e3e2370a38
Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>
169 lines
7 KiB
Text
169 lines
7 KiB
Text
-- 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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-- Author: Floris van Doorn
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import logic ..prod algebra.relation
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import tools.fake_simplifier
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open prod eq_ops
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open fake_simplifier
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namespace quotient
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-- auxliary facts about products
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-- -----------------------------
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-- ### flip
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definition flip {A B : Type} (a : A × B) : B × A := pair (pr2 a) (pr1 a)
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theorem flip_def {A B : Type} (a : A × B) : flip a = pair (pr2 a) (pr1 a) := eq.refl (flip a)
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theorem flip_pair {A B : Type} (a : A) (b : B) : flip (pair a b) = pair b a := rfl
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theorem flip_pr1 {A B : Type} (a : A × B) : pr1 (flip a) = pr2 a := rfl
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theorem flip_pr2 {A B : Type} (a : A × B) : pr2 (flip a) = pr1 a := rfl
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theorem flip_flip {A B : Type} (a : A × B) : flip (flip a) = a :=
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prod.destruct a (take x y, rfl)
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theorem P_flip {A B : Type} {P : A → B → Prop} {a : A × B} (H : P (pr1 a) (pr2 a))
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: P (pr2 (flip a)) (pr1 (flip a)) :=
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(flip_pr1 a)⁻¹ ▸ (flip_pr2 a)⁻¹ ▸ H
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theorem flip_inj {A B : Type} {a b : A × B} (H : flip a = flip b) : a = b :=
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have H2 : flip (flip a) = flip (flip b), from congr_arg flip H,
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show a = b, from (flip_flip a) ▸ (flip_flip b) ▸ H2
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-- ### coordinatewise unary maps
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definition map_pair {A B : Type} (f : A → B) (a : A × A) : B × B :=
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pair (f (pr1 a)) (f (pr2 a))
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theorem map_pair_def {A B : Type} (f : A → B) (a : A × A)
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: map_pair f a = pair (f (pr1 a)) (f (pr2 a)) :=
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rfl
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theorem map_pair_pair {A B : Type} (f : A → B) (a a' : A)
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: map_pair f (pair a a') = pair (f a) (f a') :=
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(pr1_pair a a') ▸ (pr2_pair a a') ▸ (rfl)
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theorem map_pair_pr1 {A B : Type} (f : A → B) (a : A × A) : pr1 (map_pair f a) = f (pr1 a) :=
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pr1_pair _ _
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theorem map_pair_pr2 {A B : Type} (f : A → B) (a : A × A) : pr2 (map_pair f a) = f (pr2 a) :=
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pr2_pair _ _
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-- ### coordinatewise binary maps
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definition map_pair2 {A B C : Type} (f : A → B → C) (a : A × A) (b : B × B) : C × C :=
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pair (f (pr1 a) (pr1 b)) (f (pr2 a) (pr2 b))
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theorem map_pair2_def {A B C : Type} (f : A → B → C) (a : A × A) (b : B × B) :
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map_pair2 f a b = pair (f (pr1 a) (pr1 b)) (f (pr2 a) (pr2 b)) := rfl
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theorem map_pair2_pair {A B C : Type} (f : A → B → C) (a a' : A) (b b' : B) :
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map_pair2 f (pair a a') (pair b b') = pair (f a b) (f a' b') :=
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calc
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map_pair2 f (pair a a') (pair b b')
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= pair (f (pr1 (pair a a')) b) (f (pr2 (pair a a')) (pr2 (pair b b')))
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: {pr1_pair b b'}
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... = pair (f (pr1 (pair a a')) b) (f (pr2 (pair a a')) b') : {pr2_pair b b'}
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... = pair (f (pr1 (pair a a')) b) (f a' b') : {pr2_pair a a'}
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... = pair (f a b) (f a' b') : {pr1_pair a a'}
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theorem map_pair2_pr1 {A B C : Type} (f : A → B → C) (a : A × A) (b : B × B) :
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pr1 (map_pair2 f a b) = f (pr1 a) (pr1 b) := pr1_pair _ _
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theorem map_pair2_pr2 {A B C : Type} (f : A → B → C) (a : A × A) (b : B × B) :
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pr2 (map_pair2 f a b) = f (pr2 a) (pr2 b) := pr2_pair _ _
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theorem map_pair2_flip {A B C : Type} (f : A → B → C) (a : A × A) (b : B × B) :
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flip (map_pair2 f a b) = map_pair2 f (flip a) (flip b) :=
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have Hx : pr1 (flip (map_pair2 f a b)) = pr1 (map_pair2 f (flip a) (flip b)), from
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calc
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pr1 (flip (map_pair2 f a b)) = pr2 (map_pair2 f a b) : flip_pr1 _
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... = f (pr2 a) (pr2 b) : map_pair2_pr2 f a b
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... = f (pr1 (flip a)) (pr2 b) : {(flip_pr1 a)⁻¹}
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... = f (pr1 (flip a)) (pr1 (flip b)) : {(flip_pr1 b)⁻¹}
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... = pr1 (map_pair2 f (flip a) (flip b)) : (map_pair2_pr1 f _ _)⁻¹,
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have Hy : pr2 (flip (map_pair2 f a b)) = pr2 (map_pair2 f (flip a) (flip b)), from
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calc
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pr2 (flip (map_pair2 f a b)) = pr1 (map_pair2 f a b) : flip_pr2 _
