Step
*
1
2
1
of Lemma
same-face-edge-arrows-commute0
.....subterm..... T:t
2:n
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. f : name-morph(I;[])
8. a : nameset(I)
9. b : nameset(I)
10. ((∃j1∈J. ¬(j1 = a ∈ Cname)) ∧ (∃j2∈J. ¬(j2 = b ∈ Cname)))
∨ ((¬↑null(J)) ∧ ((f x) = i ∈ ℤ) ∧ ((flip(f;a) x) = i ∈ ℤ) ∧ ((flip(f;b) x) = i ∈ ℕ2))
11. v : I-face(cubical-nerve(C);I)
12. (f a) = 0 ∈ ℕ2
13. direction(v) = (f dimension(v)) ∈ ℕ2
14. (f b) = 0 ∈ ℕ2
15. ¬(a = b ∈ nameset(I))
16. ¬(dimension(v) = a ∈ Cname)
17. ¬(dimension(v) = b ∈ Cname)
18. (v ∈ box)
19. ¬↑null(J)
20. (ob(cube(v)) flip(flip(f;a);b)) = nerve_box_label(box;flip(flip(f;a);b)) ∈ cat-ob(C)
21. (ob(cube(v)) f) = nerve_box_label(box;f) ∈ cat-ob(C)
22. (ob(cube(v)) flip(f;a)) = nerve_box_label(box;flip(f;a)) ∈ cat-ob(C)
23. (ob(cube(v)) flip(f;b)) = nerve_box_label(box;flip(f;b)) ∈ cat-ob(C)
24. (ob(cube(v)) flip(flip(f;b);a)) = nerve_box_label(box;flip(flip(f;b);a)) ∈ cat-ob(C)
25. (cat-comp(C) (ob(cube(v)) f) (ob(cube(v)) flip(f;a)) (ob(cube(v)) flip(flip(f;a);b))
(arrow(cube(v)) f flip(f;a) (λx.Ax))
(arrow(cube(v)) flip(f;a) flip(flip(f;a);b) (λx.Ax)))
= (cat-comp(C) (ob(cube(v)) f) (ob(cube(v)) flip(f;b)) (ob(cube(v)) flip(flip(f;b);a))
(arrow(cube(v)) f flip(f;b) (λx.Ax))
(arrow(cube(v)) flip(f;b) flip(flip(f;b);a) (λx.Ax)))
∈ (cat-arrow(C) (ob(cube(v)) f) (ob(cube(v)) flip(flip(f;a);b)))
⊢ (arrow(cube(v)) f flip(f;a) (λx.Ax))
= nerve_box_edge(box;f;a)
∈ (cat-arrow(C) (ob(cube(v)) f) (ob(cube(v)) flip(f;a)))
BY
{ (SubsumeC ⌜cat-arrow(C) nerve_box_label(box;f) nerve_box_label(box;flip(f;a))⌝⋅
THEN Try ((BLemma `subtype_rel-equal` THEN Auto))
THEN Try ((BLemma `nerve_box_edge_same1` THEN Auto))
THEN Try ((RepUR ``name-morph-flip`` 0 THEN AutoSplit))) }
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. f : name-morph(I;[])
8. a : nameset(I)
9. b : nameset(I)
10. ((∃j1∈J. ¬(j1 = a ∈ Cname)) ∧ (∃j2∈J. ¬(j2 = b ∈ Cname)))
∨ ((¬↑null(J)) ∧ ((f x) = i ∈ ℤ) ∧ ((flip(f;a) x) = i ∈ ℤ) ∧ ((flip(f;b) x) = i ∈ ℕ2))
11. v : I-face(cubical-nerve(C);I)
12. (f a) = 0 ∈ ℕ2
13. direction(v) = (f dimension(v)) ∈ ℕ2
14. (f b) = 0 ∈ ℕ2
15. ¬(a = b ∈ nameset(I))
16. ¬(dimension(v) = a ∈ Cname)
17. ¬(dimension(v) = b ∈ Cname)
18. (v ∈ box)
19. ¬↑null(J)
20. (ob(cube(v)) flip(flip(f;a);b)) = nerve_box_label(box;flip(flip(f;a);b)) ∈ cat-ob(C)
21. (ob(cube(v)) f) = nerve_box_label(box;f) ∈ cat-ob(C)
22. (ob(cube(v)) flip(f;a)) = nerve_box_label(box;flip(f;a)) ∈ cat-ob(C)
