Proof of Nuprl Lemma : csm-cubical-identity

Step * 1 1 2 1 1 2 of Lemma csm-cubical-identity

.....subterm..... T:t
2:n
1. X : CubicalSet
2. Delta : CubicalSet
3. s : Delta ⟶ X
4. A1 : I:(Cname List) ⟶ X(I) ⟶ Type

5. A2 : I:(Cname List) ⟶ J:(Cname List) ⟶ f:name-morph(I;J) ⟶ a:X(I) ⟶ (A1 I a) ⟶ (A1 J f(a))

6. ∀I:Cname List. ∀a:X(I). ∀u:A1 I a. ((A2 I I 1 a u) = u ∈ (A1 I a))
7. ∀I,J,K:Cname List. ∀f:name-morph(I;J). ∀g:name-morph(J;K). ∀a:X(I). ∀u:A1 I a.
((A2 I K (f o g) a u) = (A2 J K g f(a) (A2 I J f a u)) ∈ (A1 K (f o g)(a)))
8. a : {X ⊢ _:<A1, A2>}
9. b : {X ⊢ _:<A1, A2>}
10. X ⊢ <A1, A2>
11. Delta ⊢ (<A1, A2>)s
12. I : Cname List
13. a@0 : Delta(I)

14. I-path(X;<A1, A2>;a;b;I;(s)a@0) = I-path(Delta;<λI,a. (A1 I (s)a), λI,J,f,a,u. (A2 I J f (s)a u)>;(a)s;(b)s;I;a@0) ∈\000C Type

15. z : {z:Cname| ¬(z ∈ I)}
16. p1 : named-path(X;<A1, A2>;a;b;I;(s)a@0;z)
17. z1 : {z:Cname| ¬(z ∈ I)}
18. q1 : named-path(X;<A1, A2>;a;b;I;(s)a@0;z1)

⊢ (p1 iota(z)((s)a@0) rename-one-name(z;z1)) = (p1 iota(z)(a@0) rename-one-name(z;z1)) ∈ <A1, A2>(iota(z1)((s)a@0))

BY
{ TACTIC:((InstLemma `csm-cubical-type-ap-morph` [⌜X⌝;⌜<A1, A2>⌝] ⋅ THENA Auto)
THEN RepUR ``csm-ap-type`` -1
THEN (RWO "-1" 0 THENA Auto)) }

1
1. X : CubicalSet
2. Delta : CubicalSet
3. s : Delta ⟶ X
4. A1 : I:(Cname List) ⟶ X(I) ⟶ Type

5. A2 : I:(Cname List) ⟶ J:(Cname List) ⟶ f:name-morph(I;J) ⟶ a:X(I) ⟶ (A1 I a) ⟶ (A1 J f(a))

14. I-path(X;<A1, A2>;a;b;I;(s)a@0) = I-path(Delta;<λI,a. (A1 I (s)a), λI,J,f,a,u. (A2 I J f (s)a u)>;(a)s;(b)s;I;a@0) ∈\000C Type

15. z : {z:Cname| ¬(z ∈ I)}
16. p1 : named-path(X;<A1, A2>;a;b;I;(s)a@0;z)
17. z1 : {z:Cname| ¬(z ∈ I)}
18. q1 : named-path(X;<A1, A2>;a;b;I;(s)a@0;z1)
19. ∀[I,J,f,a,u,s:Top]. ((u a f) ~ (u (s)a f))

⊢ (p1 iota(z)((s)a@0) rename-one-name(z;z1)) = (p1 (s)iota(z)(a@0) rename-one-name(z;z1)) ∈ <A1, A2>(iota(z1)((s)a@0))

Latex:

Latex:
.....subterm..... T:t 2:n 1. X : CubicalSet 2. Delta : CubicalSet 3. s : Delta {}\mrightarrow{} X 4. A1 : I:(Cname List) {}\mrightarrow{} X(I) {}\mrightarrow{} Type 5. A2 : I:(Cname List) {}\mrightarrow{} J:(Cname List) {}\mrightarrow{} f:name-morph(I;J) {}\mrightarrow{} a:X(I) {}\mrightarrow{} (A1 I a) {}\mrightarrow{} (A1 J f(a)) 6. \mforall{}I:Cname List. \mforall{}a:X(I). \mforall{}u:A1 I a. ((A2 I I 1 a u) = u) 7. \mforall{}I,J,K:Cname List. \mforall{}f:name-morph(I;J). \mforall{}g:name-morph(J;K). \mforall{}a:X(I). \mforall{}u:A1 I a. ((A2 I K (f o g) a u) = (A2 J K g f(a) (A2 I J f a u))) 8. a : \{X \mvdash{} \_:<A1, A2>\} 9. b : \{X \mvdash{} \_:<A1, A2>\} 10. X \mvdash{} <A1, A2> 11. Delta \mvdash{} (<A1, A2>)s 12. I : Cname List 13. a@0 : Delta(I) 14. I-path(X;<A1, A2>a;b;I;(s)a@0) = I-path(Delta;<\mlambda{}I,a. (A1 I (s)a), \mlambda{}I,J,f,a,u. (A2 I J f (s)a u)\000C>(a)s;(b)s;I;a@0) 15. z : \{z:Cname| \mneg{}(z \mmember{} I)\} 16. p1 : named-path(X;<A1, A2>a;b;I;(s)a@0;z) 17. z1 : \{z:Cname| \mneg{}(z \mmember{} I)\} 18. q1 : named-path(X;<A1, A2>a;b;I;(s)a@0;z1) \mvdash{} (p1 iota(z)((s)a@0) rename-one-name(z;z1)) = (p1 iota(z)(a@0) rename-one-name(z;z1)) By Latex: TACTIC:((InstLemma `csm-cubical-type-ap-morph` [\mkleeneopen{}X\mkleeneclose{};\mkleeneopen{}<A1, A2>\mkleeneclose{}] \mcdot{} THENA Auto) THEN RepUR ``csm-ap-type`` -1 THEN (RWO "-1" 0 THENA Auto)) Home Index