{-# OPTIONS --cubical-compatible --safe #-}
module Relation.Binary.Indexed.Heterogeneous.Definitions where
open import Level
import Relation.Binary.Core as B
import Relation.Binary.Definitions as B
import Relation.Binary.PropositionalEquality.Core as P
open import Relation.Binary.Indexed.Heterogeneous.Core
private
variable
i a ℓ : Level
I : Set i
Reflexive : (A : I → Set a) → IRel A ℓ → Set _
Reflexive _ _∼_ = ∀ {i} → B.Reflexive (_∼_ {i})
Symmetric : (A : I → Set a) → IRel A ℓ → Set _
Symmetric _ _∼_ = ∀ {i j} → B.Sym (_∼_ {i} {j}) _∼_
Transitive : (A : I → Set a) → IRel A ℓ → Set _
Transitive _ _∼_ = ∀ {i j k} → B.Trans _∼_ (_∼_ {j}) (_∼_ {i} {k})