lt.by_cases _ _
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definition le_of_not_lt : ∀{a b : ℤ}, ¬ a < b → b ≤ a := @algebra.le_of_not_lt _ _
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definition lt_of_not_le : ∀{a b : ℤ}, ¬ a ≤ b → b < a := @algebra.lt_of_not_le _ _
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theorem add_le_add_right : ∀{a b : ℤ}, a ≤ b → ∀c : ℤ, a + c ≤ b + c :=
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@algebra.add_le_add_right _ _
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theorem add_le_add : ∀{a b c d : ℤ}, a ≤ b → c ≤ d → a + c ≤ b + d := @algebra.add_le_add _ _
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theorem add_lt_add_left : ∀{a b : ℤ}, a < b → ∀c : ℤ, c + a < c + b :=
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@algebra.add_lt_add_left _ _
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theorem add_lt_add_right : ∀{a b : ℤ}, a < b → ∀c : ℤ, a + c < b + c :=
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@algebra.add_lt_add_right _ _
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theorem le_add_of_nonneg_right : ∀{a b : ℤ}, b ≥ 0 → a ≤ a + b :=
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@algebra.le_add_of_nonneg_right _ _
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theorem le_add_of_nonneg_left : ∀{a b : ℤ}, b ≥ 0 → a ≤ b + a :=
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@algebra.le_add_of_nonneg_left _ _
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theorem add_lt_add : ∀{a b c d : ℤ}, a < b → c < d → a + c < b + d := @algebra.add_lt_add _ _
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theorem add_lt_add_of_le_of_lt : ∀{a b c d : ℤ}, a ≤ b → c < d → a + c < b + d :=
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@algebra.add_lt_add_of_le_of_lt _ _
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theorem add_lt_add_of_lt_of_le : ∀{a b c d : ℤ}, a < b → c ≤ d → a + c < b + d :=
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@algebra.add_lt_add_of_lt_of_le _ _
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theorem lt_add_of_pos_right : ∀{a b : ℤ}, b > 0 → a < a + b := @algebra.lt_add_of_pos_right _ _
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theorem lt_add_of_pos_left : ∀{a b : ℤ}, b > 0 → a < b + a := @algebra.lt_add_of_pos_left _ _
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theorem le_of_add_le_add_left : ∀{a b c : ℤ}, a + b ≤ a + c → b ≤ c :=
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@algebra.le_of_add_le_add_left _ _
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theorem le_of_add_le_add_right : ∀{a b c : ℤ}, a + b ≤ c + b → a ≤ c :=
