Proof of Nuprl Lemma : functor-curry-iso

Step * 1 1 1 1 of Lemma functor-curry-iso

1. A : SmallCategory@i'
2. B : SmallCategory@i'
3. C : SmallCategory@i'
4. functor-uncurry(C) ∈ Functor(FUN(A;FUN(B;C));FUN(A × B;C))
5. functor-curry(A;B) ∈ Functor(FUN(A × B;C);FUN(A;FUN(B;C)))

6. ∀x:Functor(A × B;C). ((functor-comp(functor-curry(A;B);functor-uncurry(C)) x) = x ∈ Functor(A × B;C))

7. ∀f:Functor(A;FUN(B;C)). ∀a:cat-ob(A).
((functor-comp(functor-uncurry(C);functor-curry(A;B)) f a) = (f a) ∈ cat-ob(FUN(B;C)))
8. x : Functor(A × B;C)@i
9. y : Functor(A × B;C)@i
10. f : nat-trans(A × B;C;x;y)@i
11. A2 : cat-ob(A)
12. A3 : cat-ob(B)

⊢ (functor-comp(functor-curry(A;B);functor-uncurry(C)) x y f <A2, A3>) = (f <A2, A3>) ∈ (cat-arrow(C) (functor-comp(func\000Ctor-curry(A;B);functor-uncurry(C)) x <A2, A3>) (functor-comp(functor-curry(A;B);functor-uncurry(C)) y <A2, A3>))

BY
{ (RepUR ``functor-comp functor-curry functor-uncurry`` 0 THEN Auto) }

Latex:

Latex:
1. A : SmallCategory@i' 2. B : SmallCategory@i' 3. C : SmallCategory@i' 4. functor-uncurry(C) \mmember{} Functor(FUN(A;FUN(B;C));FUN(A \mtimes{} B;C)) 5. functor-curry(A;B) \mmember{} Functor(FUN(A \mtimes{} B;C);FUN(A;FUN(B;C))) 6. \mforall{}x:Functor(A \mtimes{} B;C). ((functor-comp(functor-curry(A;B);functor-uncurry(C)) x) = x) 7. \mforall{}f:Functor(A;FUN(B;C)). \mforall{}a:cat-ob(A). ((functor-comp(functor-uncurry(C);functor-curry(A;B)) f a) = (f a)) 8. x : Functor(A \mtimes{} B;C)@i 9. y : Functor(A \mtimes{} B;C)@i 10. f : nat-trans(A \mtimes{} B;C;x;y)@i 11. A2 : cat-ob(A) 12. A3 : cat-ob(B) \mvdash{} (functor-comp(functor-curry(A;B);functor-uncurry(C)) x y f <A2, A3>) = (f <A2, A3>) By Latex: (RepUR ``functor-comp functor-curry functor-uncurry`` 0 THEN Auto) Home Index