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... = f (pr1 a) (pr1 b) : map_pair2_pr1 f a b
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... = f (pr2 (flip a)) (pr1 b) : {flip_pr2 a}
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... = f (pr2 (flip a)) (pr2 (flip b)) : {flip_pr2 b}
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... = pr2 (map_pair2 f (flip a) (flip b)) : (map_pair2_pr2 f _ _)⁻¹,
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pair_eq Hx Hy
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-- add_rewrite flip_pr1 flip_pr2 flip_pair
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-- add_rewrite map_pair_pr1 map_pair_pr2 map_pair_pair
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-- add_rewrite map_pair2_pr1 map_pair2_pr2 map_pair2_pair
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theorem map_pair2_comm {A B : Type} {f : A → A → B} (Hcomm : ∀a b : A, f a b = f b a)
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(v w : A × A) : map_pair2 f v w = map_pair2 f w v :=
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have Hx : pr1 (map_pair2 f v w) = pr1 (map_pair2 f w v), from
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calc
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pr1 (map_pair2 f v w) = f (pr1 v) (pr1 w) : map_pair2_pr1 f v w
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... = f (pr1 w) (pr1 v) : Hcomm _ _
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... = pr1 (map_pair2 f w v) : (map_pair2_pr1 f w v)⁻¹,
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have Hy : pr2 (map_pair2 f v w) = pr2 (map_pair2 f w v), from
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calc
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pr2 (map_pair2 f v w) = f (pr2 v) (pr2 w) : map_pair2_pr2 f v w
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... = f (pr2 w) (pr2 v) : Hcomm _ _
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... = pr2 (map_pair2 f w v) : (map_pair2_pr2 f w v)⁻¹,
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pair_eq Hx Hy
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theorem map_pair2_assoc {A : Type} {f : A → A → A}
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(Hassoc : ∀a b c : A, f (f a b) c = f a (f b c)) (u v w : A × A) :
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map_pair2 f (map_pair2 f u v) w = map_pair2 f u (map_pair2 f v w) :=
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have Hx : pr1 (map_pair2 f (map_pair2 f u v) w) =
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pr1 (map_pair2 f u (map_pair2 f v w)), from
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calc
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pr1 (map_pair2 f (map_pair2 f u v) w)
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= f (pr1 (map_pair2 f u v)) (pr1 w) : map_pair2_pr1 f _ _
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... = f (f (pr1 u) (pr1 v)) (pr1 w) : {map_pair2_pr1 f _ _}
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... = f (pr1 u) (f (pr1 v) (pr1 w)) : Hassoc (pr1 u) (pr1 v) (pr1 w)
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... = f (pr1 u) (pr1 (map_pair2 f v w)) : {(map_pair2_pr1 f _ _)⁻¹}
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... = pr1 (map_pair2 f u (map_pair2 f v w)) : (map_pair2_pr1 f _ _)⁻¹,
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have Hy : pr2 (map_pair2 f (map_pair2 f u v) w) =
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pr2 (map_pair2 f u (map_pair2 f v w)), from
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calc
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pr2 (map_pair2 f (map_pair2 f u v) w)
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= f (pr2 (map_pair2 f u v)) (pr2 w) : map_pair2_pr2 f _ _
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... = f (f (pr2 u) (pr2 v)) (pr2 w) : {map_pair2_pr2 f _ _}
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... = f (pr2 u) (f (pr2 v) (pr2 w)) : Hassoc (pr2 u) (pr2 v) (pr2 w)
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... = f (pr2 u) (pr2 (map_pair2 f v w)) : {map_pair2_pr2 f _ _}
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... = pr2 (map_pair2 f u (map_pair2 f v w)) : (map_pair2_pr2 f _ _)⁻¹,
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pair_eq Hx Hy
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theorem map_pair2_id_right {A B : Type} {f : A → B → A} {e : B} (Hid : ∀a : A, f a e = a)
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(v : A × A) : map_pair2 f v (pair e e) = v :=
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have Hx : pr1 (map_pair2 f v (pair e e)) = pr1 v, from
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(calc
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pr1 (map_pair2 f v (pair e e)) = f (pr1 v) (pr1 (pair e e)) : by simp
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... = f (pr1 v) e : by simp
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... = pr1 v : Hid (pr1 v)),
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have Hy : pr2 (map_pair2 f v (pair e e)) = pr2 v, from
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(calc
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pr2 (map_pair2 f v (pair e e)) = f (pr2 v) (pr2 (pair e e)) : by simp
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... = f (pr2 v) e : by simp
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... = pr2 v : Hid (pr2 v)),
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prod.equal Hx Hy
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theorem map_pair2_id_left {A B : Type} {f : B → A → A} {e : B} (Hid : ∀a : A, f e a = a)
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(v : A × A) : map_pair2 f (pair e e) v = v :=
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have Hx : pr1 (map_pair2 f (pair e e) v) = pr1 v, from
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calc
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pr1 (map_pair2 f (pair e e) v) = f (pr1 (pair e e)) (pr1 v) : by simp
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... = f e (pr1 v) : by simp
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... = pr1 v : Hid (pr1 v),
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have Hy : pr2 (map_pair2 f (pair e e) v) = pr2 v, from
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calc
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pr2 (map_pair2 f (pair e e) v) = f (pr2 (pair e e)) (pr2 v) : by simp
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... = f e (pr2 v) : by simp
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... = pr2 v : Hid (pr2 v),
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prod.equal Hx Hy
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end quotient
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