Proof of Nuprl Lemma : yoneda-embedding

Step * 3 1 of Lemma yoneda-embedding_wf

.....subterm..... T:t
1:n
1. C : SmallCategory
2. X : cat-ob(C)
3. Y : cat-ob(C)
4. z : cat-ob(C)
5. f : cat-arrow(C) X Y
6. g : cat-arrow(C) Y z
7. A : cat-ob(op-cat(C))
⊢ (λg@0.(cat-comp(C) A X z g@0 (cat-comp(C) X Y z f g)))
= (cat-comp(TypeCat) (ob(rep-pre-sheaf(C;X)) A) (ob(rep-pre-sheaf(C;Y)) A) (ob(rep-pre-sheaf(C;z)) A)
(λg.(cat-comp(C) A X Y g f))
(λg@0.(cat-comp(C) A Y z g@0 g)))
∈ (cat-arrow(TypeCat) (ob(rep-pre-sheaf(C;X)) A) (ob(rep-pre-sheaf(C;z)) A))
BY

{ (RepUR ``type-cat rep-pre-sheaf functor-ob`` 0 THEN (FunExt THENA Auto) THEN RW CatNormC 0 THEN Auto) }

Latex:

Latex:
.....subterm..... T:t 1:n 1. C : SmallCategory 2. X : cat-ob(C) 3. Y : cat-ob(C) 4. z : cat-ob(C) 5. f : cat-arrow(C) X Y 6. g : cat-arrow(C) Y z 7. A : cat-ob(op-cat(C)) \mvdash{} (\mlambda{}g@0.(cat-comp(C) A X z g@0 (cat-comp(C) X Y z f g))) = (cat-comp(TypeCat) (ob(rep-pre-sheaf(C;X)) A) (ob(rep-pre-sheaf(C;Y)) A) (ob(rep-pre-sheaf(C;z)) A) (\mlambda{}g.(cat-comp(C) A X Y g f)) (\mlambda{}g@0.(cat-comp(C) A Y z g@0 g))) By Latex: (RepUR ``type-cat rep-pre-sheaf functor-ob`` 0 THEN (FunExt THENA Auto) THEN RW CatNormC 0 THEN Auto) Home Index