Proof of Nuprl Lemma : functor-curry

Step * 13 7 of Lemma functor-curry_wf

1. A : SmallCategory
2. B : SmallCategory
3. C : SmallCategory
4. F : cat-ob(FUN(A × B;C))
5. a : cat-ob(A)
⊢ b |→ cat-id(C) (F <a, b>)
= identity-trans(B;C;functor(ob(b) = F <a, b>;
arrow(x@0,y,f) = F <a, x@0> <a, y> <cat-id(A) a, f>))
∈ nat-trans(B;C;functor(ob(b) = F <a, b>;

                        arrow(x@0,y,f) = F <a, x@0> <a, y> <cat-id(A) a, f>);functor(ob(b) = F <a, b>;

                                                                   arrow(x@0,y,f) = F <a, x@0> <a, y> <cat-id(A) a, f>))

BY
{ NatTransEq THEN Reduce 0 }

1
1. A : SmallCategory
2. B : SmallCategory
3. C : SmallCategory
4. F : cat-ob(FUN(A × B;C))
5. a : cat-ob(A)
6. b : cat-ob(B)
⊢ (cat-id(C) (F <a, b>)) = (cat-id(C) (F <a, b>)) ∈ (cat-arrow(C) (F <a, b>) (F <a, b>))

2
1. A : SmallCategory
2. B : SmallCategory
3. C : SmallCategory
4. F : cat-ob(FUN(A × B;C))
5. a : cat-ob(A)
6. A@0 : cat-ob(B)
7. B@0 : cat-ob(B)
8. g : cat-arrow(B) A@0 B@0

⊢ (cat-comp(C) (F <a, A@0>) (F <a, A@0>) (F <a, B@0>) (cat-id(C) (F <a, A@0>)) (F <a, A@0> <a, B@0> <cat-id(A) a, g>))

= (cat-comp(C) (F <a, A@0>) (F <a, B@0>) (F <a, B@0>) (F <a, A@0> <a, B@0> <cat-id(A) a, g>) (cat-id(C) (F <a, B@0>)))

∈ (cat-arrow(C) (F <a, A@0>) (F <a, B@0>))

Latex:

Latex:
1. A : SmallCategory 2. B : SmallCategory 3. C : SmallCategory 4. F : cat-ob(FUN(A \mtimes{} B;C)) 5. a : cat-ob(A) \mvdash{} b |\mrightarrow{} cat-id(C) (F <a, b>) = identity-trans(B;C;functor(ob(b) = F <a, b> arrow(x@0,y,f) = F <a, x@0> <a, y> <cat-id(A) a, f>)) By Latex: NatTransEq THEN Reduce 0 Home Index