Proof of Nuprl Lemma : groupoid-edges-commute

Step * 2 2 1 1 1 of Lemma groupoid-edges-commute

1. G : Groupoid
2. I : Cname List
3. J : nameset(I) List
4. x : nameset(I)
5. i : ℕ2
6. box : open_box(cubical-nerve(fst(G));I;J;x;i)
7. (∃j1∈J. (∃j2∈J. ¬(j1 = j2 ∈ Cname)))
8. f : name-morph(I;[])
9. a : nameset(I)
10. (f a) = 0 ∈ ℕ2
11. b : nameset(I)
12. (f b) = 0 ∈ ℕ2
13. ¬(a = b ∈ nameset(I))

14. ¬(∃v∈box. (¬(dimension(v) = b ∈ Cname)) ∧ (¬(dimension(v) = a ∈ Cname)) ∧ (direction(v) = (f dimension(v)) ∈ ℕ2))

15. (∀j∈J.(j = a ∈ Cname) ∨ (j = b ∈ Cname))
16. (a ∈ J) ∧ (b ∈ J) ∧ (¬(x = a ∈ Cname)) ∧ (¬(x = b ∈ Cname))
17. ¬((f x) = i ∈ ℕ2)
18. eq-cname(a;b) ~ ff
19. eq-cname(b;a) ~ eq-cname(a;b)
⊢ (cat-comp(fst(G)) nerve_box_label(box;f) nerve_box_label(box;flip(f;a)) nerve_box_label(box;flip(flip(f;a);b))
   nerve_box_edge(box;f;a)
   nerve_box_edge(box;flip(f;a);b))
= (cat-comp(fst(G)) nerve_box_label(box;f) nerve_box_label(box;flip(f;b)) nerve_box_label(box;flip(flip(f;b);a))
   nerve_box_edge(box;f;b)
   nerve_box_edge(box;flip(f;b);a))
∈ (cat-arrow(fst(G)) nerve_box_label(box;f) nerve_box_label(box;flip(flip(f;a);b)))
BY
{ (Assert (((flip(f;x) a) = 0 ∈ ℕ2) ∧ ((flip(f;b) a) = 0 ∈ ℕ2))
         ∧ (((flip(f;x) b) = 0 ∈ ℕ2) ∧ ((flip(f;a) b) = 0 ∈ ℕ2))
         ∧ ((flip(flip(f;x);b) a) = 0 ∈ ℕ2)
         ∧ ((flip(flip(f;x);a) b) = 0 ∈ ℕ2) BY
         (SplitAndConcl
          THEN RepUR ``name-morph-flip`` 0
          THEN Try (HypSubst' -1 0)
          THEN Try (HypSubst' -2 0)
          THEN Reduce 0
          THEN (Trivial ORELSE AutoSplit))) }

1
1. G : Groupoid
2. I : Cname List
3. J : nameset(I) List
4. x : nameset(I)
5. i : ℕ2
6. box : open_box(cubical-nerve(fst(G));I;J;x;i)
7. (∃j1∈J. (∃j2∈J. ¬(j1 = j2 ∈ Cname)))
8. f : name-morph(I;[])
9. a : nameset(I)
10. (f a) = 0 ∈ ℕ2
11. b : nameset(I)
12. (f b) = 0 ∈ ℕ2
13. ¬(a = b ∈ nameset(I))

14. ¬(∃v∈box. (¬(dimension(v) = b ∈ Cname)) ∧ (¬(dimension(v) = a ∈ Cname)) ∧ (direction(v) = (f dimension(v)) ∈ ℕ2))

15. (∀j∈J.(j = a ∈ Cname) ∨ (j = b ∈ Cname))
16. (a ∈ J) ∧ (b ∈ J) ∧ (¬(x = a ∈ Cname)) ∧ (¬(x = b ∈ Cname))
17. ¬((f x) = i ∈ ℕ2)
18. eq-cname(a;b) ~ ff
19. eq-cname(b;a) ~ eq-cname(a;b)
20. (((flip(f;x) a) = 0 ∈ ℕ2) ∧ ((flip(f;b) a) = 0 ∈ ℕ2))
∧ (((flip(f;x) b) = 0 ∈ ℕ2) ∧ ((flip(f;a) b) = 0 ∈ ℕ2))
∧ ((flip(flip(f;x);b) a) = 0 ∈ ℕ2)
∧ ((flip(flip(f;x);a) b) = 0 ∈ ℕ2)
⊢ (cat-comp(fst(G)) nerve_box_label(box;f) nerve_box_label(box;flip(f;a)) nerve_box_label(box;flip(flip(f;a);b))
   nerve_box_edge(box;f;a)
   nerve_box_edge(box;flip(f;a);b))
= (cat-comp(fst(G)) nerve_box_label(box;f) nerve_box_label(box;flip(f;b)) nerve_box_label(box;flip(flip(f;b);a))
   nerve_box_edge(box;f;b)
   nerve_box_edge(box;flip(f;b);a))
∈ (cat-arrow(fst(G)) nerve_box_label(box;f) nerve_box_label(box;flip(flip(f;a);b)))

Latex:

Latex:
1. G : Groupoid 2. I : Cname List 3. J : nameset(I) List 4. x : nameset(I) 5. i : \mBbbN{}2 6. box : open\_box(cubical-nerve(fst(G));I;J;x;i) 7. (\mexists{}j1\mmember{}J. (\mexists{}j2\mmember{}J. \mneg{}(j1 = j2))) 8. f : name-morph(I;[]) 9. a : nameset(I) 10. (f a) = 0 11. b : nameset(I) 12. (f b) = 0 13. \mneg{}(a = b) 14. \mneg{}(\mexists{}v\mmember{}box. (\mneg{}(dimension(v) = b)) \mwedge{} (\mneg{}(dimension(v) = a)) \mwedge{} (direction(v) = (f dimension(v)))) 15. (\mforall{}j\mmember{}J.(j = a) \mvee{} (j = b)) 16. (a \mmember{} J) \mwedge{} (b \mmember{} J) \mwedge{} (\mneg{}(x = a)) \mwedge{} (\mneg{}(x = b)) 17. \mneg{}((f x) = i) 18. eq-cname(a;b) \msim{} ff 19. eq-cname(b;a) \msim{} eq-cname(a;b) \mvdash{} (cat-comp(fst(G)) nerve\_box\_label(box;f) nerve\_box\_label(box;flip(f;a)) nerve\_box\_label(box;flip(flip(f;a);b)) nerve\_box\_edge(box;f;a) nerve\_box\_edge(box;flip(f;a);b)) = (cat-comp(fst(G)) nerve\_box\_label(box;f) nerve\_box\_label(box;flip(f;b)) nerve\_box\_label(box;flip(flip(f;b);a)) nerve\_box\_edge(box;f;b) nerve\_box\_edge(box;flip(f;b);a)) By Latex: (Assert (((flip(f;x) a) = 0) \mwedge{} ((flip(f;b) a) = 0)) \mwedge{} (((flip(f;x) b) = 0) \mwedge{} ((flip(f;a) b) = 0)) \mwedge{} ((flip(flip(f;x);b) a) = 0) \mwedge{} ((flip(flip(f;x);a) b) = 0) BY (SplitAndConcl THEN RepUR ``name-morph-flip`` 0 THEN Try (HypSubst' -1 0) THEN Try (HypSubst' -2 0) THEN Reduce 0 THEN (Trivial ORELSE AutoSplit))) Home Index