2018-02-02 14:33:54 +00:00
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{-# OPTIONS --allow-unsolved-metas --cubical #-}
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2017-11-10 15:00:00 +00:00
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2018-01-08 21:48:59 +00:00
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module Cat.Category where
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2017-11-10 15:00:00 +00:00
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open import Agda.Primitive
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open import Data.Unit.Base
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2018-01-20 23:21:25 +00:00
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open import Data.Product renaming
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( proj₁ to fst
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; proj₂ to snd
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; ∃! to ∃!≈
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)
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2017-11-15 21:56:04 +00:00
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open import Data.Empty
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2018-01-30 18:19:16 +00:00
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import Function
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2018-02-09 11:09:59 +00:00
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open import Cubical
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2018-02-16 10:36:44 +00:00
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open import Cubical.NType.Properties using ( propIsEquiv )
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2017-11-10 15:00:00 +00:00
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2018-02-19 10:25:16 +00:00
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open import Cat.Wishlist
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2018-01-20 23:21:25 +00:00
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∃! : ∀ {a b} {A : Set a}
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→ (A → Set b) → Set (a ⊔ b)
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∃! = ∃!≈ _≡_
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∃!-syntax : ∀ {a b} {A : Set a} → (A → Set b) → Set (a ⊔ b)
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∃!-syntax = ∃
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syntax ∃!-syntax (λ x → B) = ∃![ x ] B
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2018-02-20 15:22:38 +00:00
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record RawCategory (ℓa ℓb : Level) : Set (lsuc (ℓa ⊔ ℓb)) where
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no-eta-equality
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field
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Object : Set ℓa
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Arrow : Object → Object → Set ℓb
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𝟙 : {A : Object} → Arrow A A
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_∘_ : {A B C : Object} → Arrow B C → Arrow A B → Arrow A C
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2018-02-05 10:43:38 +00:00
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infixl 10 _∘_
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2018-02-20 15:22:38 +00:00
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2018-02-05 10:43:38 +00:00
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domain : { a b : Object } → Arrow a b → Object
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domain {a = a} _ = a
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codomain : { a b : Object } → Arrow a b → Object
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codomain {b = b} _ = b
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2018-02-20 15:22:38 +00:00
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IsAssociative : Set (ℓa ⊔ ℓb)
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IsAssociative = ∀ {A B C D} {f : Arrow A B} {g : Arrow B C} {h : Arrow C D}
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→ h ∘ (g ∘ f) ≡ (h ∘ g) ∘ f
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IsIdentity : ({A : Object} → Arrow A A) → Set (ℓa ⊔ ℓb)
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IsIdentity id = {A B : Object} {f : Arrow A B}
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→ f ∘ id ≡ f × id ∘ f ≡ f
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2018-02-23 09:35:42 +00:00
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ArrowsAreSets : Set (ℓa ⊔ ℓb)
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ArrowsAreSets = ∀ {A B : Object} → isSet (Arrow A B)
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2018-02-20 15:22:38 +00:00
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IsInverseOf : ∀ {A B} → (Arrow A B) → (Arrow B A) → Set ℓb
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IsInverseOf = λ f g → g ∘ f ≡ 𝟙 × f ∘ g ≡ 𝟙
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Isomorphism : ∀ {A B} → (f : Arrow A B) → Set ℓb
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Isomorphism {A} {B} f = Σ[ g ∈ Arrow B A ] IsInverseOf f g
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_≅_ : (A B : Object) → Set ℓb
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_≅_ A B = Σ[ f ∈ Arrow A B ] (Isomorphism f)
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module _ {A B : Object} where
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Epimorphism : {X : Object } → (f : Arrow A B) → Set ℓb
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Epimorphism {X} f = ( g₀ g₁ : Arrow B X ) → g₀ ∘ f ≡ g₁ ∘ f → g₀ ≡ g₁
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Monomorphism : {X : Object} → (f : Arrow A B) → Set ℓb
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Monomorphism {X} f = ( g₀ g₁ : Arrow X A ) → f ∘ g₀ ≡ f ∘ g₁ → g₀ ≡ g₁
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2018-02-21 11:59:31 +00:00
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IsInitial : Object → Set (ℓa ⊔ ℓb)
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IsInitial I = {X : Object} → isContr (Arrow I X)
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IsTerminal : Object → Set (ℓa ⊔ ℓb)
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IsTerminal T = {X : Object} → isContr (Arrow X T)
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2018-02-21 11:59:31 +00:00
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Initial : Set (ℓa ⊔ ℓb)
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Initial = Σ Object IsInitial
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Terminal : Set (ℓa ⊔ ℓb)
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Terminal = Σ Object IsTerminal
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2018-02-20 17:11:14 +00:00
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-- Univalence is indexed by a raw category as well as an identity proof.
