462 lines
18 KiB
Text
462 lines
18 KiB
Text
/-
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Copyright (c) 2014 Robert Lewis. All rights reserved.
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Released under Apache 2.0 license as described in the file LICENSE.
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Module: algebra.field
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Authors: Robert Lewis
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Structures with multiplicative and additive components, including division rings and fields.
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The development is modeled after Isabelle's library.
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-/
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----------------------------------------------------------------------------------------------------
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import logic.eq logic.connectives data.unit data.sigma data.prod
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import algebra.function algebra.binary algebra.group algebra.ring
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open eq eq.ops
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namespace algebra
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variable {A : Type}
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-- in division rings, 1 / 0 = 0
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structure division_ring [class] (A : Type) extends ring A, has_inv A, zero_ne_one_class A :=
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(mul_inv_cancel : ∀{a}, a ≠ zero → mul a (inv a) = one)
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(inv_mul_cancel : ∀{a}, a ≠ zero → mul (inv a) a = one)
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--(inv_zero : inv zero = zero)
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section division_ring
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variables [s : division_ring A] {a b c : A}
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include s
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definition divide (a b : A) : A := a * b⁻¹
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infix `/` := divide
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-- only in this file
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local attribute divide [reducible]
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theorem mul_inv_cancel (H : a ≠ 0) : a * a⁻¹ = 1 :=
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division_ring.mul_inv_cancel H
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theorem inv_mul_cancel (H : a ≠ 0) : a⁻¹ * a = 1 :=
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division_ring.inv_mul_cancel H
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theorem inv_eq_one_div : a⁻¹ = 1 / a := !one_mul⁻¹
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-- the following are only theorems if we assume inv_zero here
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/- theorem inv_zero : 0⁻¹ = 0 := !division_ring.inv_zero
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theorem one_div_zero : 1 / 0 = 0 :=
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calc
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1 / 0 = 1 * 0⁻¹ : refl
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... = 1 * 0 : division_ring.inv_zero A
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... = 0 : mul_zero
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-/
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theorem div_eq_mul_one_div : a / b = a * (1 / b) :=
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by rewrite [↑divide, one_mul]
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-- theorem div_zero : a / 0 = 0 := by rewrite [div_eq_mul_one_div, one_div_zero, mul_zero]
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theorem mul_one_div_cancel (H : a ≠ 0) : a * (1 / a) = 1 :=
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by rewrite [-inv_eq_one_div, (mul_inv_cancel H)]
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theorem one_div_mul_cancel (H : a ≠ 0) : (1 / a) * a = 1 :=
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by rewrite [-inv_eq_one_div, (inv_mul_cancel H)]
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theorem div_self (H : a ≠ 0) : a / a = 1 := mul_inv_cancel H
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theorem one_div_one : 1 / 1 = (1:A) := div_self (ne.symm zero_ne_one)
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theorem mul_div_assoc : (a * b) / c = a * (b / c) := !mul.assoc
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theorem one_div_ne_zero (H : a ≠ 0) : 1 / a ≠ 0 :=
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assume H2 : 1 / a = 0,
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have C1 : 0 = (1:A), from symm (by rewrite [-(mul_one_div_cancel H), H2, mul_zero]),
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absurd C1 zero_ne_one
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-- theorem ne_zero_of_one_div_ne_zero (H : 1 / a ≠ 0) : a ≠ 0 :=
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-- assume Ha : a = 0, absurd (Ha⁻¹ ▸ one_div_zero) H
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theorem one_inv_eq : 1⁻¹ = (1:A) :=
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by rewrite [-mul_one, inv_mul_cancel (ne.symm (@zero_ne_one A _))]
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theorem div_one : a / 1 = a :=
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by rewrite [↑divide, one_inv_eq, mul_one]
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theorem zero_div : 0 / a = 0 := !zero_mul
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-- note: integral domain has a "mul_ne_zero". Discrete fields are int domains.
