Proof of Nuprl Lemma : Kan_id_filler

Step * 1 2 2 2 2 of Lemma Kan_id_filler_uniform

1. X : CubicalSet
2. A : {X ⊢ _(Kan)}
3. a : {X ⊢ _:Kan-type(A)}
4. b : {X ⊢ _:Kan-type(A)}
5. I : Cname List
6. alpha : X(I)
7. J : nameset(I) List
8. x : nameset(I)
9. i : ℕ2
10. bx : A-open-box(X;(Id_Kan-type(A) a b);I;alpha;J;x;i)
11. K : Cname List
12. f : name-morph(I;K)
13. ∀i:nameset(I). ((i ∈ J) ⇒ (↑isname(f i)))
14. ↑isname(f x)
15. map(f;J) ∈ nameset(K) List
16. f x ∈ nameset(K)
17. nameset([x / J]) ⊆r name-morph-domain(f;I)
18. l_subset(Cname;[fresh-cname(K) / map(f;J)];[fresh-cname(K) / K])
19. [fresh-cname(K) / map(f;J)] ∈ nameset([fresh-cname(K) / K]) List
20. ∀z:Cname. ((z ∈ [fresh-cname(I) / J]) ⇒ (↑isname(f[fresh-cname(I):=fresh-cname(K)] z)))
21. map(f[fresh-cname(I):=fresh-cname(K)];[fresh-cname(I) / J]) ~ [fresh-cname(K) / map(f;J)]
22. Kan_id_filler(X;A;a;b) ∈ I:(Cname List)
    ⟶ alpha:X(I)
    ⟶ J:(nameset(I) List)
    ⟶ x:nameset(I)
    ⟶ i:ℕ2
    ⟶ A-open-box(X;(Id_Kan-type(A) a b);I;alpha;J;x;i)
    ⟶ I-path(X;Kan-type(A);a;b;I;alpha)
⊢ path-eq(X;Kan-type(A);K;f(alpha);(Kan_id_filler(X;A;a;b) I alpha J x i

                                    bx alpha f);Kan_id_filler(X;A;a;b) K f(alpha) map(f;J) (f x) i

                                                A-open-box-image(X;(Id_Kan-type(A) a b);I;K;f;alpha;bx))

BY
{ (Thin (-1) THEN RepUR ``path-eq Kan_id_filler named-path-morph`` 0) }

1
1. X : CubicalSet
2. A : {X ⊢ _(Kan)}
3. a : {X ⊢ _:Kan-type(A)}
4. b : {X ⊢ _:Kan-type(A)}
5. I : Cname List
6. alpha : X(I)
7. J : nameset(I) List
8. x : nameset(I)
9. i : ℕ2
10. bx : A-open-box(X;(Id_Kan-type(A) a b);I;alpha;J;x;i)
11. K : Cname List
12. f : name-morph(I;K)
13. ∀i:nameset(I). ((i ∈ J) ⇒ (↑isname(f i)))
14. ↑isname(f x)
15. map(f;J) ∈ nameset(K) List
16. f x ∈ nameset(K)
17. nameset([x / J]) ⊆r name-morph-domain(f;I)
18. l_subset(Cname;[fresh-cname(K) / map(f;J)];[fresh-cname(K) / K])
19. [fresh-cname(K) / map(f;J)] ∈ nameset([fresh-cname(K) / K]) List
20. ∀z:Cname. ((z ∈ [fresh-cname(I) / J]) ⇒ (↑isname(f[fresh-cname(I):=fresh-cname(K)] z)))
21. map(f[fresh-cname(I):=fresh-cname(K)];[fresh-cname(I) / J]) ~ [fresh-cname(K) / map(f;J)]

⊢ ((filler(x;i;cubical-id-box(X;Kan-type(A);a;b;I;alpha;bx)) iota(fresh-cname(I))(alpha) f[...:=...]) ...(f(alpha)) ...)

= filler(f x;i;cubical-id-box(X;Kan-type(A);a;b;K;f(alpha);A-open-box-image(X;(Id_Kan-type(A) a b);I;K;f;alpha;bx)))
∈ Kan-type(A)(iota(fresh-cname(K))(f(alpha)))

Latex:

Latex:
1. X : CubicalSet 2. A : \{X \mvdash{} \_(Kan)\} 3. a : \{X \mvdash{} \_:Kan-type(A)\} 4. b : \{X \mvdash{} \_:Kan-type(A)\} 5. I : Cname List 6. alpha : X(I) 7. J : nameset(I) List 8. x : nameset(I) 9. i : \mBbbN{}2 10. bx : A-open-box(X;(Id\_Kan-type(A) a b);I;alpha;J;x;i) 11. K : Cname List 12. f : name-morph(I;K) 13. \mforall{}i:nameset(I). ((i \mmember{} J) {}\mRightarrow{} (\muparrow{}isname(f i))) 14. \muparrow{}isname(f x) 15. map(f;J) \mmember{} nameset(K) List 16. f x \mmember{} nameset(K) 17. nameset([x / J]) \msubseteq{}r name-morph-domain(f;I) 18. l\_subset(Cname;[fresh-cname(K) / map(f;J)];[fresh-cname(K) / K]) 19. [fresh-cname(K) / map(f;J)] \mmember{} nameset([fresh-cname(K) / K]) List 20. \mforall{}z:Cname. ((z \mmember{} [fresh-cname(I) / J]) {}\mRightarrow{} (\muparrow{}isname(f[fresh-cname(I):=fresh-cname(K)] z))) 21. map(f[fresh-cname(I):=fresh-cname(K)];[fresh-cname(I) / J]) \msim{} [fresh-cname(K) / map(f;J)] 22. Kan\_id\_filler(X;A;a;b) \mmember{} I:(Cname List) {}\mrightarrow{} alpha:X(I) {}\mrightarrow{} J:(nameset(I) List) {}\mrightarrow{} x:nameset(I) {}\mrightarrow{} i:\mBbbN{}2 {}\mrightarrow{} A-open-box(X;(Id\_Kan-type(A) a b);I;alpha;J;x;i) {}\mrightarrow{} I-path(X;Kan-type(A);a;b;I;alpha) \mvdash{} path-eq(X;Kan-type(A);K;f(alpha);(Kan\_id\_filler(X;A;a;b) I alpha J x i bx alpha f);Kan\_id\_filler(X;A;a;b) K f(alpha) map(f;J) (f x) i A-open-box-image(X;(Id\_... a b);I;K;f;alpha;bx)) By Latex: (Thin (-1) THEN RepUR ``path-eq Kan\_id\_filler named-path-morph`` 0) Home Index