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@algebra.le_of_add_le_add_right _ _
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theorem lt_of_add_lt_add_left : ∀{a b c : ℤ}, a + b < a + c → b < c :=
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@algebra.lt_of_add_lt_add_left _ _
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theorem lt_of_add_lt_add_right : ∀{a b c : ℤ}, a + b < c + b → a < c :=
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@algebra.lt_of_add_lt_add_right _ _
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theorem add_le_add_left_iff : ∀a b c : ℤ, a + b ≤ a + c ↔ b ≤ c := algebra.add_le_add_left_iff
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theorem add_le_add_right_iff : ∀a b c : ℤ, a + b ≤ c + b ↔ a ≤ c := algebra.add_le_add_right_iff
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theorem add_lt_add_left_iff : ∀a b c : ℤ, a + b < a + c ↔ b < c := algebra.add_lt_add_left_iff
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theorem add_lt_add_right_iff : ∀a b c : ℤ, a + b < c + b ↔ a < c := algebra.add_lt_add_right_iff
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theorem add_nonneg : ∀{a b : ℤ}, 0 ≤ a → 0 ≤ b → 0 ≤ a + b := @algebra.add_nonneg _ _
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theorem add_pos : ∀{a b : ℤ}, 0 < a → 0 < b → 0 < a + b := @algebra.add_pos _ _
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theorem add_pos_of_pos_of_nonneg : ∀{a b : ℤ}, 0 < a → 0 ≤ b → 0 < a + b :=
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@algebra.add_pos_of_pos_of_nonneg _ _
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theorem add_pos_of_nonneg_of_pos : ∀{a b : ℤ}, 0 ≤ a → 0 < b → 0 < a + b :=
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@algebra.add_pos_of_nonneg_of_pos _ _
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theorem add_nonpos : ∀{a b : ℤ}, a ≤ 0 → b ≤ 0 → a + b ≤ 0 :=
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@algebra.add_nonpos _ _
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theorem add_neg : ∀{a b : ℤ}, a < 0 → b < 0 → a + b < 0 :=
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@algebra.add_neg _ _
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theorem add_neg_of_neg_of_nonpos : ∀{a b : ℤ}, a < 0 → b ≤ 0 → a + b < 0 :=
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@algebra.add_neg_of_neg_of_nonpos _ _
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theorem add_neg_of_nonpos_of_neg : ∀{a b : ℤ}, a ≤ 0 → b < 0 → a + b < 0 :=
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@algebra.add_neg_of_nonpos_of_neg _ _
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theorem add_eq_zero_iff_eq_zero_and_eq_zero_of_nonneg_of_nonneg : ∀{a b : ℤ},