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theorem mul_ne_zero' (Ha : a ≠ 0) (Hb : b ≠ 0) : a * b ≠ 0 :=
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assume H : a * b = 0,
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have C1 : a = 0, by rewrite [-mul_one, -(mul_one_div_cancel Hb), -mul.assoc, H, zero_mul],
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absurd C1 Ha
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theorem mul_ne_zero_comm (H : a * b ≠ 0) : b * a ≠ 0 :=
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have H2 : a ≠ 0 ∧ b ≠ 0, from ne_zero_and_ne_zero_of_mul_ne_zero H,
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mul_ne_zero' (and.right H2) (and.left H2)
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-- make "left" and "right" versions?
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theorem eq_one_div_of_mul_eq_one (H : a * b = 1) : b = 1 / a :=
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have H2 : a ≠ 0, from
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(assume aeq0 : a = 0,
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have B : 0 = (1:A), by rewrite [-(zero_mul b), -aeq0, H],
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absurd B zero_ne_one),
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show b = 1 / a, from symm (calc
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1 / a = (1 / a) * 1 : mul_one
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... = (1 / a) * (a * b) : H
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... = (1 / a) * a * b : mul.assoc
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... = 1 * b : one_div_mul_cancel H2
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... = b : one_mul)
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-- which one is left and which is right?
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theorem eq_one_div_of_mul_eq_one_left (H : b * a = 1) : b = 1 / a :=
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have H2 : a ≠ 0, from
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(assume A : a = 0,
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have B : 0 = 1, from symm (calc
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1 = b * a : symm H
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... = b * 0 : A
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... = 0 : mul_zero),
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absurd B zero_ne_one),
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show b = 1 / a, from symm (calc
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1 / a = 1 * (1 / a) : one_mul
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... = b * a * (1 / a) : H
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... = b * (a * (1 / a)) : mul.assoc
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... = b * 1 : mul_one_div_cancel H2
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... = b : mul_one)
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theorem one_div_mul_one_div (Ha : a ≠ 0) (Hb : b ≠ 0) : (1 / a) * (1 / b) = 1 / (b * a) :=
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have H : (b * a) * ((1 / a) * (1 / b)) = 1, by
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rewrite [mul.assoc, -(mul.assoc a), (mul_one_div_cancel Ha), one_mul, (mul_one_div_cancel Hb)],
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eq_one_div_of_mul_eq_one H
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theorem one_div_neg_one_eq_neg_one : (1:A) / (-1) = -1 :=
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have H : (-1) * (-1) = (1:A), by rewrite [-neg_eq_neg_one_mul, neg_neg],
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symm (eq_one_div_of_mul_eq_one H)
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theorem one_div_neg_eq_neg_one_div (H : a ≠ 0) : 1 / (- a) = - (1 / a) :=
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have H1 : -1 ≠ 0, from
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(assume H2 : -1 = 0, absurd (symm (calc
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1 = -(-1) : neg_neg
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... = -0 : H2
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... = (0:A) : neg_zero)) zero_ne_one),
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calc
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1 / (- a) = 1 / ((-1) * a) : neg_eq_neg_one_mul
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... = (1 / a) * (1 / (- 1)) : one_div_mul_one_div H H1
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... = (1 / a) * (-1) : one_div_neg_one_eq_neg_one
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... = - (1 / a) : mul_neg_one_eq_neg
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theorem div_neg_eq_neg_div (Ha : a ≠ 0) : b / (- a) = - (b / a) :=
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calc
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b / (- a) = b * (1 / (- a)) : inv_eq_one_div
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... = b * -(1 / a) : one_div_neg_eq_neg_one_div Ha
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... = -(b * (1 / a)) : neg_mul_eq_mul_neg
