Progress on univalence
This commit is contained in:
parent
5bbb40b664
commit
0ced448fa6
|
@ -356,7 +356,7 @@ module _ {ℓa ℓb : Level} (ℂ : RawCategory ℓa ℓb) where
|
|||
fst (idToIso _ _ refl) <<< f <<< (fst (snd (idToIso _ _ refl))) ∎
|
||||
where
|
||||
lem : ∀ {x} → PathP (λ _ → Arrow x x) identity (fst (idToIso x x refl))
|
||||
lem = sym (subst-neutral {P = λ x → Arrow x x})
|
||||
lem = sym subst-neutral
|
||||
|
||||
D : ∀ a'' → a ≡ a'' → Set _
|
||||
D a'' p' = coe (λ i → Arrow (p' i) (q i)) f ≡ fst (idToIso b b' q) <<< f <<< (fst (snd (idToIso _ _ p')))
|
||||
|
|
|
@ -258,22 +258,45 @@ module Try0 {ℓa ℓb : Level} {ℂ : Category ℓa ℓb}
|
|||
r-arrow i = ℂ.Arrow (r i) A
|
||||
t : coe r-arrow xa ≡ ℂ.identity ℂ.<<< xa ℂ.<<< f~
|
||||
t = {!? ≡ ?!}
|
||||
lem : ∀ {x} → ℂ.idToIso _ _ (ℂ.isoToId x) ≡ x
|
||||
lem {x} i = snd ℂ.inverse-from-to-iso' i x
|
||||
lem : ∀ {A B} {x : A ℂ.≅ B} → ℂ.idToIso A B (ℂ.isoToId x) ≡ x
|
||||
lem = λ{ {x = x} i → snd ℂ.inverse-from-to-iso' i x}
|
||||
lem' : ∀ {A B} {x : A ≡ B} → ℂ.isoToId (ℂ.idToIso _ _ x) ≡ x
|
||||
lem' = λ{ {x = x} i → fst ℂ.inverse-from-to-iso' i x}
|
||||
h : ya ≡ xa ℂ.<<< f~
|
||||
h = begin
|
||||
ya ≡⟨ {!!} ⟩
|
||||
ya ≡⟨ sym (coe-lem p) ⟩
|
||||
coe r-arrow xa
|
||||
≡⟨ ℂ.9-1-9 r refl xa ⟩
|
||||
fst (ℂ.idToIso _ _ refl) ℂ.<<< xa ℂ.<<< fst (snd (ℂ.idToIso _ _ r))
|
||||
≡⟨ cong (λ φ → φ ℂ.<<< xa ℂ.<<< fst (snd (ℂ.idToIso _ _ r))) (subst-neutral {P = λ x → ℂ.Arrow x x}) ⟩
|
||||
≡⟨ cong (λ φ → φ ℂ.<<< xa ℂ.<<< fst (snd (ℂ.idToIso _ _ r))) subst-neutral ⟩
|
||||
ℂ.identity ℂ.<<< xa ℂ.<<< fst (snd (ℂ.idToIso _ _ r))
|
||||
≡⟨ cong (λ φ → ℂ.identity ℂ.<<< xa ℂ.<<< φ) (cong (λ x → (fst (snd x))) lem) ⟩
|
||||
ℂ.identity ℂ.<<< xa ℂ.<<< f~
|
||||
≡⟨ cong (ℂ._<<< f~) ℂ.leftIdentity ⟩
|
||||
xa ℂ.<<< f~ ∎
|
||||
complicated : Y ≡ X
|
||||
complicated = (λ z → sym (ℂ.isoToId (f , f~ , inv-f)) z)
|
||||
in
|
||||
( f , {!h!} , {!!})
|
||||
( f , (begin
|
||||
ℂ [ ya ∘ f ] ≡⟨⟩
|
||||
ya ℂ.<<< f ≡⟨ sym ℂ.leftIdentity ⟩
|
||||
ℂ.identity ℂ.<<< (ya ℂ.<<< f)
