Proof of Nuprl Lemma : cubical-path-0-ap-morph

Step * 3 of Lemma cubical-path-0-ap-morph

.....wf.....
1. Gamma : CubicalSet{j}
2. A : {Gamma ⊢ _}
3. I : fset(ℕ)
4. i : {i:ℕ| ¬i ∈ I}
5. rho : Gamma(I+i)
6. phi : 𝔽(I)
7. u : {I+i,s(phi) ⊢ _:(A)<rho> o iota}
8. a : cubical-path-0(Gamma;A;I;i;rho;phi;u)
9. J : fset(ℕ)
10. g : J ⟶ I
11. j : {j:ℕ| ¬j ∈ J}
12. a0 : A((j0)(g,i=j(rho)))
⊢ istype(cubical-path-condition(Gamma;A;J;j;g,i=j(rho);g(phi);(u)subset-trans(I+i;J+j;g,i=j;s(phi));a0))
BY
{ Unfold `cubical-path-condition` 0 }

1
1. Gamma : CubicalSet{j}
2. A : {Gamma ⊢ _}
3. I : fset(ℕ)
4. i : {i:ℕ| ¬i ∈ I}
5. rho : Gamma(I+i)
6. phi : 𝔽(I)
7. u : {I+i,s(phi) ⊢ _:(A)<rho> o iota}
8. a : cubical-path-0(Gamma;A;I;i;rho;phi;u)
9. J : fset(ℕ)
10. g : J ⟶ I
11. j : {j:ℕ| ¬j ∈ J}
12. a0 : A((j0)(g,i=j(rho)))
⊢ istype(∀J@0:fset(ℕ). ∀f:J,g(phi)(J@0).

           ((a0 (j0)(g,i=j(rho)) f) = (u)subset-trans(I+i;J+j;g,i=j;s(phi))((j0) ⋅ f) ∈ A(f((j0)(g,i=j(rho))))))

Latex:

Latex:
.....wf..... 1. Gamma : CubicalSet\{j\} 2. A : \{Gamma \mvdash{} \_\} 3. I : fset(\mBbbN{}) 4. i : \{i:\mBbbN{}| \mneg{}i \mmember{} I\} 5. rho : Gamma(I+i) 6. phi : \mBbbF{}(I) 7. u : \{I+i,s(phi) \mvdash{} \_:(A)<rho> o iota\} 8. a : cubical-path-0(Gamma;A;I;i;rho;phi;u) 9. J : fset(\mBbbN{}) 10. g : J {}\mrightarrow{} I 11. j : \{j:\mBbbN{}| \mneg{}j \mmember{} J\} 12. a0 : A((j0)(g,i=j(rho))) \mvdash{} istype(cubical-path-condition(Gamma;A;J;j;g,i=j(rho);g(phi);(u)subset-trans(I+i;J+j;g,i=j; s(phi));a0)) By Latex: Unfold `cubical-path-condition` 0 Home Index