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0 ≤ a → 0 ≤ b → a + b = 0 ↔ a = 0 ∧ b = 0 :=
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@algebra.add_eq_zero_iff_eq_zero_and_eq_zero_of_nonneg_of_nonneg _ _
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theorem le_add_of_nonneg_of_le : ∀{a b c : ℤ}, 0 ≤ a → b ≤ c → b ≤ a + c :=
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@algebra.le_add_of_nonneg_of_le _ _
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theorem le_add_of_le_of_nonneg : ∀{a b c : ℤ}, b ≤ c → 0 ≤ a → b ≤ c + a :=
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@algebra.le_add_of_le_of_nonneg _ _
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theorem lt_add_of_pos_of_le : ∀{a b c : ℤ}, 0 < a → b ≤ c → b < a + c :=
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@algebra.lt_add_of_pos_of_le _ _
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theorem lt_add_of_le_of_pos : ∀{a b c : ℤ}, b ≤ c → 0 < a → b < c + a :=
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@algebra.lt_add_of_le_of_pos _ _
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theorem add_le_of_nonpos_of_le : ∀{a b c : ℤ}, a ≤ 0 → b ≤ c → a + b ≤ c :=
|
||
@algebra.add_le_of_nonpos_of_le _ _
|
||
theorem add_le_of_le_of_nonpos : ∀{a b c : ℤ}, b ≤ c → a ≤ 0 → b + a ≤ c :=
|
||
@algebra.add_le_of_le_of_nonpos _ _
|
||
theorem add_lt_of_neg_of_le : ∀{a b c : ℤ}, a < 0 → b ≤ c → a + b < c :=
|
||
@algebra.add_lt_of_neg_of_le _ _
|
||
theorem add_lt_of_le_of_neg : ∀{a b c : ℤ}, b ≤ c → a < 0 → b + a < c :=
|
||
@algebra.add_lt_of_le_of_neg _ _
|
||
theorem lt_add_of_nonneg_of_lt : ∀{a b c : ℤ}, 0 ≤ a → b < c → b < a + c :=
|
||
@algebra.lt_add_of_nonneg_of_lt _ _
|
||
theorem lt_add_of_lt_of_nonneg : ∀{a b c : ℤ}, b < c → 0 ≤ a → b < c + a :=
|
||
@algebra.lt_add_of_lt_of_nonneg _ _
|
||
theorem lt_add_of_pos_of_lt : ∀{a b c : ℤ}, 0 < a → b < c → b < a + c :=
|
||
@algebra.lt_add_of_pos_of_lt _ _
|
||
theorem lt_add_of_lt_of_pos : ∀{a b c : ℤ}, b < c → 0 < a → b < c + a :=
|
||
@algebra.lt_add_of_lt_of_pos _ _
|
||
theorem add_lt_of_nonpos_of_lt : ∀{a b c : ℤ}, a ≤ 0 → b < c → a + b < c :=
|
||
@algebra.add_lt_of_nonpos_of_lt _ _
|
||
theorem add_lt_of_lt_of_nonpos : ∀{a b c : ℤ}, b < c → a ≤ 0 → b + a < c :=
|
||
@algebra.add_lt_of_lt_of_nonpos _ _
|
||
theorem add_lt_of_neg_of_lt : ∀{a b c : ℤ}, a < 0 → b < c → a + b < c :=
|
||
@algebra.add_lt_of_neg_of_lt _ _
|
||
theorem add_lt_of_lt_of_neg : ∀{a b c : ℤ}, b < c → a < 0 → b + a < c :=
|
||
@algebra.add_lt_of_lt_of_neg _ _
|
||
|
||
theorem neg_le_neg : ∀{a b : ℤ}, a ≤ b → -b ≤ -a := @algebra.neg_le_neg _ _
|
||
theorem neg_le_neg_iff_le : ∀a b : ℤ, -a ≤ -b ↔ b ≤ a := algebra.neg_le_neg_iff_le