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... = - (b * a⁻¹) : inv_eq_one_div
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theorem neg_div (Ha : a ≠ 0) : (-b) / a = - (b / a) :=
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by rewrite [neg_eq_neg_one_mul, mul_div_assoc, -neg_eq_neg_one_mul]
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theorem neg_div_neg_eq_div (Hb : b ≠ 0) : (-a) / (-b) = a / b :=
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by rewrite [(div_neg_eq_neg_div Hb), (neg_div Hb), neg_neg]
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theorem div_div (H : a ≠ 0) : 1 / (1 / a) = a :=
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symm (eq_one_div_of_mul_eq_one_left (mul_one_div_cancel H))
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theorem eq_of_invs_eq (Ha : a ≠ 0) (Hb : b ≠ 0) (H : 1 / a = 1 / b) : a = b :=
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by rewrite [-(div_div Ha), H, (div_div Hb)]
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theorem mul_inv_eq (Ha : a ≠ 0) (Hb : b ≠ 0) : (b * a)⁻¹ = a⁻¹ * b⁻¹ :=
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have H1 : b * a ≠ 0, from mul_ne_zero' Hb Ha,
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eq.symm (calc
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a⁻¹ * b⁻¹ = (1 / a) * b⁻¹ : inv_eq_one_div
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... = (1 / a) * (1 / b) : inv_eq_one_div
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... = (1 / (b * a)) : one_div_mul_one_div Ha Hb
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... = (b * a)⁻¹ : inv_eq_one_div)
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theorem mul_div_cancel (Hb : b ≠ 0) : a * b / b = a :=
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by rewrite [↑divide, mul.assoc, (mul_inv_cancel Hb), mul_one]
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theorem div_mul_cancel (Hb : b ≠ 0) : a / b * b = a :=
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by rewrite [↑divide, mul.assoc, (inv_mul_cancel Hb), mul_one]
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theorem div_add_div_same : a / c + b / c = (a + b) / c := !right_distrib⁻¹
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theorem inv_mul_add_mul_inv_eq_inv_add_inv (Ha : a ≠ 0) (Hb : b ≠ 0) :
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(1 / a) * (a + b) * (1 / b) = 1 / a + 1 / b :=
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by rewrite [(left_distrib (1 / a)), (one_div_mul_cancel Ha), right_distrib, one_mul,
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mul.assoc, (mul_one_div_cancel Hb), mul_one, add.comm]
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theorem inv_mul_sub_mul_inv_eq_inv_add_inv (Ha : a ≠ 0) (Hb : b ≠ 0) :
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(1 / a) * (b - a) * (1 / b) = 1 / a - 1 / b :=
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by rewrite [(mul_sub_left_distrib (1 / a)), (one_div_mul_cancel Ha), mul_sub_right_distrib,
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one_mul, mul.assoc, (mul_one_div_cancel Hb), mul_one, one_mul]
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theorem div_eq_one_iff_eq (Hb : b ≠ 0) : a / b = 1 ↔ a = b :=
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iff.intro
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(assume H1 : a / b = 1, symm (calc
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b = 1 * b : one_mul
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... = a / b * b : H1
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... = a : div_mul_cancel Hb))
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(assume H2 : a = b, calc
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a / b = b / b : H2
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... = 1 : div_self Hb)
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theorem eq_div_iff_mul_eq (Hc : c ≠ 0) : a = b / c ↔ a * c = b :=
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iff.intro
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(assume H : a = b / c, by rewrite [H, (div_mul_cancel Hc)])
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(assume H : a * c = b, by rewrite [-(mul_div_cancel Hc), H])
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theorem add_div_eq_mul_add_div (Hc : c ≠ 0) : a + b / c = (a * c + b) / c :=
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have H : (a + b / c) * c = a * c + b, by rewrite [right_distrib, (div_mul_cancel Hc)],
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(iff.elim_right (eq_div_iff_mul_eq Hc)) H
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theorem mul_mul_div (Hc : c ≠ 0) : a = a * c * (1 / c) :=
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calc
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a = a * 1 : mul_one
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... = a * (c * (1 / c)) : mul_one_div_cancel Hc
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... = a * c * (1 / c) : mul.assoc
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-- There are many similar rules to these last two in the Isabelle library
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-- that haven't been ported yet. Do as necessary.
