Proof of Nuprl Lemma : functor-curry

Step * 7 of Lemma functor-curry_wf

1. A : SmallCategory
2. B : SmallCategory
3. C : SmallCategory
4. F : cat-ob(FUN(A × B;C))
5. G : cat-ob(FUN(A × B;C))
6. T : cat-arrow(FUN(A × B;C)) F G
7. x : cat-ob(A)
8. y@0 : cat-ob(A)
9. f : cat-arrow(A) x y@0
10. A1 : cat-ob(B)
11. B1 : cat-ob(B)
12. g : cat-arrow(B) A1 B1

⊢ (cat-comp(C) (G <x, A1>) (G <y@0, A1>) (G <y@0, B1>) (G <x, A1> <y@0, A1> <f, cat-id(B) A1>) (G <y@0, A1> <y@0, B1> <c\000Cat-id(A) y@0, g>))

= (cat-comp(C) (G <x, A1>) (G <x, B1>) (G <y@0, B1>) (G <x, A1> <x, B1> <cat-id(A) x, g>) (G <x, B1> <y@0, B1> <f, cat-i\000Cd(B) B1>))

∈ (cat-arrow(C) (G <x, A1>) (G <y@0, B1>))
BY
{ NormCatEq THEN Auto }

Latex:

Latex:
1. A : SmallCategory 2. B : SmallCategory 3. C : SmallCategory 4. F : cat-ob(FUN(A \mtimes{} B;C)) 5. G : cat-ob(FUN(A \mtimes{} B;C)) 6. T : cat-arrow(FUN(A \mtimes{} B;C)) F G 7. x : cat-ob(A) 8. y@0 : cat-ob(A) 9. f : cat-arrow(A) x y@0 10. A1 : cat-ob(B) 11. B1 : cat-ob(B) 12. g : cat-arrow(B) A1 B1 \mvdash{} (cat-comp(C) (G <x, A1>) (G <y@0, A1>) (G <y@0, B1>) (G <x, A1> <y@0, A1> <f, cat-id(B) A1>) (G <y\000C@0, A1> <y@0, B1> <cat-id(A) y@0, g>)) = (cat-comp(C) (G <x, A1>) (G <x, B1>) (G <y@0, B1>) (G <x, A1> <x, B1> <cat-id(A) x, g>) (G <x, B1>\000C <y@0, B1> <f, cat-id(B) B1>)) By Latex: NormCatEq THEN Auto Home Index