Proof of Nuprl Lemma : singleton-contraction

Step * 2 of Lemma singleton-contraction_wf

1. X : CubicalSet{j}
2. T : {X ⊢ _}
3. a : {X ⊢ _:T}
4. b : {X ⊢ _:T}
5. pth : {X ⊢ _:(Path_T a b)}
6. refl(a) ∈ {X ⊢ _:((Path_(T)p (a)p q))[a]}
7. pth ∈ {X ⊢ _:((Path_(T)p (a)p q))[b]}

⊢ X ⊢ (cubical-pair((pth)p @ q;path-contraction(X;pth)))[1(𝕀)]=cubical-pair(b;pth):Σ T (Path_(T)p (a)p q)

BY
{ ((RWW "csm-cubical-pair cubical-path-ap-id-adjoin" 0 THENA Auto)
   THEN Unfold `same-cubical-term` 0
   THEN EqCDA
   THEN Auto) }

Latex:

Latex:
1. X : CubicalSet\{j\} 2. T : \{X \mvdash{} \_\} 3. a : \{X \mvdash{} \_:T\} 4. b : \{X \mvdash{} \_:T\} 5. pth : \{X \mvdash{} \_:(Path\_T a b)\} 6. refl(a) \mmember{} \{X \mvdash{} \_:((Path\_(T)p (a)p q))[a]\} 7. pth \mmember{} \{X \mvdash{} \_:((Path\_(T)p (a)p q))[b]\} \mvdash{} X \mvdash{} (cubical-pair((pth)p @ q;path-contraction(X;pth)))[1(\mBbbI{})]=cubical-pair(b;pth): \mSigma{} T (Path\_(T)p (a)p q) By Latex: ((RWW "csm-cubical-pair cubical-path-ap-id-adjoin" 0 THENA Auto) THEN Unfold `same-cubical-term` 0 THEN EqCDA THEN Auto) Home Index