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end division_ring
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structure field [class] (A : Type) extends division_ring A, comm_ring A
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section field
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variables [s : field A] {a b c d: A}
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include s
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local attribute divide [reducible]
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theorem one_div_mul_one_div' (Ha : a ≠ 0) (Hb : b ≠ 0) : (1 / a) * (1 / b) = 1 / (a * b) :=
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by rewrite [(one_div_mul_one_div Ha Hb), mul.comm b]
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theorem div_mul_right (Hb : b ≠ 0) (H : a * b ≠ 0) : a / (a * b) = 1 / b :=
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let Ha : a ≠ 0 := and.left (ne_zero_and_ne_zero_of_mul_ne_zero H) in
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symm (calc
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1 / b = 1 * (1 / b) : one_mul
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... = (a * a⁻¹) * (1 / b) : mul_inv_cancel Ha
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... = a * (a⁻¹ * (1 / b)) : mul.assoc
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... = a * ((1 / a) * (1 / b)) :inv_eq_one_div
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... = a * (1 / (b * a)) : one_div_mul_one_div Ha Hb
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... = a * (1 / (a * b)) : mul.comm
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... = a * (a * b)⁻¹ : inv_eq_one_div)
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theorem div_mul_left (Ha : a ≠ 0) (H : a * b ≠ 0) : b / (a * b) = 1 / a :=
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let H1 : b * a ≠ 0 := mul_ne_zero_comm H in
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by rewrite [mul.comm a, (div_mul_right Ha H1)]
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theorem mul_div_cancel_left (Ha : a ≠ 0) : a * b / a = b :=
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by rewrite [mul.comm a, (mul_div_cancel Ha)]
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theorem mul_div_cancel' (Hb : b ≠ 0) : b * (a / b) = a :=
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by rewrite [mul.comm, (div_mul_cancel Hb)]
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theorem one_div_add_one_div (Ha : a ≠ 0) (Hb : b ≠ 0) : 1 / a + 1 / b = (a + b) / (a * b) :=
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have H [visible] : a * b ≠ 0, from (mul_ne_zero' Ha Hb),
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by rewrite [add.comm, -(div_mul_left Ha H), -(div_mul_right Hb H), ↑divide, -right_distrib]
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theorem div_mul_div (Hb : b ≠ 0) (Hd : d ≠ 0) : (a / b) * (c / d) = (a * c) / (b * d) :=
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by rewrite [↑divide, 2 mul.assoc, (mul.comm b⁻¹), mul.assoc, (mul_inv_eq Hd Hb)]
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theorem mul_div_mul_left (Hb : b ≠ 0) (Hc : c ≠ 0) : (c * a) / (c * b) = a / b :=
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have H [visible] : c * b ≠ 0, from mul_ne_zero' Hc Hb,
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by rewrite [-(div_mul_div Hc Hb), (div_self Hc), one_mul]
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theorem mul_div_mul_right (Hb : b ≠ 0) (Hc : c ≠ 0) : (a * c) / (b * c) = a / b :=
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by rewrite [(mul.comm a), (mul.comm b), (mul_div_mul_left Hb Hc)]
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theorem div_mul_eq_mul_div : (b / c) * a = (b * a) / c :=
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by rewrite [↑divide, mul.assoc, (mul.comm c⁻¹), -mul.assoc]
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-- this one is odd -- I am not sure what to call it, but again, the prefix is right
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theorem div_mul_eq_mul_div_comm (Hc : c ≠ 0) : (b / c) * a = b * (a / c) :=