23. (ob(cube(v)) flip(f;b)) = nerve_box_label(box;flip(f;b)) ∈ cat-ob(C)
24. (ob(cube(v)) flip(flip(f;b);a)) = nerve_box_label(box;flip(flip(f;b);a)) ∈ cat-ob(C)
25. (cat-comp(C) (ob(cube(v)) f) (ob(cube(v)) flip(f;a)) (ob(cube(v)) flip(flip(f;a);b))
(arrow(cube(v)) f flip(f;a) (λx.Ax))
(arrow(cube(v)) flip(f;a) flip(flip(f;a);b) (λx.Ax)))
= (cat-comp(C) (ob(cube(v)) f) (ob(cube(v)) flip(f;b)) (ob(cube(v)) flip(flip(f;b);a))
(arrow(cube(v)) f flip(f;b) (λx.Ax))
(arrow(cube(v)) flip(f;b) flip(flip(f;b);a) (λx.Ax)))
∈ (cat-arrow(C) (ob(cube(v)) f) (ob(cube(v)) flip(flip(f;a);b)))
⊢ (∃j∈J. ¬(j = a ∈ Cname)) ∨ (((f x) = i ∈ ℕ2) ∧ (¬↑null(J)))
Latex:
Latex:
.....subterm..... T:t
2:n
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. f : name-morph(I;[])
8. a : nameset(I)
9. b : nameset(I)
10. ((\mexists{}j1\mmember{}J. \mneg{}(j1 = a)) \mwedge{} (\mexists{}j2\mmember{}J. \mneg{}(j2 = b)))
\mvee{} ((\mneg{}\muparrow{}null(J)) \mwedge{} ((f x) = i) \mwedge{} ((flip(f;a) x) = i) \mwedge{} ((flip(f;b) x) = i))
11. v : I-face(cubical-nerve(C);I)
12. (f a) = 0
13. direction(v) = (f dimension(v))
14. (f b) = 0
15. \mneg{}(a = b)
16. \mneg{}(dimension(v) = a)
17. \mneg{}(dimension(v) = b)
18. (v \mmember{} box)
19. \mneg{}\muparrow{}null(J)
20. (ob(cube(v)) flip(flip(f;a);b)) = nerve\_box\_label(box;flip(flip(f;a);b))
21. (ob(cube(v)) f) = nerve\_box\_label(box;f)
22. (ob(cube(v)) flip(f;a)) = nerve\_box\_label(box;flip(f;a))
23. (ob(cube(v)) flip(f;b)) = nerve\_box\_label(box;flip(f;b))
24. (ob(cube(v)) flip(flip(f;b);a)) = nerve\_box\_label(box;flip(flip(f;b);a))
25. (cat-comp(C) (ob(cube(v)) f) (ob(cube(v)) flip(f;a)) (ob(cube(v)) flip(flip(f;a);b))
(arrow(cube(v)) f flip(f;a) (\mlambda{}x.Ax))
(arrow(cube(v)) flip(f;a) flip(flip(f;a);b) (\mlambda{}x.Ax)))
= (cat-comp(C) (ob(cube(v)) f) (ob(cube(v)) flip(f;b)) (ob(cube(v)) flip(flip(f;b);a))
(arrow(cube(v)) f flip(f;b) (\mlambda{}x.Ax))
(arrow(cube(v)) flip(f;b) flip(flip(f;b);a) (\mlambda{}x.Ax)))
\mvdash{} (arrow(cube(v)) f flip(f;a) (\mlambda{}x.Ax)) = nerve\_box\_edge(box;f;a)
By
Latex:
(SubsumeC \mkleeneopen{}cat-arrow(C) nerve\_box\_label(box;f) nerve\_box\_label(box;flip(f;a))\mkleeneclose{}\mcdot{}
THEN Try ((BLemma `subtype\_rel-equal` THEN Auto))
THEN Try ((BLemma `nerve\_box\_edge\_same1` THEN Auto))
THEN Try ((RepUR ``name-morph-flip`` 0 THEN AutoSplit)))
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