Add some additional 'equivalence' definitions to Equivalence
Signed-off-by: Danila Fedorin <danila.fedorin@gmail.com>
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@ -4,8 +4,18 @@ open import Data.Product using (_×_; Σ; _,_; proj₁; proj₂)
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open import Relation.Binary.Definitions
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open import Relation.Binary.PropositionalEquality as Eq using (_≡_; sym)
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record IsEquivalence {a} (A : Set a) (_≈_ : A → A → Set a) : Set a where
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module _ {a} (A : Set a) (_≈_ : A → A → Set a) where
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IsReflexive : Set a
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IsReflexive = ∀ {a : A} → a ≈ a
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IsSymmetric : Set a
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IsSymmetric = ∀ {a b : A} → a ≈ b → b ≈ a
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IsTransitive : Set a
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IsTransitive = ∀ {a b c : A} → a ≈ b → b ≈ c → a ≈ c
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record IsEquivalence : Set a where
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field
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≈-refl : {a : A} → a ≈ a
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≈-sym : {a b : A} → a ≈ b → b ≈ a
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≈-trans : {a b c : A} → a ≈ b → b ≈ c → a ≈ c
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≈-refl : IsReflexive
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≈-sym : IsSymmetric
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≈-trans : IsTransitive
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