lean2/library/init/relation.lean
Leonardo de Moura 276771e6ca feat(library/data/list/sort): add sort for lists
TODO: prove the result is sorted, prove that l1 ~ l2 -> sort R l1 = sort R l2
2015-08-09 14:23:09 -07:00

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/-
Copyright (c) 2014 Microsoft Corporation. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Module init.relation
Authors: Leonardo de Moura
-/
prelude
import init.logic
-- TODO(Leo): remove duplication between this file and algebra/relation.lean
-- We need some of the following definitions asap when "initializing" Lean.
variables {A B : Type} (R : B → B → Prop)
local infix `≺`:50 := R
definition reflexive := ∀x, x ≺ x
definition symmetric := ∀⦃x y⦄, x ≺ y → y ≺ x
definition transitive := ∀⦃x y z⦄, x ≺ y → y ≺ z → x ≺ z
definition equivalence := reflexive R ∧ symmetric R ∧ transitive R
definition total := ∀ x y, x ≺ y y ≺ x
definition mk_equivalence (r : reflexive R) (s : symmetric R) (t : transitive R) : equivalence R :=
and.intro r (and.intro s t)
definition irreflexive := ∀x, ¬ x ≺ x
definition anti_symmetric := ∀⦃x y⦄, x ≺ y → y ≺ x → x = y
definition empty_relation := λa₁ a₂ : A, false
definition subrelation (Q R : B → B → Prop) := ∀⦃x y⦄, Q x y → R x y
definition inv_image (f : A → B) : A → A → Prop :=
λa₁ a₂, f a₁ ≺ f a₂
theorem inv_image.trans (f : A → B) (H : transitive R) : transitive (inv_image R f) :=
λ (a₁ a₂ a₃ : A) (H₁ : inv_image R f a₁ a₂) (H₂ : inv_image R f a₂ a₃), H H₁ H₂
theorem inv_image.irreflexive (f : A → B) (H : irreflexive R) : irreflexive (inv_image R f) :=
λ (a : A) (H₁ : inv_image R f a a), H (f a) H₁
inductive tc {A : Type} (R : A → A → Prop) : A → A → Prop :=
| base : ∀a b, R a b → tc R a b
| trans : ∀a b c, tc R a b → tc R b c → tc R a c