Modified verion of 9.1.9
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@ -337,6 +337,8 @@ module _ {ℓa ℓb : Level} (ℂ : RawCategory ℓa ℓb) where
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private
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q* : Arrow b b'
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q* = fst (idToIso b b' q)
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p* : Arrow a a'
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p* = fst (idToIso _ _ p)
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p~ : Arrow a' a
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p~ = fst (snd (idToIso _ _ p))
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pq : Arrow a b ≡ Arrow a' b'
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@ -365,6 +367,17 @@ module _ {ℓa ℓb : Level} (ℂ : RawCategory ℓa ℓb) where
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9-1-9 : coe pq f ≡ q* <<< f <<< p~
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9-1-9 = pathJ D d a' p
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9-1-9' : coe pq f <<< p* ≡ q* <<< f
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9-1-9' = begin
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coe pq f <<< p* ≡⟨ cong (_<<< p*) 9-1-9 ⟩
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q* <<< f <<< p~ <<< p* ≡⟨ sym isAssociative ⟩
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q* <<< f <<< (p~ <<< p*) ≡⟨ cong (λ φ → q* <<< f <<< φ) lem ⟩
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q* <<< f <<< identity ≡⟨ rightIdentity ⟩
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q* <<< f ∎
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where
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lem : p~ <<< p* ≡ identity
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lem = fst (snd (snd (idToIso _ _ p)))
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-- | All projections are propositions.
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module Propositionality where
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-- | Terminal objects are propositional - a.k.a uniqueness of terminal
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@ -250,11 +250,10 @@ module Try0 {ℓa ℓb : Level} {ℂ : Category ℓa ℓb}
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≈ ((X , xa , xb) ≅ (Y , ya , yb))
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step2
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= ( λ{ ((f , f~ , inv-f) , p , q)
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→ ( f , (let r = fromPathP p in {!r!}) , {!!})
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, ( (f~ , {!!} , {!!})
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→ ( f , {!ℂ.9-1-9'!} , {!!})
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, ( f~ , {!!} , {!!})
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, lemA (fst inv-f)
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, lemA (snd inv-f)
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)
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}
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)
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, (λ{ (f , f~ , inv-f , inv-f~) →
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