|
||
theorem neg_nonpos_iff_nonneg : ∀a : ℤ, -a ≤ 0 ↔ 0 ≤ a := algebra.neg_nonpos_iff_nonneg
|
||
theorem neg_nonneg_iff_nonpos : ∀a : ℤ, 0 ≤ -a ↔ a ≤ 0 := algebra.neg_nonneg_iff_nonpos
|
||
theorem neg_lt_neg : ∀{a b : ℤ}, a < b → -b < -a := @algebra.neg_lt_neg _ _
|
||
theorem neg_lt_neg_iff_lt : ∀a b : ℤ, -a < -b ↔ b < a := algebra.neg_lt_neg_iff_lt
|
||
theorem neg_neg_iff_pos : ∀a : ℤ, -a < 0 ↔ 0 < a := algebra.neg_neg_iff_pos
|
||
theorem neg_pos_iff_neg : ∀a : ℤ, 0 < -a ↔ a < 0 := algebra.neg_pos_iff_neg
|
||
theorem le_neg_iff_le_neg : ∀a b : ℤ, a ≤ -b ↔ b ≤ -a := algebra.le_neg_iff_le_neg
|
||
theorem neg_le_iff_neg_le : ∀a b : ℤ, -a ≤ b ↔ -b ≤ a := algebra.neg_le_iff_neg_le
|
||
theorem lt_neg_iff_lt_neg : ∀a b : ℤ, a < -b ↔ b < -a := algebra.lt_neg_iff_lt_neg
|
||
theorem neg_lt_iff_neg_lt : ∀a b : ℤ, -a < b ↔ -b < a := algebra.neg_lt_iff_neg_lt
|
||
theorem sub_nonneg_iff_le : ∀a b : ℤ, 0 ≤ a - b ↔ b ≤ a := algebra.sub_nonneg_iff_le
|
||
theorem sub_nonpos_iff_le : ∀a b : ℤ, a - b ≤ 0 ↔ a ≤ b := algebra.sub_nonpos_iff_le
|
||
theorem sub_pos_iff_lt : ∀a b : ℤ, 0 < a - b ↔ b < a := algebra.sub_pos_iff_lt
|
||
theorem sub_neg_iff_lt : ∀a b : ℤ, a - b < 0 ↔ a < b := algebra.sub_neg_iff_lt
|
||
theorem add_le_iff_le_neg_add : ∀a b c : ℤ, a + b ≤ c ↔ b ≤ -a + c :=
|
||
algebra.add_le_iff_le_neg_add
|
||
theorem add_le_iff_le_sub_left : ∀a b c : ℤ, a + b ≤ c ↔ b ≤ c - a :=
|
||
algebra.add_le_iff_le_sub_left
|
||
theorem add_le_iff_le_sub_right : ∀a b c : ℤ, a + b ≤ c ↔ a ≤ c - b :=
|
||
algebra.add_le_iff_le_sub_right
|
||
theorem le_add_iff_neg_add_le : ∀a b c : ℤ, a ≤ b + c ↔ -b + a ≤ c :=
|
||
algebra.le_add_iff_neg_add_le
|
||
theorem le_add_iff_sub_left_le : ∀a b c : ℤ, a ≤ b + c ↔ a - b ≤ c :=
|
||
algebra.le_add_iff_sub_left_le
|
||
theorem le_add_iff_sub_right_le : ∀a b c : ℤ, a ≤ b + c ↔ a - c ≤ b :=
|
||
algebra.le_add_iff_sub_right_le
|
||
theorem add_lt_iff_lt_neg_add_left : ∀a b c : ℤ, a + b < c ↔ b < -a + c :=
|
||
algebra.add_lt_iff_lt_neg_add_left
|
||
theorem add_lt_iff_lt_neg_add_right : ∀a b c : ℤ, a + b < c ↔ a < -b + c :=
|
||
algebra.add_lt_iff_lt_neg_add_right
|
||
theorem add_lt_iff_lt_sub_left : ∀a b c : ℤ, a + b < c ↔ b < c - a :=
|
||
algebra.add_lt_iff_lt_sub_left
|
||
theorem add_lt_add_iff_lt_sub_right : ∀a b c : ℤ, a + b < c ↔ a < c - b :=
|
||
algebra.add_lt_add_iff_lt_sub_right
|
||
theorem lt_add_iff_neg_add_lt_left : ∀a b c : ℤ, a < b + c ↔ -b + a < c :=
|
||
algebra.lt_add_iff_neg_add_lt_left
|
||
theorem lt_add_iff_neg_add_lt_right : ∀a b c : ℤ, a < b + c ↔ -c + a < b :=
|
||
algebra.lt_add_iff_neg_add_lt_right
|
||
theorem lt_add_iff_sub_lt_left : ∀a b c : ℤ, a < b + c ↔ a - b < c :=
|
||
algebra.lt_add_iff_sub_lt_left
|
||
