Mark questions

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Frederik Hanghøj Iversen 2017-06-07 22:24:35 +02:00
parent 38fd690839
commit 0f114b1029

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@ -3,7 +3,6 @@ module Cat where
open import Agda.Primitive
open import Prelude.Function
-- import Prelude.Equality
open import PathPrelude
open ≡-Reasoning
@ -52,19 +51,13 @@ data Maybe ( A : Set ) : Set where
nothing : Maybe A
just : A -> Maybe A
-- postulate
-- fun-ext : ∀ {a b} {A : Set a} {B : A → Set b} → {f g : (x : A) → B x}
-- → (∀ x → (f x) ≡ (g x)) → f ≡ g
-- fun-ext p = λ i → \ x → p x i
instance
MaybeFunctor : Functor Maybe
Functor.fmap MaybeFunctor f nothing = nothing
Functor.fmap MaybeFunctor f (just x) = just (f x)
-- how the heck can I use `fun-ext` which produces `Path id (fmap id)` wheras the type of the whole is `id ≡ fmap id`.
Functor.identity MaybeFunctor = fun-ext (λ { nothing refl ; (just x) refl })
Functor.fusion MaybeFunctor f g = fun-ext (λ
-- Why does inlining `lem₀` give rise to an error?
-- QUESTION: Why does inlining `lem₀` give rise to an error?
{ nothing lem₀
; (just x) {! refl!}
{- ; (just x) → begin
@ -118,7 +111,7 @@ instance
Applicative.homomorphism IdentityApplicative = refl
Applicative.interchange IdentityApplicative _ _ = refl
-- Is this provable? How?
-- QUESTION: Is this provable? How?
-- I suppose this would be `≡`'s functor-instance.
equiv-app : {A B : Set} -> {f g : A -> B} -> {a : A} -> f g -> f a g a
equiv-app f≡g = {!!}
@ -128,7 +121,7 @@ instance
Applicative.pure MaybeApplicative = just
Applicative.ap MaybeApplicative nothing _ = nothing
Applicative.ap MaybeApplicative (just f) x = fmap f x
-- Why does termination-check fail when I use `refl` in both cases below?
-- QUESTION: Why does termination-check fail when I use `refl` in both cases below?
Applicative.ap-identity MaybeApplicative = fun-ext (λ
{ nothing {!refl!}
; (just x) {!refl!}
@ -139,6 +132,7 @@ instance
-- Applicative.composition MaybeApplicative {u = just f} {just g} {nothing} = refl
-- Applicative.composition MaybeApplicative {u = just f} {just g} {just x} = refl
-- Re-use mode:
-- QUESTION: What's wrong here?
Applicative.composition MaybeApplicative (just f) (just g) w = sym (equiv-app lem)
where
lem : {A B C} {f : B C} {g : A B} {w : Maybe A}