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by rewrite [(div_mul_eq_mul_div), -(one_mul c), -(div_mul_div (ne.symm zero_ne_one) Hc), div_one, one_mul]
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theorem div_add_div (Hb : b ≠ 0) (Hd : d ≠ 0) :
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(a / b) + (c / d) = ((a * d) + (b * c)) / (b * d) :=
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have H [visible] : b * d ≠ 0, from mul_ne_zero' Hb Hd,
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by rewrite [-(mul_div_mul_right Hb Hd), -(mul_div_mul_left Hd Hb), div_add_div_same]
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theorem div_sub_div (Hb : b ≠ 0) (Hd : d ≠ 0) :
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(a / b) - (c / d) = ((a * d) - (b * c)) / (b * d) :=
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by rewrite [↑sub, neg_eq_neg_one_mul, -mul_div_assoc, (div_add_div Hb Hd),
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-mul.assoc, (mul.comm b), mul.assoc, -neg_eq_neg_one_mul]
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theorem mul_eq_mul_of_div_eq_div (Hb : b ≠ 0) (Hd : d ≠ 0) (H : a / b = c / d) : a * d = c * b :=
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by rewrite [-mul_one, mul.assoc, (mul.comm d), -mul.assoc, -(div_self Hb),
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-(div_mul_eq_mul_div_comm Hb), H, (div_mul_eq_mul_div), (div_mul_cancel Hd)]
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theorem one_div_div (Ha : a ≠ 0) (Hb : b ≠ 0) : 1 / (a / b) = b / a :=
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have H : (a / b) * (b / a) = 1, from calc
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(a / b) * (b / a) = (a * b) / (b * a) : div_mul_div Hb Ha
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... = (a * b) / (a * b) : mul.comm
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... = 1 : div_self (mul_ne_zero' Ha Hb),
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symm (eq_one_div_of_mul_eq_one H)
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theorem div_div_eq_mul_div (Hb : b ≠ 0) (Hc : c ≠ 0) : a / (b / c) = (a * c) / b :=
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by rewrite [div_eq_mul_one_div, (one_div_div Hb Hc), -mul_div_assoc]
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theorem div_div_eq_div_mul (Hb : b ≠ 0) (Hc : c ≠ 0) : (a / b) / c = a / (b * c) :=
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by rewrite [div_eq_mul_one_div, (div_mul_div Hb Hc), mul_one]
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theorem div_div_div_div (Hb : b ≠ 0) (Hc : c ≠ 0) (Hd : d ≠ 0) : (a / b) / (c / d) = (a * d) / (b * c) :=
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by rewrite [(div_div_eq_mul_div Hc Hd), (div_mul_eq_mul_div), (div_div_eq_div_mul Hb Hc)]
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-- remaining to transfer from Isabelle fields: ordered fields
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end field
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structure discrete_field [class] (A : Type) extends field A :=
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(has_decidable_eq : decidable_eq A)
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(inv_zero : inv zero = zero)
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attribute discrete_field.has_decidable_eq [instance]
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section discrete_field
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variable [s : discrete_field A]
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include s
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variables {a b c d : A}
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-- many of the theorems in discrete_field are the same as theorems in field or division ring,
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-- but with fewer hypotheses since 0⁻¹ = 0 and equality is decidable.
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-- they are named with '. Is there a better convention?