theorem lt_add_iff_sub_lt_right : ∀a b c : ℤ, a < b + c ↔ a - c < b :=
|
||
algebra.lt_add_iff_sub_lt_right
|
||
theorem le_iff_le_of_sub_eq_sub : ∀{a b c d : ℤ}, a - b = c - d → a ≤ b ↔ c ≤ d :=
|
||
@algebra.le_iff_le_of_sub_eq_sub _ _
|
||
theorem lt_iff_lt_of_sub_eq_sub : ∀{a b c d : ℤ}, a - b = c - d → a < b ↔ c < d :=
|
||
@algebra.lt_iff_lt_of_sub_eq_sub _ _
|
||
theorem sub_le_sub_left : ∀{a b : ℤ}, a ≤ b → ∀c : ℤ, c - b ≤ c - a :=
|
||
@algebra.sub_le_sub_left _ _
|
||
theorem sub_le_sub_right : ∀{a b : ℤ}, a ≤ b → ∀c : ℤ, a - c ≤ b - c :=
|
||
@algebra.sub_le_sub_right _ _
|
||
theorem sub_le_sub : ∀{a b c d : ℤ}, a ≤ b → c ≤ d → a - d ≤ b - c :=
|
||
@algebra.sub_le_sub _ _
|
||
theorem sub_lt_sub_left : ∀{a b : ℤ}, a < b → ∀c : ℤ, c - b < c - a :=
|
||
@algebra.sub_lt_sub_left _ _
|
||
theorem sub_lt_sub_right : ∀{a b : ℤ}, a < b → ∀c : ℤ, a - c < b - c :=
|
||
@algebra.sub_lt_sub_right _ _
|
||
theorem sub_lt_sub : ∀{a b c d : ℤ}, a < b → c < d → a - d < b - c :=
|
||
@algebra.sub_lt_sub _ _
|
||
theorem sub_lt_sub_of_le_of_lt : ∀{a b c d : ℤ}, a ≤ b → c < d → a - d < b - c :=
|
||
@algebra.sub_lt_sub_of_le_of_lt _ _
|
||
theorem sub_lt_sub_of_lt_of_le : ∀{a b c d : ℤ}, a < b → c ≤ d → a - d < b - c :=
|
||
@algebra.sub_lt_sub_of_lt_of_le _ _
|
||
|
||
theorem mul_le_mul_of_nonneg_left : ∀{a b c : ℤ}, a ≤ b → 0 ≤ c → c * a ≤ c * b :=
|
||
@algebra.mul_le_mul_of_nonneg_left _ _
|
||
theorem mul_le_mul_of_nonneg_right : ∀{a b c : ℤ}, a ≤ b → 0 ≤ c → a * c ≤ b * c :=
|
||
@algebra.mul_le_mul_of_nonneg_right _ _
|
||
theorem mul_le_mul : ∀{a b c d : ℤ}, a ≤ c → b ≤ d → 0 ≤ b → 0 ≤ c → a * b ≤ c * d :=
|
||
@algebra.mul_le_mul _ _
|
||
theorem mul_nonpos_of_nonneg_of_nonpos : ∀{a b : ℤ}, a ≥ 0 → b ≤ 0 → a * b ≤ 0 :=
|
||
@algebra.mul_nonpos_of_nonneg_of_nonpos _ _
|
||
theorem mul_nonpos_of_nonpos_of_nonneg : ∀{a b : ℤ}, a ≤ 0 → b ≥ 0 → a * b ≤ 0 :=
|
||
@algebra.mul_nonpos_of_nonpos_of_nonneg _ _
|
||
theorem mul_lt_mul_of_pos_left : ∀{a b c : ℤ}, a < b → 0 < c → c * a < c * b :=
|
||
@algebra.mul_lt_mul_of_pos_left _ _
|
||
theorem mul_lt_mul_of_pos_right : ∀{a b c : ℤ}, a < b → 0 < c → a * c < b * c :=
|
||
@algebra.mul_lt_mul_of_pos_right _ _
|
||
theorem mul_lt_mul : ∀{a b c d : ℤ}, a < c → b ≤ d → 0 < b → 0 ≤ c → a * b < c * d :=
|
||
@algebra.mul_lt_mul _ _
|
||
theorem mul_neg_of_pos_of_neg : ∀{a b : ℤ}, a > 0 → b < 0 → a * b < 0 :=
|
||
@algebra.mul_neg_of_pos_of_neg _ _
|
||
theorem mul_neg_of_neg_of_pos : ∀{a b : ℤ}, a < 0 → b > 0 → a * b < 0 :=
|
||
@algebra.mul_neg_of_neg_of_pos _ _
|
||
theorem lt_of_mul_lt_mul_left : ∀{a b c : ℤ}, c * a < c * b → c ≥ zero → a < b :=
|
||
@algebra.lt_of_mul_lt_mul_left int _
|
||
theorem lt_of_mul_lt_mul_right : ∀{a b c : ℤ}, a * c < b * c → c ≥ 0 → a < b :=
