module Cat.Instances.Functor where private variable o h o₁ h₁ o₂ h₂ : Level B C D E : Precategory o h F G : Functor C D
Functor (pre)categories🔗
open import Cat.Functor.Base public
Functor categories🔗
When the codomain category is univalent, then so is the category of functors Essentially, this can be read as saying that “naturally isomorphic functors are identified”. We begin by proving that the components of a natural isomorphism (a natural transformation with natural inverse) are themselves isomorphisms in
open import Cat.Functor.Univalence public
Constant diagrams🔗
There is a functor from to that takes an object to the constant functor
module _ {o ℓ o' ℓ'} {C : Precategory o ℓ} {J : Precategory o' ℓ'} where private module C = Precategory C private module J = Precategory J
ConstD : Functor C Cat[ J , C ] ConstD .F₀ x = Const x ConstD .F₁ f = constⁿ f ConstD .F-id = ext λ _ → refl ConstD .F-∘ f g = ext λ _ → refl
F∘-assoc : ∀ {o ℓ o' ℓ' o'' ℓ'' o₃ ℓ₃} {C : Precategory o ℓ} {D : Precategory o' ℓ'} {E : Precategory o'' ℓ''} {F : Precategory o₃ ℓ₃} {F : Functor E F} {G : Functor D E} {H : Functor C D} → F F∘ (G F∘ H) ≡ (F F∘ G) F∘ H F∘-assoc = Functor-path (λ x → refl) λ x → refl F∘-idl : ∀ {o'' ℓ'' o₃ ℓ₃} {E : Precategory o'' ℓ''} {E' : Precategory o₃ ℓ₃} {F : Functor E E'} → Id F∘ F ≡ F F∘-idl = Functor-path (λ x → refl) λ x → refl F∘-idr : ∀ {o'' ℓ'' o₃ ℓ₃} {E : Precategory o'' ℓ''} {E' : Precategory o₃ ℓ₃} {F : Functor E E'} → F F∘ Id ≡ F F∘-idr = Functor-path (λ x → refl) λ x → refl F∘-id2 : ∀ {o ℓ} {C : Precategory o ℓ} → Id {C = C} F∘ Id {C = C} ≡ Id F∘-id2 = Functor-path (λ _ → refl) (λ _ → refl) module _ {o ℓ o' ℓ' o'' ℓ''} {C : Precategory o ℓ} {D : Precategory o' ℓ'} {E : Precategory o'' ℓ''} where private module CD = Cat.Reasoning Cat[ C , D ] module DE = Cat.Reasoning Cat[ D , E ] module CE = Cat.Reasoning Cat[ C , E ] F∘-iso-l : {F F' : Functor D E} {G : Functor C D} → F DE.≅ F' → (F F∘ G) CE.≅ (F' F∘ G) F∘-iso-l {F} {F'} {G} isom = CE.make-iso (isom.to ◂ G) (isom.from ◂ G) (ext λ x → isom.invl ·ₚ _) (ext λ x → isom.invr ·ₚ _) where module isom = DE._≅_ isom F∘-iso-r : {F : Functor D E} {G G' : Functor C D} → G CD.≅ G' → (F F∘ G) CE.≅ (F F∘ G') F∘-iso-r {F} {G} {G'} isom = CE.make-iso (F ▸ isom.to) (F ▸ isom.from) (ext λ x → F.annihilate (isom.invl ηₚ _)) (ext λ x → F.annihilate (isom.invr ηₚ _)) where module isom = CD._≅_ isom module F = Cat.Functor.Reasoning F open import Cat.Functor.Naturality public module _ {o ℓ o' ℓ'} {C : Precategory o ℓ} {D : Precategory o' ℓ'} where private module DD = Cat.Reasoning Cat[ D , D ] module CD = Cat.Reasoning Cat[ C , D ] module D = Cat.Reasoning D module C = Cat.Reasoning C F∘-iso-id-l : {F : Functor D D} {G : Functor C D} → F ≅ⁿ Id → (F F∘ G) ≅ⁿ G F∘-iso-id-l {F} {G} isom = subst ((F F∘ G) CD.≅_) F∘-idl (F∘-iso-l isom) open _=>_ _ni^op : F ≅ⁿ G → Functor.op F ≅ⁿ Functor.op G _ni^op α = Cat.Reasoning.make-iso _ (_=>_.op (Isoⁿ.from α)) (_=>_.op (Isoⁿ.to α)) (reext! (Isoⁿ.invl α)) (reext! (Isoⁿ.invr α)) module _ {o ℓ κ} {C : Precategory o ℓ} where open Functor open _=>_ natural-iso-to-is-equiv : {F G : Functor C (Sets κ)} → (eta : F ≅ⁿ G) → ∀ x → is-equiv (Isoⁿ.to eta .η x) natural-iso-to-is-equiv eta x = is-iso→is-equiv $ iso (Isoⁿ.from eta .η x) (λ x i → Isoⁿ.invl eta i .η _ x) (λ x i → Isoⁿ.invr eta i .η _ x) natural-iso-from-is-equiv : {F G : Functor C (Sets κ)} → (eta : F ≅ⁿ G) → ∀ x → is-equiv (Isoⁿ.from eta .η x) natural-iso-from-is-equiv eta x = is-iso→is-equiv $ iso (Isoⁿ.to eta .η x) (λ x i → Isoⁿ.invr eta i .η _ x) (λ x i → Isoⁿ.invl eta i .η _ x) natural-iso→equiv : {F G : Functor C (Sets κ)} → (eta : F ≅ⁿ G) → ∀ x → F ʻ x ≃ G ʻ x natural-iso→equiv eta x = Isoⁿ.to eta .η x , natural-iso-to-is-equiv eta x