Proof of Nuprl Lemma : presheaf-element-map

Step * 2 1 1 of Lemma presheaf-element-map_wf

.....set predicate.....
1. C : SmallCategory
2. A : Presheaf(C)
3. B : Presheaf(C)
4. m : A ⟶ B
5. A@0 : cat-ob(op-cat(C))
6. x1 : A A@0
7. A1 : cat-ob(op-cat(C))
8. y1 : A A1
9. x : cat-arrow(op-cat(C)) A1 A@0
10. (A A1 A@0 x y1) = x1 ∈ (A A@0)
⊢ (B A1 A@0 x (m A1 y1)) = (m A@0 x1) ∈ (B A@0)
BY
{ (D 4 THEN RepUR ``type-cat`` 5) }

1
1. C : SmallCategory
2. A : Presheaf(C)
3. B : Presheaf(C)
4. m : A@0:cat-ob(op-cat(C)) ⟶ (cat-arrow(TypeCat) (A A@0) (B A@0))
5. ∀A@0,B@0:cat-ob(op-cat(C)). ∀g:cat-arrow(op-cat(C)) A@0 B@0.
(((B A@0 B@0 g) o (m A@0)) = ((m B@0) o (A A@0 B@0 g)) ∈ ((A A@0) ⟶ (B B@0)))
6. A@0 : cat-ob(op-cat(C))
7. x1 : A A@0
8. A1 : cat-ob(op-cat(C))
9. y1 : A A1
10. x : cat-arrow(op-cat(C)) A1 A@0
11. (A A1 A@0 x y1) = x1 ∈ (A A@0)
⊢ (B A1 A@0 x (m A1 y1)) = (m A@0 x1) ∈ (B A@0)

Latex:

Latex:
.....set predicate..... 1. C : SmallCategory 2. A : Presheaf(C) 3. B : Presheaf(C) 4. m : A {}\mrightarrow{} B 5. A@0 : cat-ob(op-cat(C)) 6. x1 : A A@0 7. A1 : cat-ob(op-cat(C)) 8. y1 : A A1 9. x : cat-arrow(op-cat(C)) A1 A@0 10. (A A1 A@0 x y1) = x1 \mvdash{} (B A1 A@0 x (m A1 y1)) = (m A@0 x1) By Latex: (D 4 THEN RepUR ``type-cat`` 5) Home Index