# Discrete types ```agda module foundation.discrete-types where open import foundation-core.discrete-types public ``` <details><summary>Imports</summary> ```agda open import foundation.apartness-relations open import foundation.binary-relations open import foundation.decidable-types open import foundation.dependent-pair-types open import foundation.negation open import foundation.propositional-truncations open import foundation.tight-apartness-relations open import foundation.universe-levels open import foundation-core.coproduct-types open import foundation-core.identity-types open import foundation-core.propositions ``` </details> ## Idea A discrete type is a type that has decidable equality. ## Properties ### The apartness relation on a discrete type is negated equality ```agda module _ {l : Level} (X : Discrete-Type l) where rel-apart-Discrete-Type : Relation-Prop l (type-Discrete-Type X) rel-apart-Discrete-Type x y = neg-type-Prop (x = y) apart-Discrete-Type : (x y : type-Discrete-Type X) → UU l apart-Discrete-Type x y = type-Prop (rel-apart-Discrete-Type x y) antireflexive-apart-Discrete-Type : is-antireflexive rel-apart-Discrete-Type antireflexive-apart-Discrete-Type x r = r refl symmetric-apart-Discrete-Type : is-symmetric apart-Discrete-Type symmetric-apart-Discrete-Type x y H p = H (inv p) cotransitive-apart-Discrete-Type : is-cotransitive rel-apart-Discrete-Type cotransitive-apart-Discrete-Type x y z r with has-decidable-equality-type-Discrete-Type X x z ... | inl refl = unit-trunc-Prop (inr (λ s → r (inv s))) ... | inr np = unit-trunc-Prop (inl np) is-tight-apart-Discrete-Type : is-tight rel-apart-Discrete-Type is-tight-apart-Discrete-Type x y = double-negation-elim-is-decidable ( has-decidable-equality-type-Discrete-Type X x y) apartness-relation-Discrete-Type : Apartness-Relation l (type-Discrete-Type X) pr1 apartness-relation-Discrete-Type = rel-apart-Discrete-Type pr1 (pr2 apartness-relation-Discrete-Type) = antireflexive-apart-Discrete-Type pr1 (pr2 (pr2 apartness-relation-Discrete-Type)) = symmetric-apart-Discrete-Type pr2 (pr2 (pr2 apartness-relation-Discrete-Type)) = cotransitive-apart-Discrete-Type type-with-apartness-Discrete-Type : Type-With-Apartness l l pr1 type-with-apartness-Discrete-Type = type-Discrete-Type X pr2 type-with-apartness-Discrete-Type = apartness-relation-Discrete-Type tight-apartness-relation-Discrete-Type : Tight-Apartness-Relation l (type-Discrete-Type X) pr1 tight-apartness-relation-Discrete-Type = apartness-relation-Discrete-Type pr2 tight-apartness-relation-Discrete-Type = is-tight-apart-Discrete-Type type-with-tight-apartness-Discrete-Type : Type-With-Tight-Apartness l l pr1 type-with-tight-apartness-Discrete-Type = type-with-apartness-Discrete-Type pr2 type-with-tight-apartness-Discrete-Type = is-tight-apart-Discrete-Type ```