Proof of Nuprl Lemma : functor-is-isomorphism

Step * 1 1 of Lemma functor-is-isomorphism

1. [A] : SmallCategory
2. [B] : SmallCategory
3. f : Functor(A;B)
4. g : Functor(B;A)
5. functor-comp(f;g) = 1 ∈ Functor(A;A)
6. functor-comp(g;f) = 1 ∈ Functor(B;B)
7. ∀a:cat-ob(A). ((ob(g) (ob(f) a)) = a ∈ cat-ob(A))
8. ∀b:cat-ob(B). ((ob(f) (ob(g) b)) = b ∈ cat-ob(B))
⊢ Bij(cat-ob(A);cat-ob(B);ob(f))
∧ (∀x,y:cat-ob(A). Bij(cat-arrow(A) x y;cat-arrow(B) (ob(f) x) (ob(f) y);arrow(f) x y))
BY
{ D 0 }

1
1. [A] : SmallCategory
2. [B] : SmallCategory
3. f : Functor(A;B)
4. g : Functor(B;A)
5. functor-comp(f;g) = 1 ∈ Functor(A;A)
6. functor-comp(g;f) = 1 ∈ Functor(B;B)
7. ∀a:cat-ob(A). ((ob(g) (ob(f) a)) = a ∈ cat-ob(A))
8. ∀b:cat-ob(B). ((ob(f) (ob(g) b)) = b ∈ cat-ob(B))
⊢ Bij(cat-ob(A);cat-ob(B);ob(f))

2
1. [A] : SmallCategory
2. [B] : SmallCategory
3. f : Functor(A;B)
4. g : Functor(B;A)
5. functor-comp(f;g) = 1 ∈ Functor(A;A)
6. functor-comp(g;f) = 1 ∈ Functor(B;B)
7. ∀a:cat-ob(A). ((ob(g) (ob(f) a)) = a ∈ cat-ob(A))
8. ∀b:cat-ob(B). ((ob(f) (ob(g) b)) = b ∈ cat-ob(B))
⊢ ∀x,y:cat-ob(A). Bij(cat-arrow(A) x y;cat-arrow(B) (ob(f) x) (ob(f) y);arrow(f) x y)

Latex:

Latex:
1. [A] : SmallCategory 2. [B] : SmallCategory 3. f : Functor(A;B) 4. g : Functor(B;A) 5. functor-comp(f;g) = 1 6. functor-comp(g;f) = 1 7. \mforall{}a:cat-ob(A). ((ob(g) (ob(f) a)) = a) 8. \mforall{}b:cat-ob(B). ((ob(f) (ob(g) b)) = b) \mvdash{} Bij(cat-ob(A);cat-ob(B);ob(f)) \mwedge{} (\mforall{}x,y:cat-ob(A). Bij(cat-arrow(A) x y;cat-arrow(B) (ob(f) x) (ob(f) y);arrow(f) x y)) By Latex: D 0 Home Index