Proof of Nuprl Lemma : nerve_box_edge

Step * 1 2 2 of Lemma nerve_box_edge_same1

1. C : SmallCategory
2. I : Cname List
3. J : nameset(I) List
4. x : nameset(I)
5. i : ℕ2
6. box : open_box(cubical-nerve(C);I;J;x;i)
7. ∀[L:name-morph(I;[])]
     ∀f:I-face(cubical-nerve(C);I)
       ((cube(f) L) = nerve_box_label(box;L) ∈ cat-ob(C)) supposing
          ((f ∈ box) and
          (direction(f) = (L dimension(f)) ∈ ℕ2))
     supposing ((L x) = i ∈ ℕ2) ∨ (¬↑null(J))
8. y : nameset(I)
9. c : {c:name-morph(I;[])| (c y) = 0 ∈ ℕ2}
10. (∃j∈J. ¬(j = y ∈ Cname)) ∨ (((c x) = i ∈ ℕ2) ∧ (¬↑null(J)))
11. f : I-face(cubical-nerve(C);I)
12. (f ∈ box)
13. direction(f) = (c dimension(f)) ∈ ℕ2
14. direction(f) = (flip(c;y) dimension(f)) ∈ ℕ2
15. g : I-face(cubical-nerve(C);I)

16. (g ∈ box) ∧ (direction(g) = (c dimension(g)) ∈ ℕ2) ∧ (direction(g) = (flip(c;y) dimension(g)) ∈ ℕ2)

17. nerve-box-common-face(box;c;y)
= g
∈ {f:I-face(cubical-nerve(C);I)|

   (f ∈ box) ∧ (direction(f) = (c dimension(f)) ∈ ℕ2) ∧ (direction(f) = (flip(c;y) dimension(f)) ∈ ℕ2)}

18. ¬↑null(J)
19. (cube(g) c) = nerve_box_label(box;c) ∈ cat-ob(C)
20. (cube(g) flip(c;y)) = nerve_box_label(box;flip(c;y)) ∈ cat-ob(C)
21. ¬(dimension(g) = dimension(f) ∈ Cname)
22. face-compatible(cubical-nerve(C);I;f;g)

⊢ (cube(f) c flip(c;y) (λx.Ax)) = (cube(g) c flip(c;y) (λx.Ax)) ∈ (cat-arrow(C) (cube(g) c) (cube(g) flip(c;y)))

BY
{ (SplitAndHyps
   THEN (DVar `f' THEN DVar  `f1')
   THEN (DVar `g' THEN DVar  `g1')
   THEN RepUR ``face-compatible`` -1
   THEN All (RepUR ``face-cube face-direction face-dimension``)) }

1
1. C : SmallCategory
2. I : Cname List
3. J : nameset(I) List
4. x : nameset(I)
5. i : ℕ2
6. box : open_box(cubical-nerve(C);I;J;x;i)
7. ∀[L:name-morph(I;[])]
     ∀f:I-face(cubical-nerve(C);I)
       ((snd(snd(f)) L) = nerve_box_label(box;L) ∈ cat-ob(C)) supposing
          ((f ∈ box) and
          ((fst(snd(f))) = (L (fst(f))) ∈ ℕ2))
     supposing ((L x) = i ∈ ℕ2) ∨ (¬↑null(J))
8. y : nameset(I)
9. c : {c:name-morph(I;[])| (c y) = 0 ∈ ℕ2}
10. (∃j∈J. ¬(j = y ∈ Cname)) ∨ (((c x) = i ∈ ℕ2) ∧ (¬↑null(J)))
11. x1 : nameset(I)
12. f2 : ℕ2
13. f3 : cubical-nerve(C)(I-[x1])
14. (<x1, f2, f3> ∈ box)
15. f2 = (c x1) ∈ ℕ2
16. f2 = (flip(c;y) x1) ∈ ℕ2
17. x2 : nameset(I)
18. g2 : ℕ2
19. g3 : cubical-nerve(C)(I-[x2])
20. (<x2, g2, g3> ∈ box)
21. g2 = (c x2) ∈ ℕ2
22. g2 = (flip(c;y) x2) ∈ ℕ2
23. nerve-box-common-face(box;c;y)
= <x2, g2, g3>
∈ {f:I-face(cubical-nerve(C);I)|

   (f ∈ box) ∧ ((fst(snd(f))) = (c (fst(f))) ∈ ℕ2) ∧ ((fst(snd(f))) = (flip(c;y) (fst(f))) ∈ ℕ2)}

24. ¬↑null(J)
25. (g3 c) = nerve_box_label(box;c) ∈ cat-ob(C)
26. (g3 flip(c;y)) = nerve_box_label(box;flip(c;y)) ∈ cat-ob(C)
27. ¬(x2 = x1 ∈ Cname)
28. (¬(x1 = x2 ∈ Cname)) ⇒ ((x2:=g2)(f3) = (x1:=f2)(g3) ∈ cubical-nerve(C)(I-[x1; x2]))
⊢ (f3 c flip(c;y) (λx.Ax)) = (g3 c flip(c;y) (λx.Ax)) ∈ (cat-arrow(C) (g3 c) (g3 flip(c;y)))

Latex:

Latex:
1. C : SmallCategory 2. I : Cname List 3. J : nameset(I) List 4. x : nameset(I) 5. i : \mBbbN{}2 6. box : open\_box(cubical-nerve(C);I;J;x;i) 7. \mforall{}[L:name-morph(I;[])] \mforall{}f:I-face(cubical-nerve(C);I) ((cube(f) L) = nerve\_box\_label(box;L)) supposing ((f \mmember{} box) and (direction(f) = (L dimension(f)))) supposing ((L x) = i) \mvee{} (\mneg{}\muparrow{}null(J)) 8. y : nameset(I) 9. c : \{c:name-morph(I;[])| (c y) = 0\} 10. (\mexists{}j\mmember{}J. \mneg{}(j = y)) \mvee{} (((c x) = i) \mwedge{} (\mneg{}\muparrow{}null(J))) 11. f : I-face(cubical-nerve(C);I) 12. (f \mmember{} box) 13. direction(f) = (c dimension(f)) 14. direction(f) = (flip(c;y) dimension(f)) 15. g : I-face(cubical-nerve(C);I) 16. (g \mmember{} box) \mwedge{} (direction(g) = (c dimension(g))) \mwedge{} (direction(g) = (flip(c;y) dimension(g))) 17. nerve-box-common-face(box;c;y) = g 18. \mneg{}\muparrow{}null(J) 19. (cube(g) c) = nerve\_box\_label(box;c) 20. (cube(g) flip(c;y)) = nerve\_box\_label(box;flip(c;y)) 21. \mneg{}(dimension(g) = dimension(f)) 22. face-compatible(cubical-nerve(C);I;f;g) \mvdash{} (cube(f) c flip(c;y) (\mlambda{}x.Ax)) = (cube(g) c flip(c;y) (\mlambda{}x.Ax)) By Latex: (SplitAndHyps THEN (DVar `f' THEN DVar `f1') THEN (DVar `g' THEN DVar `g1') THEN RepUR ``face-compatible`` -1 THEN All (RepUR ``face-cube face-direction face-dimension``)) Home Index