Proof of Nuprl Lemma : functor-uncurry

Step * 2 of Lemma functor-uncurry_wf

1. A : SmallCategory
2. B : SmallCategory
3. C : SmallCategory
4. f : Functor(A;FUN(B;C))
5. g : Functor(A;FUN(B;C))
6. z : Functor(A;FUN(B;C))
7. T : nat-trans(A;FUN(B;C);f;g)
8. g1 : nat-trans(A;FUN(B;C);g;z)
9. A1 : cat-ob(A)
10. A2 : cat-ob(B)
11. B1 : cat-ob(A)
12. B2 : cat-ob(B)
13. g3 : cat-arrow(A) A1 B1
14. g4 : cat-arrow(B) A2 B2
⊢ (cat-comp(C) (f A1 A2) (z A1 B2) (z B1 B2)

   (cat-comp(C) (f A1 A2) (g A1 B2) (z A1 B2) (cat-comp(C) (f A1 A2) (f A1 B2) (g A1 B2) (f A1 A2 B2 g4) (T A1 B2))

    (g1 A1 B2))
   (z A1 B1 g3 B2))
= (cat-comp(C) (f A1 A2) (g B1 B2) (z B1 B2)
   (cat-comp(C) (f A1 A2) (f B1 B2) (g B1 B2)
    (cat-comp(C) (f A1 A2) (f A1 B2) (f B1 B2) (f A1 A2 B2 g4) (f A1 B1 g3 B2))
    (T B1 B2))
   (g1 B1 B2))
∈ (cat-arrow(C) (f A1 A2) (z B1 B2))
BY
{ (RenameVar `a1' 9
   THEN RenameVar `a2' 11
   THEN RenameVar `b1' 10
   THEN RenameVar `b2' 12
   THEN RenameVar `xa' (-2)
   THEN RenameVar `xb' (-1)) }

1
1. A : SmallCategory
2. B : SmallCategory
3. C : SmallCategory
4. f : Functor(A;FUN(B;C))
5. g : Functor(A;FUN(B;C))
6. z : Functor(A;FUN(B;C))
7. T : nat-trans(A;FUN(B;C);f;g)
8. g1 : nat-trans(A;FUN(B;C);g;z)
9. a1 : cat-ob(A)
10. b1 : cat-ob(B)
11. a2 : cat-ob(A)
12. b2 : cat-ob(B)
13. xa : cat-arrow(A) a1 a2
14. xb : cat-arrow(B) b1 b2
⊢ (cat-comp(C) (f a1 b1) (z a1 b2) (z a2 b2)

   (cat-comp(C) (f a1 b1) (g a1 b2) (z a1 b2) (cat-comp(C) (f a1 b1) (f a1 b2) (g a1 b2) (f a1 b1 b2 xb) (T a1 b2))

    (g1 a1 b2))
   (z a1 a2 xa b2))
= (cat-comp(C) (f a1 b1) (g a2 b2) (z a2 b2)
   (cat-comp(C) (f a1 b1) (f a2 b2) (g a2 b2)
    (cat-comp(C) (f a1 b1) (f a1 b2) (f a2 b2) (f a1 b1 b2 xb) (f a1 a2 xa b2))
    (T a2 b2))
   (g1 a2 b2))
∈ (cat-arrow(C) (f a1 b1) (z a2 b2))

Latex:

Latex:
1. A : SmallCategory 2. B : SmallCategory 3. C : SmallCategory 4. f : Functor(A;FUN(B;C)) 5. g : Functor(A;FUN(B;C)) 6. z : Functor(A;FUN(B;C)) 7. T : nat-trans(A;FUN(B;C);f;g) 8. g1 : nat-trans(A;FUN(B;C);g;z) 9. A1 : cat-ob(A) 10. A2 : cat-ob(B) 11. B1 : cat-ob(A) 12. B2 : cat-ob(B) 13. g3 : cat-arrow(A) A1 B1 14. g4 : cat-arrow(B) A2 B2 \mvdash{} (cat-comp(C) (f A1 A2) (z A1 B2) (z B1 B2) (cat-comp(C) (f A1 A2) (g A1 B2) (z A1 B2) (cat-comp(C) (f A1 A2) (f A1 B2) (g A1 B2) (f A1 A2 B2 g4) (T A1 B2)) (g1 A1 B2)) (z A1 B1 g3 B2)) = (cat-comp(C) (f A1 A2) (g B1 B2) (z B1 B2) (cat-comp(C) (f A1 A2) (f B1 B2) (g B1 B2) (cat-comp(C) (f A1 A2) (f A1 B2) (f B1 B2) (f A1 A2 B2 g4) (f A1 B1 g3 B2)) (T B1 B2)) (g1 B1 B2)) By Latex: (RenameVar `a1' 9 THEN RenameVar `a2' 11 THEN RenameVar `b1' 10 THEN RenameVar `b2' 12 THEN RenameVar `xa' (-2) THEN RenameVar `xb' (-1)) Home Index