/- Copyright (c) 2015 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Author: Jeremy Avigad Adds the ordering, and instantiates the rationals as an ordered field. -/ import data.int algebra.ordered_field .basic open quot eq.ops /- the ordering on representations -/ namespace prerat section int_notation open int variables {a b : prerat} definition pos (a : prerat) : Prop := num a > 0 definition nonneg (a : prerat) : Prop := num a ≥ 0 theorem pos_of_int (a : ℤ) : pos (of_int a) ↔ (#int a > 0) := !iff.rfl theorem nonneg_of_int (a : ℤ) : nonneg (of_int a) ↔ (#int a ≥ 0) := !iff.rfl theorem pos_eq_pos_of_equiv {a b : prerat} (H1 : a ≡ b) : pos a = pos b := propext (iff.intro (num_pos_of_equiv H1) (num_pos_of_equiv H1⁻¹)) theorem nonneg_eq_nonneg_of_equiv (H : a ≡ b) : nonneg a = nonneg b := have H1 : (0 = num a) = (0 = num b), from propext (iff.intro (assume H2, eq.symm (num_eq_zero_of_equiv H H2⁻¹)) (assume H2, eq.symm (num_eq_zero_of_equiv H⁻¹ H2⁻¹))), calc nonneg a = (pos a ∨ 0 = num a) : propext !le_iff_lt_or_eq ... = (pos b ∨ 0 = num a) : pos_eq_pos_of_equiv H ... = (pos b ∨ 0 = num b) : H1 ... = nonneg b : propext !le_iff_lt_or_eq theorem nonneg_zero : nonneg zero := le.refl 0 theorem nonneg_add (H1 : nonneg a) (H2 : nonneg b) : nonneg (add a b) := show num a * denom b + num b * denom a ≥ 0, from add_nonneg (mul_nonneg H1 (le_of_lt (denom_pos b))) (mul_nonneg H2 (le_of_lt (denom_pos a))) theorem nonneg_antisymm (H1 : nonneg a) (H2 : nonneg (neg a)) : a ≡ zero := have H3 : num a = 0, from le.antisymm (nonpos_of_neg_nonneg H2) H1, equiv_zero_of_num_eq_zero H3 theorem nonneg_total (a : prerat) : nonneg a ∨ nonneg (neg a) := or.elim (le.total 0 (num a)) (assume H : 0 ≤ num a, or.inl H) (assume H : 0 ≥ num a, or.inr (neg_nonneg_of_nonpos H)) theorem nonneg_of_pos (H : pos a) : nonneg a := le_of_lt H theorem ne_zero_of_pos (H : pos a) : ¬ a ≡ zero := assume H', ne_of_gt H (num_eq_zero_of_equiv_zero H') theorem pos_of_nonneg_of_ne_zero (H1 : nonneg a) (H2 : ¬ a ≡ zero) : pos a := have H3 : num a ≠ 0, from assume H' : num a = 0, H2 (equiv_zero_of_num_eq_zero H'), lt_of_le_of_ne H1 (ne.symm H3) theorem nonneg_mul (H1 : nonneg a) (H2 : nonneg b) : nonneg (mul a b) := mul_nonneg H1 H2 theorem pos_mul (H1 : pos a) (H2 : pos b) : pos (mul a b) := mul_pos H1 H2 end int_notation end prerat local attribute prerat.setoid [instance] /- The ordering on the rationals. The definitions of pos and nonneg are kept private, because they are only meant for internal use. Users should use a > 0 and a ≥ 0 instead of pos and nonneg. -/ namespace rat variables {a b c : ℚ} /- transfer properties of pos and nonneg -/ private definition pos (a : ℚ) : Prop := quot.lift prerat.pos @prerat.pos_eq_pos_of_equiv a private definition nonneg (a : ℚ) : Prop := quot.lift prerat.nonneg @prerat.nonneg_eq_nonneg_of_equiv a private theorem pos_of_int (a : ℤ) : (#int a > 0) ↔ pos (of_int