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theorem discrete_field.eq_zero_or_eq_zero_of_mul_eq_zero
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(x y : A) (H : x * y = 0) : x = 0 ∨ y = 0 :=
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decidable.by_cases
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(assume H : x = 0, or.inl H)
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(assume H1 : x ≠ 0,
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or.inr (by rewrite [-one_mul, -(inv_mul_cancel H1), mul.assoc, H, mul_zero]))
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definition discrete_field.to_integral_domain [instance] [reducible] [coercion] :
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integral_domain A :=
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⦃ integral_domain, s,
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eq_zero_or_eq_zero_of_mul_eq_zero := discrete_field.eq_zero_or_eq_zero_of_mul_eq_zero⦄
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theorem inv_zero : 0⁻¹ = (0:A) := !discrete_field.inv_zero
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theorem one_div_zero : 1 / 0 = (0:A) :=
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calc
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1 / 0 = 1 * 0⁻¹ : refl
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... = 1 * 0 : discrete_field.inv_zero A
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... = 0 : mul_zero
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theorem div_zero : a / 0 = 0 := by rewrite [div_eq_mul_one_div, one_div_zero, mul_zero]
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theorem ne_zero_of_one_div_ne_zero (H : 1 / a ≠ 0) : a ≠ 0 :=
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assume Ha : a = 0, absurd (Ha⁻¹ ▸ one_div_zero) H
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theorem inv_zero_imp_zero (H : 1 / a = 0) : a = 0 :=
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decidable.by_cases
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(assume Ha, Ha)
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(assume Ha, false.elim ((one_div_ne_zero Ha) H))
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-- the following could all go in "discrete_division_ring"
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theorem one_div_mul_one_div'' : (1 / a) * (1 / b) = 1 / (b * a) :=
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decidable.by_cases
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(assume Ha : a = 0,
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by rewrite [Ha, div_zero, zero_mul, -(@div_zero A s 1), mul_zero b])
|
||
(assume Ha : a ≠ 0,
|
||
decidable.by_cases
|
||
(assume Hb : b = 0,
|
||
by rewrite [Hb, div_zero, mul_zero, -(@div_zero A s 1), zero_mul a])
|
||
(assume Hb : b ≠ 0, one_div_mul_one_div Ha Hb))
|
||
|
||
theorem one_div_neg_eq_neg_one_div' : 1 / (- a) = - (1 / a) :=
|
||
decidable.by_cases
|
||
(assume Ha : a = 0, by rewrite [Ha, neg_zero, 2 div_zero, neg_zero])
|
||
(assume Ha : a ≠ 0, one_div_neg_eq_neg_one_div Ha)
|
||
|
||
theorem neg_div' : (-b) / a = - (b / a) :=
|
||
decidable.by_cases
|
||
(assume Ha : a = 0, by rewrite [Ha, 2 div_zero, neg_zero])
|
||
(assume Ha : a ≠ 0, neg_div Ha)
|
||
|
||
theorem neg_div_neg_eq_div' : (-a) / (-b) = a / b :=
|
||
decidable.by_cases
|
||
