Proof of Nuprl Lemma : Kan_id_filler

Step * 1 1 1 of Lemma Kan_id_filler_wf1

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. l_subset(Cname;[fresh-cname(I) / J];[fresh-cname(I) / I])
⊢ <fresh-cname(I), filler(x;i;cubical-id-box(X;Kan-type(A);a;b;I;alpha;bx))> ∈ I-path(X;Kan-type(A);a;b;I;alpha)
BY
{ xxx(Assert ¬(fresh-cname(I) ∈ I) BY
(GenConclTerm ⌜fresh-cname(I)⌝⋅ THEN Auto))xxx }

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. l_subset(Cname;[fresh-cname(I) / J];[fresh-cname(I) / I])
12. ¬(fresh-cname(I) ∈ I)
⊢ <fresh-cname(I), filler(x;i;cubical-id-box(X;Kan-type(A);a;b;I;alpha;bx))> ∈ I-path(X;Kan-type(A);a;b;I;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. l\_subset(Cname;[fresh-cname(I) / J];[fresh-cname(I) / I]) \mvdash{} <fresh-cname(I), filler(x;i;cubical-id-box(X;Kan-type(A);a;b;I;alpha;bx))> \mmember{} I-path(X;Kan-type(A);a;b;I;alpha) By Latex: xxx(Assert \mneg{}(fresh-cname(I) \mmember{} I) BY (GenConclTerm \mkleeneopen{}fresh-cname(I)\mkleeneclose{}\mcdot{} THEN Auto))xxx Home Index