Proof of Nuprl Lemma : unique-poset-functor

Step * 1 of Lemma unique-poset-functor

1. C : SmallCategory@i'
2. I : Cname List@i
3. L : name-morph(I;[]) ⟶ cat-ob(C)@i

4. E : i:nameset(I) ⟶ c:{c:name-morph(I;[])| (c i) = 0 ∈ ℕ2}  ⟶ (cat-arrow(C) (L c) (L flip(c;i)))@i

5. edge-arrows-commute(C;I;L;E)@i
⊢ ∃!F:Functor(poset-cat(I);C). poset-functor-extends(C;I;L;E;F)
BY
{ Assert ⌜<L, λc1,c2,p. poset_functor_extend(C;I;L;E;c1;c2)> ∈ Functor(poset-cat(I);C)⌝⋅ }

1
.....assertion.....
1. C : SmallCategory@i'
2. I : Cname List@i
3. L : name-morph(I;[]) ⟶ cat-ob(C)@i

4. E : i:nameset(I) ⟶ c:{c:name-morph(I;[])| (c i) = 0 ∈ ℕ2}  ⟶ (cat-arrow(C) (L c) (L flip(c;i)))@i

5. edge-arrows-commute(C;I;L;E)@i
⊢ <L, λc1,c2,p. poset_functor_extend(C;I;L;E;c1;c2)> ∈ Functor(poset-cat(I);C)

2
1. C : SmallCategory@i'
2. I : Cname List@i
3. L : name-morph(I;[]) ⟶ cat-ob(C)@i

4. E : i:nameset(I) ⟶ c:{c:name-morph(I;[])| (c i) = 0 ∈ ℕ2}  ⟶ (cat-arrow(C) (L c) (L flip(c;i)))@i

5. edge-arrows-commute(C;I;L;E)@i
6. <L, λc1,c2,p. poset_functor_extend(C;I;L;E;c1;c2)> ∈ Functor(poset-cat(I);C)
⊢ ∃!F:Functor(poset-cat(I);C). poset-functor-extends(C;I;L;E;F)

Latex:

Latex:
1. C : SmallCategory@i' 2. I : Cname List@i 3. L : name-morph(I;[]) {}\mrightarrow{} cat-ob(C)@i 4. E : i:nameset(I) {}\mrightarrow{} c:\{c:name-morph(I;[])| (c i) = 0\} {}\mrightarrow{} (cat-arrow(C) (L c) (L flip(c;i)))@i 5. edge-arrows-commute(C;I;L;E)@i \mvdash{} \mexists{}!F:Functor(poset-cat(I);C). poset-functor-extends(C;I;L;E;F) By Latex: Assert \mkleeneopen{}<L, \mlambda{}c1,c2,p. poset\_functor\_extend(C;I;L;E;c1;c2)> \mmember{} Functor(poset-cat(I);C)\mkleeneclose{}\mcdot{} Home Index