------------------------------------------------------------------------ -- The Agda standard library -- -- Left inverses ------------------------------------------------------------------------ {-# OPTIONS --without-K --safe #-} -- Note: use of the standard function hierarchy is encouraged. The -- module `Function` re-exports `Inverseˡ`, `IsLeftInverse` and -- `LeftInverse`. The alternative definitions found in this file will -- eventually be deprecated. module Function.LeftInverse where open import Data.Product open import Level import Relation.Binary.Reasoning.Setoid as EqReasoning open import Relation.Binary open import Function.Equality as Eq using (_⟶_; _⟨$⟩_) renaming (_∘_ to _⟪∘⟫_) open import Function.Equivalence using (Equivalence) open import Function.Injection using (Injective; Injection) open import Relation.Binary.PropositionalEquality as P using (_≡_) ------------------------------------------------------------------------ -- Left and right inverses. _LeftInverseOf_ : ∀ {f₁ f₂ t₁ t₂} {From : Setoid f₁ f₂} {To : Setoid t₁ t₂} → To ⟶ From → From ⟶ To → Set _ _LeftInverseOf_ {From = From} f g = ∀ x → f ⟨$⟩ (g ⟨$⟩ x) ≈ x where open Setoid From _RightInverseOf_ : ∀ {f₁ f₂ t₁ t₂} {From : Setoid f₁ f₂} {To : Setoid t₁ t₂} → To ⟶ From → From ⟶ To → Set _ f RightInverseOf g = g LeftInverseOf f ------------------------------------------------------------------------ -- The set of all left inverses between two setoids. record LeftInverse {f₁ f₂ t₁ t₂} (From : Setoid f₁ f₂) (To : Setoid t₁ t₂) : Set (f₁ ⊔ f₂ ⊔ t₁ ⊔ t₂) where field to : From ⟶ To from : To ⟶ From left-inverse-of : from LeftInverseOf to private open module F = Setoid From open module T = Setoid To open EqReasoning From injective : Injective to injective {x} {y} eq = begin x ≈⟨ F.sym (left-inverse-of x) ⟩ from ⟨$⟩ (to ⟨$⟩ x) ≈⟨ Eq.cong from eq ⟩ from ⟨$⟩ (to ⟨$⟩ y) ≈⟨ left-inverse-of y ⟩ y ∎ injection : Injection From To injection = record { to = to; injective = injective } equivalence : Equivalence From To equivalence = record { to = to ; from = from } to-from : ∀ {x y} → to ⟨$⟩ x T.≈ y → from ⟨$⟩ y F.≈ x to-from {x} {y} to-x≈y = begin from ⟨$⟩ y ≈⟨ Eq.cong from (T.sym to-x≈y) ⟩ from ⟨$⟩ (to ⟨$⟩ x) ≈⟨ left-inverse-of x ⟩ x ∎ -- The set of all right inverses between two setoids. RightInverse : ∀ {f₁ f₂ t₁ t₂} (From : Setoid f₁ f₂) (To : Setoid t₁ t₂) → Set _ RightInverse From To = LeftInverse To From ------------------------------------------------------------------------ -- The set of all left inverses from one set to another (i.e. left -- inverses with propositional equality). -- -- Read A ↞ B as "surjection from B to A". infix 3 _↞_ _↞_ : ∀ {f t} → Set f → Set t → Set _ From ↞ To = LeftInverse (P.setoid From) (P.setoid To) leftInverse : ∀ {f t} {From : Set f} {To : Set t} → (to : From → To) (from : To → From) → (∀ x → from (to x) ≡ x) → From ↞ To leftInverse to from invˡ = record { to = P.→-to-⟶ to ; from = P.→-to-⟶ from ; left-inverse-of = invˡ } ------------------------------------------------------------------------ -- Identity and composition. id : ∀ {s₁ s₂} {S : Setoid s₁ s₂} → LeftInverse S S id {S = S} = record { to = Eq.id ; from = Eq.id ; left-inverse-of = λ _ → Setoid.refl S } infixr 9 _∘_ _∘_ : ∀ {f₁ f₂ m₁ m₂ t₁ t₂} {F : Setoid f₁ f₂} {M : Setoid m₁ m₂} {T : Setoid t₁ t₂} → LeftInverse M T → LeftInverse F M → LeftInverse F T _∘_ {F = F} f g = record { to = to f ⟪∘⟫ to g ; from = from g ⟪∘⟫ from f ; left-inverse-of = λ x → begin from g ⟨$⟩ (from f ⟨$⟩ (to f ⟨$⟩ (to g ⟨$⟩ x))) ≈⟨ Eq.cong (from g) (left-inverse-of f (to g ⟨$⟩ x)) ⟩ from g ⟨$⟩ (to g ⟨$⟩ x) ≈⟨ left-inverse-of g x ⟩ x ∎ } where open LeftInverse open EqReasoning F