Proof of Nuprl Lemma : equiv-term-0-subset-1

Step * 1 4 of Lemma equiv-term-0-subset-1

.....wf.....
1. G : CubicalSet{j}
2. phi : {G ⊢ _:𝔽}
3. phi = 0(𝔽) ∈ {G ⊢ _:𝔽}
4. psi : {G ⊢ _:𝔽}
5. psi = 1(𝔽) ∈ {G ⊢ _:𝔽}
6. A : {G ⊢ _}
7. T : {G ⊢ _}
8. f : {G ⊢ _:Equiv(T;A)}
9. a : {G ⊢ _:A}
10. t : Top
11. c : Top
12. cF : G +⊢ Compositon(Fiber(equiv-fun(f);a))

13. equiv f [phi ⊢→ (t,  c)] a = transprt(G;(cF)p;contr-center(equiv-contr(f;a))) ∈ {G ⊢ _:Fiber(equiv-fun(f);a)}

14. t ∈ {G, phi ⊢ _:T}
15. c = c ∈ {G, 0(𝔽) ⊢ _:(Path_A a app(equiv-fun(f); t))}
⊢ G, 0(𝔽) ⊢ (Path_A a app(equiv-fun(f); t))
BY
{ (InstLemma `empty-context-subset-lemma6`
   [⌜G⌝;⌜(Path_A a app(equiv-fun(f); t))⌝;⌜(Path_A a app(equiv-fun(f); t))⌝]⋅
   THEN (Eq ORELSE (RepUR ``path-type cubical-subset`` 0 THEN Auto))
   ) }

Latex:

Latex:
.....wf..... 1. G : CubicalSet\{j\} 2. phi : \{G \mvdash{} \_:\mBbbF{}\} 3. phi = 0(\mBbbF{}) 4. psi : \{G \mvdash{} \_:\mBbbF{}\} 5. psi = 1(\mBbbF{}) 6. A : \{G \mvdash{} \_\} 7. T : \{G \mvdash{} \_\} 8. f : \{G \mvdash{} \_:Equiv(T;A)\} 9. a : \{G \mvdash{} \_:A\} 10. t : Top 11. c : Top 12. cF : G +\mvdash{} Compositon(Fiber(equiv-fun(f);a)) 13. equiv f [phi \mvdash{}\mrightarrow{} (t, c)] a = transprt(G;(cF)p;contr-center(equiv-contr(f;a))) 14. t \mmember{} \{G, phi \mvdash{} \_:T\} 15. c = c \mvdash{} G, 0(\mBbbF{}) \mvdash{} (Path\_A a app(equiv-fun(f); t)) By Latex: (InstLemma `empty-context-subset-lemma6` [\mkleeneopen{}G\mkleeneclose{};\mkleeneopen{}(Path\_A a app(equiv-fun(f); t))\mkleeneclose{};\mkleeneopen{}(Path\_A a app(equiv-fun(f); t))\mkleeneclose{}]\mcdot{} THEN (Eq ORELSE (RepUR ``path-type cubical-subset`` 0 THEN Auto)) ) Home Index