a) := prerat.pos_of_int a private theorem nonneg_of_int (a : ℤ) : (#int a ≥ 0) ↔ nonneg (of_int a) := prerat.nonneg_of_int a private theorem nonneg_zero : nonneg 0 := prerat.nonneg_zero private theorem nonneg_add : nonneg a → nonneg b → nonneg (a + b) := quot.induction_on₂ a b @prerat.nonneg_add private theorem nonneg_antisymm : nonneg a → nonneg (-a) → a = 0 := quot.induction_on a (take u, assume H1 H2, quot.sound (prerat.nonneg_antisymm H1 H2)) private theorem nonneg_total (a : ℚ) : nonneg a ∨ nonneg (-a) := quot.induction_on a @prerat.nonneg_total private theorem nonneg_of_pos : pos a → nonneg a := quot.induction_on a @prerat.nonneg_of_pos private theorem ne_zero_of_pos : pos a → a ≠ 0 := quot.induction_on a (take u, assume H1 H2, prerat.ne_zero_of_pos H1 (quot.exact H2)) private theorem pos_of_nonneg_of_ne_zero : nonneg a → ¬ a = 0 → pos a := quot.induction_on a (take u, assume H1 : nonneg ⟦u⟧, assume H2 : ⟦u⟧ ≠ 0, have H3 : ¬ (prerat.equiv u prerat.zero), from assume H, H2 (quot.sound H), prerat.pos_of_nonneg_of_ne_zero H1 H3) private theorem nonneg_mul : nonneg a → nonneg b → nonneg (a * b) := quot.induction_on₂ a b @prerat.nonneg_mul private theorem pos_mul : pos a → pos b → pos (a * b) := quot.induction_on₂ a b @prerat.pos_mul private definition decidable_pos (a : ℚ) : decidable (pos a) := quot.rec_on_subsingleton a (take u, int.decidable_lt 0 (prerat.num u)) /- define order in terms of pos and nonneg -/ definition lt (a b : ℚ) : Prop := pos (b - a) definition le (a b : ℚ) : Prop := nonneg (b - a) definition gt [reducible] (a b : ℚ) := lt b a definition ge [reducible] (a b : ℚ) := le b a infix < := rat.lt infix <= := rat.le infix ≤ := rat.le infix >= := rat.ge infix ≥ := rat.ge infix > := rat.gt theorem of_int_lt_of_int (a b : ℤ) : of_int a < of_int b ↔ (#int a < b) := iff.symm (calc (#int a < b) ↔ (#int b - a > 0) : iff.symm !int.sub_pos_iff_lt ... ↔ pos (of_int (#int b - a)) : iff.symm !pos_of_int ... ↔ pos (of_int b - of_int a) : !of_int_sub ▸ iff.rfl ... ↔ of_int a < of_int b : iff.rfl) theorem of_int_le_of_int (a b : ℤ) : of_int a ≤ of_int b ↔ (#int a ≤ b) := iff.symm (calc (#int a ≤ b) ↔ (#int b - a ≥ 0) : iff.symm !int.sub_nonneg_iff_le ... ↔ nonneg (of_int (#int b - a)) : iff.symm !nonneg_of_int ... ↔ nonneg (of_int b - of_int a) : !of_int_sub ▸ iff.rfl ... ↔ of_int a ≤ of_int b : iff.rfl) theorem of_int_pos (a : ℤ) : (of_int a > 0) ↔ (#int a > 0) := !of_int_lt_of_int theorem of_int_nonneg (a : ℤ) : (of_int a ≥ 0) ↔ (#int a ≥ 0) := !of_int_le_of_int theorem of_nat_lt_of_nat (a b : ℕ) : of_nat a < of_nat b ↔ (#nat a < b) := by rewrite [*of_nat_eq, propext !of_int_lt_of_int]; apply int.of_nat_lt_of_nat theorem of_nat_le_of_nat (a b : ℕ) : of_nat a ≤ of_nat b ↔ (#nat a ≤ b) := by rewrite [*of_nat_eq, propext !of_int_le_of_int]; apply int.of_nat_le_of_nat theorem of_nat_pos (a : ℕ) : (of_nat a > 0) ↔ (#nat a > nat.zero) := !of_nat_lt_of_nat