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module Univalence {ℓa ℓb : Level} (ℂ : RawCategory ℓa ℓb) where
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open RawCategory ℂ
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module _ (ident : IsIdentity 𝟙) where
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idIso : (A : Object) → A ≅ A
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idIso A = 𝟙 , (𝟙 , ident)
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2018-02-21 12:37:07 +00:00
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-- Lemma 9.1.4 in [HoTT]
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2018-02-20 17:11:14 +00:00
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id-to-iso : (A B : Object) → A ≡ B → A ≅ B
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id-to-iso A B eq = transp (\ i → A ≅ eq i) (idIso A)
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-- TODO: might want to implement isEquiv
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-- differently, there are 3
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-- equivalent formulations in the book.
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Univalent : Set (ℓa ⊔ ℓb)
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Univalent = {A B : Object} → isEquiv (A ≡ B) (A ≅ B) (id-to-iso A B)
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2018-02-05 10:43:38 +00:00
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record IsCategory {ℓa ℓb : Level} (ℂ : RawCategory ℓa ℓb) : Set (lsuc (ℓa ⊔ ℓb)) where
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open RawCategory ℂ
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open Univalence ℂ public
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field
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2018-02-19 14:46:19 +00:00
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assoc : IsAssociative
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ident : IsIdentity 𝟙
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arrowIsSet : ArrowsAreSets
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univalent : Univalent ident
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2018-02-01 14:20:20 +00:00
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2018-02-20 16:59:48 +00:00
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-- `IsCategory` is a mere proposition.
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module _ {ℓa ℓb : Level} {C : RawCategory ℓa ℓb} where
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open RawCategory C
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module _ (ℂ : IsCategory C) where
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open IsCategory ℂ
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open import Cubical.NType
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open import Cubical.NType.Properties
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propIsAssociative : isProp IsAssociative
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propIsAssociative x y i = arrowIsSet _ _ x y i
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propIsIdentity : ∀ {f : ∀ {A} → Arrow A A} → isProp (IsIdentity f)
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propIsIdentity a b i
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= arrowIsSet _ _ (fst a) (fst b) i
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, arrowIsSet _ _ (snd a) (snd b) i
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propArrowIsSet : isProp (∀ {A B} → isSet (Arrow A B))
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propArrowIsSet a b i = isSetIsProp a b i
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propIsInverseOf : ∀ {A B f g} → isProp (IsInverseOf {A} {B} f g)
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propIsInverseOf x y = λ i →
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let
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h : fst x ≡ fst y
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h = arrowIsSet _ _ (fst x) (fst y)
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hh : snd x ≡ snd y
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hh = arrowIsSet _ _ (snd x) (snd y)
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in h i , hh i
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module _ {A B : Object} {f : Arrow A B} where
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isoIsProp : isProp (Isomorphism f)
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isoIsProp a@(g , η , ε) a'@(g' , η' , ε') =
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lemSig (λ g → propIsInverseOf) a a' geq
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where
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open Cubical.NType.Properties
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geq : g ≡ g'
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geq = begin
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g ≡⟨ sym (fst ident) ⟩
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g ∘ 𝟙 ≡⟨ cong (λ φ → g ∘ φ) (sym ε') ⟩
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g ∘ (f ∘ g') ≡⟨ assoc ⟩
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(g ∘ f) ∘ g' ≡⟨ cong (λ φ → φ ∘ g') η ⟩
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𝟙 ∘ g' ≡⟨ snd ident ⟩
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g' ∎
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2018-02-20 17:11:14 +00:00
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propUnivalent : isProp (Univalent ident)
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propUnivalent a b i = propPi (λ iso → propHasLevel ⟨-2⟩) a b i
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2018-02-20 15:42:56 +00:00
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private
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2018-02-20 16:59:48 +00:00
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module _ (x y : IsCategory C) where
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module IC = IsCategory
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module X = IsCategory x
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module Y = IsCategory y
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open Univalence C
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2018-02-20 16:59:48 +00:00
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-- In a few places I use the result of propositionality of the various
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-- projections of `IsCategory` - I've arbitrarily chosed to use this
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-- result from `x : IsCategory C`. I don't know which (if any) possibly
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-- adverse effects this may have.