|
||
@algebra.lt_of_mul_lt_mul_right _ _
|
||
theorem le_of_mul_le_mul_left : ∀{a b c : ℤ}, c * a ≤ c * b → c > 0 → a ≤ b :=
|
||
@algebra.le_of_mul_le_mul_left _ _
|
||
theorem le_of_mul_le_mul_right : ∀{a b c : ℤ}, a * c ≤ b * c → c > 0 → a ≤ b :=
|
||
@algebra.le_of_mul_le_mul_right _ _
|
||
theorem pos_of_mul_pos_left : ∀{a b : ℤ}, 0 < a * b → 0 ≤ a → 0 < b :=
|
||
@algebra.pos_of_mul_pos_left _ _
|
||
theorem pos_of_mul_pos_right : ∀{a b : ℤ}, 0 < a * b → 0 ≤ b → 0 < a :=
|
||
@algebra.pos_of_mul_pos_right _ _
|
||
|
||
theorem mul_le_mul_of_nonpos_left : ∀{a b c : ℤ}, b ≤ a → c ≤ 0 → c * a ≤ c * b :=
|
||
@algebra.mul_le_mul_of_nonpos_left _ _
|
||
theorem mul_le_mul_of_nonpos_right : ∀{a b c : ℤ}, b ≤ a → c ≤ 0 → a * c ≤ b * c :=
|
||
@algebra.mul_le_mul_of_nonpos_right _ _
|
||
theorem mul_nonneg_of_nonpos_of_nonpos : ∀{a b : ℤ}, a ≤ 0 → b ≤ 0 → 0 ≤ a * b :=
|
||
@algebra.mul_nonneg_of_nonpos_of_nonpos _ _
|
||
theorem mul_lt_mul_of_neg_left : ∀{a b c : ℤ}, b < a → c < 0 → c * a < c * b :=
|
||
@algebra.mul_lt_mul_of_neg_left _ _
|
||
theorem mul_lt_mul_of_neg_right : ∀{a b c : ℤ}, b < a → c < 0 → a * c < b * c :=
|
||
@algebra.mul_lt_mul_of_neg_right _ _
|
||
theorem mul_pos_of_neg_of_neg : ∀{a b : ℤ}, a < 0 → b < 0 → 0 < a * b :=
|
||
@algebra.mul_pos_of_neg_of_neg _ _
|
||
|
||
theorem mul_self_nonneg : ∀a : ℤ, a * a ≥ 0 := algebra.mul_self_nonneg
|
||
theorem zero_le_one : #int 0 ≤ 1 := trivial
|
||
theorem zero_lt_one : #int 0 < 1 := trivial
|
||
theorem pos_and_pos_or_neg_and_neg_of_mul_pos : ∀{a b : ℤ}, a * b > 0 →
|
||
(a > 0 ∧ b > 0) ∨ (a < 0 ∧ b < 0) := @algebra.pos_and_pos_or_neg_and_neg_of_mul_pos _ _
|
||
end port_algebra
|
||
|
||
/- more facts specific to int -/
|
||
|
||
theorem nonneg_of_nat (n : ℕ) : 0 ≤ of_nat n := trivial
|
||
|
||
theorem exists_eq_of_nat {a : ℤ} (H : 0 ≤ a) : ∃n : ℕ, a = of_nat n :=
|
||
obtain (n : ℕ) (H1 : 0 + of_nat n = a), from le.elim H,
|
||
exists.intro n (!zero_add ▸ (H1⁻¹))
|
||
|
||
theorem exists_eq_neg_of_nat {a : ℤ} (H : a ≤ 0) : ∃n : ℕ, a = -(of_nat n) :=
|
||
have H2 : -a ≥ 0, from iff.mp' !neg_nonneg_iff_nonpos H,
|
||
obtain (n : ℕ) (Hn : -a = of_nat n), from exists_eq_of_nat H2,
|
||
exists.intro n (eq_neg_of_eq_neg (Hn⁻¹))
|
||
|
||
theorem of_nat_nat_abs_of_nonneg {a : ℤ} (H : a ≥ 0) : of_nat (nat_abs a) = a :=
|
||
obtain (n : ℕ) (Hn : a = of_nat n), from exists_eq_of_nat H,
|
||
Hn⁻¹ ▸ congr_arg of_nat (nat_abs_of_nat n)
|
||
|
||
theorem of_nat_nat_abs_of_nonpos {a : ℤ} (H : a ≤ 0) : of_nat (nat_abs a) = -a :=
|
||
have H1 : (-a) ≥ 0, from iff.mp' !neg_nonneg_iff_nonpos H,
|
||
calc
|
||
of_nat (nat_abs a) = of_nat (nat_abs (-a)) : nat_abs_neg
|
||
... = -a : of_nat_nat_abs_of_nonneg H1
|
||
|
||
end int
|