Proof of Nuprl Lemma : cubical-refl-p-p

Step * 2 1 of Lemma cubical-refl-p-p

1. X : CubicalSet{j}
2. A : {X ⊢ _}
3. B : {X ⊢ _}
4. a : {X ⊢ _:A}
5. C : {X.B ⊢ _}
6. refl(((a)p)p) = (refl((a)p))p ∈ {X.B.C ⊢ _:((Path_(A)p (a)p (a)p))p}
7. (refl(a))p = refl((a)p) ∈ {X.B ⊢ _:((Path_A a a))p}
⊢ ((refl(a))p)p = (refl((a)p))p ∈ {X.B.C ⊢ _:(((Path_A a a))p)p}
BY
{ (ApFunToHypEquands `Z' ⌜(Z)p⌝ ⌜{X.B.C ⊢ _:(((Path_A a a))p)p}⌝ (-1)⋅ THEN Auto) }

Latex:

Latex:
1. X : CubicalSet\{j\} 2. A : \{X \mvdash{} \_\} 3. B : \{X \mvdash{} \_\} 4. a : \{X \mvdash{} \_:A\} 5. C : \{X.B \mvdash{} \_\} 6. refl(((a)p)p) = (refl((a)p))p 7. (refl(a))p = refl((a)p) \mvdash{} ((refl(a))p)p = (refl((a)p))p By Latex: (ApFunToHypEquands `Z' \mkleeneopen{}(Z)p\mkleeneclose{} \mkleeneopen{}\{X.B.C \mvdash{} \_:(((Path\_A a a))p)p\}\mkleeneclose{} (-1)\mcdot{} THEN Auto) Home Index