|
||||
≡⟨ ℂ.isAssociative ⟩
|
||||
ℂ.identity ℂ.<<< ya ℂ.<<< f
|
||||
≡⟨ cong (λ φ → φ ℂ.<<< ya ℂ.<<< f) (sym subst-neutral) ⟩
|
||||
fst (ℂ.idToIso _ _ refl) ℂ.<<< ya ℂ.<<< f
|
||||
≡⟨ cong (λ φ → fst (ℂ.idToIso _ _ refl) ℂ.<<< ya ℂ.<<< φ)
|
||||
(begin
|
||||
f ≡⟨ {!cong (λ x → (fst (snd x))) ((lem {x = f~ , f , swap inv-f}))!} ⟩
|
||||
-- f ≡⟨ cong fst (sym (lem {f , f~ , inv-f})) ⟩
|
||||
-- fst ( ℂ.idToIso X Y ( ℂ.isoToId (f , f~ , inv-f))) ≡⟨ {!fst inv-f!} ⟩
|
||||
fst (snd (ℂ.idToIso Y X (λ z → sym (ℂ.isoToId (f , f~ , inv-f)) z))) ∎)
|
||||
⟩
|
||||
_ ℂ.<<< ya ℂ.<<< fst (snd (ℂ.idToIso _ _ _))
|
||||
≡⟨ sym (ℂ.9-1-9 (sym r) refl ya) ⟩
|
||||
coe (sym r-arrow) ya
|
||||
≡⟨ coe-lem (λ i → p (~ i)) ⟩
|
||||
xa ∎) , {!!})
|
||||
, ( f~ , sym h , {!!})
|
||||
, lemA (fst inv-f)
|
||||
, lemA (snd inv-f)
|
||||
|
@ -283,14 +306,28 @@ module Try0 {ℓa ℓb : Level} {ℂ : Category ℓa ℓb}
|
|||
let
|
||||
iso : X ℂ.≅ Y
|
||||
iso = fst f , fst f~ , cong fst inv-f , cong fst inv-f~
|
||||
helper : PathP (λ i → ℂ.Arrow (ℂ.isoToId {!!} i) A) xa ya
|
||||
helper = {!!}
|
||||
in iso , helper , {!!}})
|
||||
p : X ≡ Y
|
||||
p = ℂ.isoToId iso
|
||||
lem : xa ≡ _
|
||||
lem = begin
|
||||
xa ≡⟨ sym (fst (snd f)) ⟩
|
||||
ya ℂ.<<< fst f ≡⟨ sym ℂ.leftIdentity ⟩
|
||||
ℂ.identity ℂ.<<< (ya ℂ.<<< fst f) ≡⟨ ℂ.isAssociative ⟩
|
||||
ℂ.identity ℂ.<<< ya ℂ.<<< fst f ≡⟨ {!sym (ℂ.9-1-9 ? refl ya)!} ⟩
|
||||
_ ℂ.<<< ya ℂ.<<< _ ≡⟨ sym (ℂ.9-1-9 (sym p) refl ya) ⟩
|
||||
coe (λ i → ℂ.Arrow (p (~ i)) A) ya ∎
|
||||
lem0 = begin
|
||||
xa ≡⟨ {!!} ⟩
|
||||
coe _ xa ≡⟨ {!!} ⟩
|
||||
ya ℂ.<<< fst f ∎
|
||||
helper : PathP (λ i → ℂ.Arrow (p i) A) xa ya
|
||||
helper = {!snd f!}
|
||||
in iso , ? , {!!}})
|
||||
, record
|
||||
{ fst = funExt (λ x → lemSig
|
||||
(λ x → propSig prop0 (λ _ → prop1))
|
||||
_ _
|
||||
(Σ≡ {!!} (ℂ.propIsomorphism _ _ _)))
|
||||
(Σ≡ {!ℂ!} (ℂ.propIsomorphism _ _ _)))
|
||||
; snd = funExt (λ{ (f , _) → lemSig propIsomorphism _ _ {!refl!}})
|
||||
}
|
||||
where
|
||||
|
|
Loading…
Reference in a new issue