Proof of Nuprl Lemma : equiv-path2-0

Step * 3 of Lemma equiv-path2-0

.....assertion.....
1. G : CubicalSet{j}
2. A : {G ⊢ _}
3. B : {G ⊢ _}
4. f : {G ⊢ _:Equiv(A;B)}
5. cA : G +⊢ Compositon(A)
6. cB : G +⊢ Compositon(B)
7. G.𝕀, ((q=0) ∨ (q=1)) ⊢ (if (q=0) then (A)p else (B)p)
8. case-type-comp(G.𝕀; (q=0); (q=1); (A)p; (B)p; (cA)p; (cB)p)
∈ G.𝕀, ((q=0) ∨ (q=1)) +⊢ Compositon((if (q=0) then (A)p else (B)p))
9. G ⊢ (1(𝔽) ⇒ (((q=0) ∨ (q=1)))[0(𝕀)])

10. (comp(Glue [((q=0) ∨ (q=1)) ⊢→ ((if (q=0) then (A)p else (B)p), cubical-equiv-by-cases(G;B;f))] (B)p) )[0(𝕀)]

= (case-type-comp(G.𝕀; (q=0); (q=1); (A)p; (B)p; (cA)p; (cB)p))[0(𝕀)]
∈ G +⊢ Compositon(((if (q=0) then (A)p else (B)p))[0(𝕀)])
⊢ (case-type-comp(G.𝕀; (q=0); (q=1); (A)p; (B)p; (cA)p; (cB)p))[0(𝕀)]
= cA
∈ G +⊢ Compositon(((if (q=0) then (A)p else (B)p))[0(𝕀)])
BY
{ ((RWW "csm-case-type-comp csm-face-zero csm-face-one" 0 THENA Auto)
   THEN (Subst' (q)[0(𝕀)] ~ 0(𝕀) 0 THENA (CsmUnfolding THEN Auto))
   THEN (Subst' ((cA)p)[0(𝕀)] ~ (cA)1(G) 0 THENA CsmUnfoldingComp)
   THEN (Subst' ((cB)p)[0(𝕀)] ~ (cB)1(G) 0 THENA CsmUnfoldingComp)) }

1
1. G : CubicalSet{j}
2. A : {G ⊢ _}
3. B : {G ⊢ _}
4. f : {G ⊢ _:Equiv(A;B)}
5. cA : G +⊢ Compositon(A)
6. cB : G +⊢ Compositon(B)
7. G.𝕀, ((q=0) ∨ (q=1)) ⊢ (if (q=0) then (A)p else (B)p)
8. case-type-comp(G.𝕀; (q=0); (q=1); (A)p; (B)p; (cA)p; (cB)p)
   ∈ G.𝕀, ((q=0) ∨ (q=1)) +⊢ Compositon((if (q=0) then (A)p else (B)p))
9. G ⊢ (1(𝔽) ⇒ (((q=0) ∨ (q=1)))[0(𝕀)])

10. (comp(Glue [((q=0) ∨ (q=1)) ⊢→ ((if (q=0) then (A)p else (B)p), cubical-equiv-by-cases(G;B;f))] (B)p) )[0(𝕀)]

= (case-type-comp(G.𝕀; (q=0); (q=1); (A)p; (B)p; (cA)p; (cB)p))[0(𝕀)]
∈ G +⊢ Compositon(((if (q=0) then (A)p else (B)p))[0(𝕀)])
⊢ case-type-comp(G; (0(𝕀)=0); (0(𝕀)=1); ((A)p)[0(𝕀)]; ((B)p)[0(𝕀)]; (cA)1(G); (cB)1(G))
= cA
∈ G +⊢ Compositon(((if (q=0) then (A)p else (B)p))[0(𝕀)])

Latex:

Latex:
.....assertion..... 1. G : CubicalSet\{j\} 2. A : \{G \mvdash{} \_\} 3. B : \{G \mvdash{} \_\} 4. f : \{G \mvdash{} \_:Equiv(A;B)\} 5. cA : G +\mvdash{} Compositon(A) 6. cB : G +\mvdash{} Compositon(B) 7. G.\mBbbI{}, ((q=0) \mvee{} (q=1)) \mvdash{} (if (q=0) then (A)p else (B)p) 8. case-type-comp(G.\mBbbI{}; (q=0); (q=1); (A)p; (B)p; (cA)p; (cB)p) \mmember{} G.\mBbbI{}, ((q=0) \mvee{} (q=1)) +\mvdash{} Compositon((if (q=0) then (A)p else (B)p)) 9. G \mvdash{} (1(\mBbbF{}) {}\mRightarrow{} (((q=0) \mvee{} (q=1)))[0(\mBbbI{})]) 10. (comp(Glue [((q=0) \mvee{} (q=1)) \mvdash{}\mrightarrow{} ((if (q=0) then (A)p else (B)p), cubical-equiv-by-cases(G;B;f))] (B)p) )[0(\mBbbI{})] = (case-type-comp(G.\mBbbI{}; (q=0); (q=1); (A)p; (B)p; (cA)p; (cB)p))[0(\mBbbI{})] \mvdash{} (case-type-comp(G.\mBbbI{}; (q=0); (q=1); (A)p; (B)p; (cA)p; (cB)p))[0(\mBbbI{})] = cA By Latex: ((RWW "csm-case-type-comp csm-face-zero csm-face-one" 0 THENA Auto) THEN (Subst' (q)[0(\mBbbI{})] \msim{} 0(\mBbbI{}) 0 THENA (CsmUnfolding THEN Auto)) THEN (Subst' ((cA)p)[0(\mBbbI{})] \msim{} (cA)1(G) 0 THENA CsmUnfoldingComp) THEN (Subst' ((cB)p)[0(\mBbbI{})] \msim{} (cB)1(G) 0 THENA CsmUnfoldingComp)) Home Index