(assume Hb : b = 0, by rewrite [Hb, neg_zero, 2 div_zero])
|
||
(assume Hb : b ≠ 0, neg_div_neg_eq_div Hb)
|
||
|
||
theorem div_div' : 1 / (1 / a) = a :=
|
||
decidable.by_cases
|
||
(assume Ha : a = 0, by rewrite [Ha, 2 div_zero])
|
||
(assume Ha : a ≠ 0, div_div Ha)
|
||
|
||
theorem eq_of_invs_eq' (H : 1 / a = 1 / b) : a = b :=
|
||
decidable.by_cases
|
||
(assume Ha : a = 0,
|
||
have Hb : b = 0, from inv_zero_imp_zero (by rewrite [-H, Ha, div_zero]),
|
||
Hb⁻¹ ▸ Ha)
|
||
(assume Ha : a ≠ 0,
|
||
have Hb : b ≠ 0, from ne_zero_of_one_div_ne_zero (H ▸ (one_div_ne_zero Ha)),
|
||
eq_of_invs_eq Ha Hb H)
|
||
|
||
theorem mul_inv' : (b * a)⁻¹ = a⁻¹ * b⁻¹ :=
|
||
decidable.by_cases
|
||
(assume Ha : a = 0, by rewrite [Ha, mul_zero, 2 inv_zero, zero_mul])
|
||
(assume Ha : a ≠ 0,
|
||
decidable.by_cases
|
||
(assume Hb : b = 0, by rewrite [Hb, zero_mul, 2 inv_zero, mul_zero])
|
||
(assume Hb : b ≠ 0, mul_inv_eq Ha Hb))
|
||
|
||
-- the following are specifically for fields
|
||
theorem one_div_mul_one_div''' : (1 / a) * (1 / b) = 1 / (a * b) :=
|
||
by rewrite [(one_div_mul_one_div''), mul.comm b]
|
||
|
||
theorem div_mul_right' (Ha : a ≠ 0) : a / (a * b) = 1 / b :=
|
||
decidable.by_cases
|
||
(assume Hb : b = 0, by rewrite [Hb, mul_zero, 2 div_zero])
|
||
(assume Hb : b ≠ 0, div_mul_right Hb (mul_ne_zero Ha Hb))
|
||
|
||
theorem div_mul_left' (Hb : b ≠ 0) : b / (a * b) = 1 / a :=
|
||
by rewrite [mul.comm a, div_mul_right' Hb]
|
||
|
||
theorem div_mul_div' : (a / b) * (c / d) = (a * c) / (b * d) :=
|
||
decidable.by_cases
|
||
(assume Hb : b = 0, by rewrite [Hb, div_zero, zero_mul, -(@div_zero A s (a * c)), zero_mul])
|
||
(assume Hb : b ≠ 0,
|
||
decidable.by_cases
|
||
(assume Hd : d = 0, by rewrite [Hd, div_zero, mul_zero, -(@div_zero A s (a * c)), mul_zero])
|
||
(assume Hd : d ≠ 0, div_mul_div Hb Hd))
|
||
|
||
theorem mul_div_mul_left' (Hc : c ≠ 0) : (c * a) / (c * b) = a / b :=
|
||
decidable.by_cases
|
||
(assume Hb : b = 0, by rewrite [Hb, mul_zero, 2 div_zero])
|
||
(assume Hb : b ≠ 0, mul_div_mul_left Hb Hc)
|
||
|
||
theorem mul_div_mul_right' (Hc : c ≠ 0) : (a * c) / (b * c) = a / b :=
|
||
by rewrite [(mul.comm a), (mul.comm b), (mul_div_mul_left' Hc)]
|
||
|
||
-- this one is odd -- I am not sure what to call it, but again, the prefix is right
|
||
theorem div_mul_eq_mul_div_comm' : (b / c) * a = b * (a / c) :=
|
||
decidable.by_cases
|
||
(assume Hc : c = 0, by rewrite [Hc, div_zero, zero_mul, -(mul_zero b), -(@div_zero A s a)])
|
||
(assume Hc : c ≠ 0, div_mul_eq_mul_div_comm Hc)
|
||
|
||
theorem one_div_div' : 1 / (a / b) = b / a :=
|
||
decidable.by_cases
|
||
(assume Ha : a = 0, by rewrite [Ha, zero_div, 2 div_zero])
|
||
(assume Ha : a ≠ 0,
|
||
decidable.by_cases
|
||
(assume Hb : b = 0, by rewrite [Hb, 2 div_zero, zero_div])
|
||
(assume Hb : b ≠ 0, one_div_div Ha Hb))
|
||
|
||
theorem div_div_eq_mul_div' : a / (b / c) = (a * c) / b :=
|
||
by rewrite [div_eq_mul_one_div, one_div_div', -mul_div_assoc]
|
||
|
||
theorem div_div_eq_div_mul' : (a / b) / c = a / (b * c) :=
|
||
by rewrite [div_eq_mul_one_div, div_mul_div', mul_one]
|
||
|
||
theorem div_div_div_div' : (a / b) / (c / d) = (a * d) / (b * c) :=
|
||
by rewrite [div_div_eq_mul_div', div_mul_eq_mul_div, div_div_eq_div_mul']
|
||
|
||
end discrete_field
|
||
|
||
end algebra
|
||
|
||
|
||
/-
|
||
decidable.by_cases
|
||
(assume Ha : a = 0, sorry)
|
||
(assume Ha : a ≠ 0, sorry)
|
||
-/
|