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2018-02-20 16:33:02 +00:00
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ident : (λ _ → IsIdentity 𝟙) [ X.ident ≡ Y.ident ]
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ident = propIsIdentity x X.ident Y.ident
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done : x ≡ y
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U : ∀ {a : IsIdentity 𝟙}
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→ (λ _ → IsIdentity 𝟙) [ X.ident ≡ a ]
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→ (b : Univalent a)
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→ Set _
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U eqwal bbb =
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(λ i → Univalent (eqwal i))
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[ X.univalent ≡ bbb ]
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P : (y : IsIdentity 𝟙)
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→ (λ _ → IsIdentity 𝟙) [ X.ident ≡ y ] → Set _
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P y eq = ∀ (b' : Univalent y) → U eq b'
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helper : ∀ (b' : Univalent X.ident)
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→ (λ _ → Univalent X.ident) [ X.univalent ≡ b' ]
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2018-02-20 17:01:26 +00:00
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helper univ = propUnivalent x X.univalent univ
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foo = pathJ P helper Y.ident ident
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eqUni : U ident Y.univalent
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eqUni = foo Y.univalent
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IC.assoc (done i) = propIsAssociative x X.assoc Y.assoc i
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IC.ident (done i) = ident i
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IC.arrowIsSet (done i) = propArrowIsSet x X.arrowIsSet Y.arrowIsSet i
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IC.univalent (done i) = eqUni i
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2018-02-07 19:19:17 +00:00
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2018-02-20 16:59:48 +00:00
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propIsCategory : isProp (IsCategory C)
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propIsCategory = done
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2018-01-21 13:31:37 +00:00
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2018-02-05 13:47:15 +00:00
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record Category (ℓa ℓb : Level) : Set (lsuc (ℓa ⊔ ℓb)) where
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field
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raw : RawCategory ℓa ℓb
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{{isCategory}} : IsCategory raw
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2018-02-20 15:25:49 +00:00
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open RawCategory raw public
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open IsCategory isCategory public
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2018-02-21 12:37:07 +00:00
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module _ {ℓa ℓb : Level} (ℂ : Category ℓa ℓb) where
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open Category ℂ
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_[_,_] : (A : Object) → (B : Object) → Set ℓb
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_[_,_] = Arrow
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2018-02-20 15:25:49 +00:00
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_[_∘_] : {A B C : Object} → (g : Arrow B C) → (f : Arrow A B) → Arrow A C
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_[_∘_] = _∘_
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2018-02-05 10:43:38 +00:00
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module _ {ℓa ℓb : Level} (ℂ : Category ℓa ℓb) where
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private
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open Category ℂ
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2018-02-05 10:43:38 +00:00
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OpRaw : RawCategory ℓa ℓb
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RawCategory.Object OpRaw = Object
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RawCategory.Arrow OpRaw = Function.flip Arrow
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RawCategory.𝟙 OpRaw = 𝟙
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RawCategory._∘_ OpRaw = Function.flip _∘_
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2018-02-05 10:43:38 +00:00
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OpIsCategory : IsCategory OpRaw
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IsCategory.assoc OpIsCategory = sym assoc
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IsCategory.ident OpIsCategory = swap ident
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2018-02-06 09:34:43 +00:00
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IsCategory.arrowIsSet OpIsCategory = arrowIsSet
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IsCategory.univalent OpIsCategory = {!!}
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2018-02-05 10:43:38 +00:00
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Opposite : Category ℓa ℓb
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raw Opposite = OpRaw
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Category.isCategory Opposite = OpIsCategory
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-- As demonstrated here a side-effect of having no-eta-equality on constructors
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-- means that we need to pick things apart to show that things are indeed
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-- definitionally equal. I.e; a thing that would normally be provable in one
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-- line now takes more than 20!!
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module _ {ℓa ℓb : Level} {ℂ : Category ℓa ℓb} where
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private
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open RawCategory
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module C = Category ℂ
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rawOp : Category.raw (Opposite (Opposite ℂ)) ≡ Category.raw ℂ
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Object (rawOp _) = C.Object
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Arrow (rawOp _) = C.Arrow
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𝟙 (rawOp _) = C.𝟙
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_∘_ (rawOp _) = C._∘_
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open Category
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open IsCategory
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module IsCat = IsCategory (ℂ .isCategory)
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rawIsCat : (i : I) → IsCategory (rawOp i)
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assoc (rawIsCat i) = IsCat.assoc
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ident (rawIsCat i) = IsCat.ident
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2018-02-06 09:34:43 +00:00
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arrowIsSet (rawIsCat i) = IsCat.arrowIsSet
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2018-02-05 13:47:15 +00:00
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univalent (rawIsCat i) = IsCat.univalent
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Opposite-is-involution : Opposite (Opposite ℂ) ≡ ℂ
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raw (Opposite-is-involution i) = rawOp i
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isCategory (Opposite-is-involution i) = rawIsCat i
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