Proof of Nuprl Lemma : yoneda-lemma

Step * 2 1 of Lemma yoneda-lemma

1. C : SmallCategory@i'
2. x : cat-ob(C)@i
3. y : cat-ob(C)@i
4. b : cat-arrow(FUN(op-cat(C);TypeCat)) (yoneda-embedding(C) x) (yoneda-embedding(C) y)@i'
⊢ (yoneda-embedding(C) x y (b x (cat-id(C) x)))
= b
∈ (cat-arrow(FUN(op-cat(C);TypeCat)) (yoneda-embedding(C) x) (yoneda-embedding(C) y))
BY
{ (Symmetry THEN All (RepUR ``functor-cat``) THEN (BLemma `nat-trans-equal` THENW Auto)) }

1
1. C : SmallCategory@i'
2. x : cat-ob(C)@i
3. y : cat-ob(C)@i
4. b : nat-trans(op-cat(C);TypeCat;yoneda-embedding(C) x;yoneda-embedding(C) y)@i'
⊢ b
= (yoneda-embedding(C) x y (b x (cat-id(C) x)))
∈ (A:cat-ob(op-cat(C)) ⟶ (cat-arrow(TypeCat) (yoneda-embedding(C) x A) (yoneda-embedding(C) y A)))

Latex:

Latex:
1. C : SmallCategory@i' 2. x : cat-ob(C)@i 3. y : cat-ob(C)@i 4. b : cat-arrow(FUN(op-cat(C);TypeCat)) (yoneda-embedding(C) x) (yoneda-embedding(C) y)@i' \mvdash{} (yoneda-embedding(C) x y (b x (cat-id(C) x))) = b By Latex: (Symmetry THEN All (RepUR ``functor-cat``) THEN (BLemma `nat-trans-equal` THENW Auto)) Home Index