theorem of_nat_nonneg (a : ℕ) : (of_nat a ≥ 0) ↔ (#nat a ≥ nat.zero) := !of_nat_le_of_nat theorem le.refl (a : ℚ) : a ≤ a := by rewrite [↑rat.le, sub_self]; apply nonneg_zero theorem le.trans (H1 : a ≤ b) (H2 : b ≤ c) : a ≤ c := assert H3 : nonneg (c - b + (b - a)), from nonneg_add H2 H1, begin revert H3, rewrite [↑rat.sub, add.assoc, neg_add_cancel_left], intro H3, apply H3 end theorem le.antisymm (H1 : a ≤ b) (H2 : b ≤ a) : a = b := have H3 : nonneg (-(a - b)), from !neg_sub⁻¹ ▸ H1, have H4 : a - b = 0, from nonneg_antisymm H2 H3, eq_of_sub_eq_zero H4 theorem le.total (a b : ℚ) : a ≤ b ∨ b ≤ a := or.elim (nonneg_total (b - a)) (assume H, or.inl H) (assume H, or.inr (!neg_sub ▸ H)) theorem lt_iff_le_and_ne (a b : ℚ) : a < b ↔ a ≤ b ∧ a ≠ b := iff.intro (assume H : a < b, have H1 : b - a ≠ 0, from ne_zero_of_pos H, have H2 : a ≠ b, from ne.symm (assume H', H1 (H' ▸ !sub_self)), and.intro (nonneg_of_pos H) H2) (assume H : a ≤ b ∧ a ≠ b, obtain aleb aneb, from H, have H1 : b - a ≠ 0, from (assume H', aneb (eq_of_sub_eq_zero H')⁻¹), pos_of_nonneg_of_ne_zero aleb H1) theorem le_iff_lt_or_eq (a b : ℚ) : a ≤ b ↔ a < b ∨ a = b := iff.intro (assume H : a ≤ b, decidable.by_cases (assume H1 : a = b, or.inr H1) (assume H1 : a ≠ b, or.inl (iff.mp' !lt_iff_le_and_ne (and.intro H H1)))) (assume H : a < b ∨ a = b, or.elim H (assume H1 : a < b, and.left (iff.mp !lt_iff_le_and_ne H1)) (assume H1 : a = b, H1 ▸ !le.refl)) theorem add_le_add_left (H : a ≤ b) (c: ℚ) : c + a ≤ c + b := have H1 : c + b - (c + a) = b - a, by rewrite [↑sub, neg_add, -add.assoc, add.comm c, add_neg_cancel_right], show nonneg (c + b - (c + a)), from H1⁻¹ ▸ H theorem mul_nonneg (H1 : a ≥ 0) (H2 : b ≥ 0) : a * b ≥ 0 := have H : nonneg (a * b), from nonneg_mul (!sub_zero ▸ H1) (!sub_zero ▸ H2), !sub_zero⁻¹ ▸ H theorem mul_pos (H1 : a > 0) (H2 : b > 0) : a * b > 0 := have H : pos (a * b), from pos_mul (!sub_zero ▸ H1) (!sub_zero ▸ H2), !sub_zero⁻¹ ▸ H definition decidable_lt [instance] : decidable_rel rat.lt := take a b, decidable_pos (b - a) section migrate_algebra open [classes] algebra protected definition discrete_linear_ordered_field [reducible] : algebra.discrete_linear_ordered_field rat := ⦃algebra.discrete_linear_ordered_field, rat.discrete_field, le_refl := le.refl, le_trans := @le.trans, le_antisymm := @le.antisymm, le_total := @le.total, lt_iff_le_and_ne := @lt_iff_le_and_ne, le_iff_lt_or_eq := @le_iff_lt_or_eq, add_le_add_left := @add_le_add_left, mul_nonneg := @mul_nonneg, mul_pos := @mul_pos, decidable_lt := @decidable_lt⦄ local attribute rat.discrete_field [instance] local attribute rat.discrete_linear_ordered_field [instance] definition abs (n : rat) : rat := algebra.abs n definition sign (n : rat) : rat := algebra.sign n migrate from algebra with rat replacing has_le.ge → ge, has_lt.gt → gt, sub → sub, abs → abs, sign → sign, dvd → dvd, divide → divide end migrate_algebra end rat