{-# OPTIONS --cubical-compatible --safe #-}
module Axiom.Extensionality.Propositional where
open import Function.Base
open import Level using (Level; _⊔_; suc; lift)
open import Relation.Binary.Core
open import Relation.Binary.PropositionalEquality.Core
Extensionality : (a b : Level) → Set _
Extensionality a b =
{A : Set a} {B : A → Set b} {f g : (x : A) → B x} →
(∀ x → f x ≡ g x) → f ≡ g
ExtensionalityImplicit : (a b : Level) → Set _
ExtensionalityImplicit a b =
{A : Set a} {B : A → Set b} {f g : {x : A} → B x} →
(∀ {x} → f {x} ≡ g {x}) → (λ {x} → f {x}) ≡ (λ {x} → g {x})
lower-extensionality : ∀ {a₁ b₁} a₂ b₂ →
Extensionality (a₁ ⊔ a₂) (b₁ ⊔ b₂) →
Extensionality a₁ b₁
lower-extensionality a₂ b₂ ext f≡g = cong (λ h → Level.lower ∘ h ∘ lift) $
ext (cong (lift {ℓ = b₂}) ∘ f≡g ∘ Level.lower {ℓ = a₂})
∀-extensionality : ∀ {a b} → Extensionality a (suc b) →
{A : Set a} (B₁ B₂ : A → Set b) →
(∀ x → B₁ x ≡ B₂ x) →
(∀ x → B₁ x) ≡ (∀ x → B₂ x)
∀-extensionality ext B₁ B₂ B₁≡B₂ with ext B₁≡B₂
... | refl = refl
implicit-extensionality : ∀ {a b} →
Extensionality a b →
ExtensionalityImplicit a b
implicit-extensionality ext f≡g = cong _$- (ext (λ x → f≡g))