Proof of Nuprl Lemma : csm-revfill

Step * 1 2 of Lemma csm-revfill

1. Gamma : CubicalSet{j}
2. A : {Gamma.𝕀 ⊢ _}
3. cA : Gamma.𝕀 ⊢ Compositon(A)
4. a1 : {Gamma ⊢ _:(A)[1(𝕀)]}
5. Delta : CubicalSet{j}
6. s : Delta j⟶ Gamma
7. discr(⋅) ∈ {Gamma.𝕀, (0(𝔽))p ⊢ _:A}
8. a1 ∈ {Gamma ⊢ _:(A)[1(𝕀)][0(𝔽) |⟶ ⋅[1]]}
9. (rev_fill_term(Gamma;cA;0(𝔽);discr(⋅);a1))s+
= rev_fill_term(Delta;(cA)s+;(0(𝔽))s;(discr(⋅))s+;(a1)s)
∈ {Delta.𝕀 ⊢ _:(A)s+}

10. (discr(⋅))s+ = (rev_fill_term(Gamma;cA;0(𝔽);discr(⋅);a1))s+ ∈ {Delta.𝕀, ((0(𝔽))s)p ⊢ _:(A)s+}

⊢ discr(⋅) ~ (discr(⋅))s+
BY
{ (Unfold `discrete-cubical-term` 0 THEN CsmUnfolding THEN Auto) }

Latex:

Latex:
1. Gamma : CubicalSet\{j\} 2. A : \{Gamma.\mBbbI{} \mvdash{} \_\} 3. cA : Gamma.\mBbbI{} \mvdash{} Compositon(A) 4. a1 : \{Gamma \mvdash{} \_:(A)[1(\mBbbI{})]\} 5. Delta : CubicalSet\{j\} 6. s : Delta j{}\mrightarrow{} Gamma 7. discr(\mcdot{}) \mmember{} \{Gamma.\mBbbI{}, (0(\mBbbF{}))p \mvdash{} \_:A\} 8. a1 \mmember{} \{Gamma \mvdash{} \_:(A)[1(\mBbbI{})][0(\mBbbF{}) |{}\mrightarrow{} \mcdot{}[1]]\} 9. (rev\_fill\_term(Gamma;cA;0(\mBbbF{});discr(\mcdot{});a1))s+ = rev\_fill\_term(Delta;(cA)s+;(0(\mBbbF{}))s;(discr(\mcdot{}))s+;(a1)s) 10. (discr(\mcdot{}))s+ = (rev\_fill\_term(Gamma;cA;0(\mBbbF{});discr(\mcdot{});a1))s+ \mvdash{} discr(\mcdot{}) \msim{} (discr(\mcdot{}))s+ By Latex: (Unfold `discrete-cubical-term` 0 THEN CsmUnfolding THEN Auto) Home Index