Proof of Nuprl Lemma : pres-invariant

Step * 3 1 of Lemma pres-invariant

1. G : CubicalSet{j}
2. H : CubicalSet{j}
3. H = G ∈ CubicalSet{j}
4. phi : {G ⊢ _:𝔽}
5. A : {G.𝕀 ⊢ _}
6. T : {G.𝕀 ⊢ _}
7. f : {G.𝕀 ⊢ _:(T ⟶ A)}
8. t : {G.𝕀, (phi)p ⊢ _:T}
9. t0 : {G ⊢ _:(T)[0(𝕀)][phi |⟶ t[0]]}
10. cT : G.𝕀 +⊢ Compositon(T)
11. cA : G.𝕀 +⊢ Compositon(A)
12. app(f; t) ∈ {G.𝕀, (phi)p ⊢ _:A}
13. H = G ∈ {z:CubicalSet{j}| (z = H ∈ CubicalSet{j}) ∧ (z = G ∈ CubicalSet{j})}
14. z : CubicalSet{j}
15. z = H ∈ CubicalSet{j}
16. z = G ∈ CubicalSet{j}

⊢ pres f [phi ⊢→ t] t0 ∈ {G ⊢ _:(Path_(A)[1(𝕀)] pres-c1(G;phi;f;t;t0;cA) pres-c2(G;phi;f;t;t0;cT))}

BY
{ InferEqualType }

1
1. G : CubicalSet{j}
2. H : CubicalSet{j}
3. H = G ∈ CubicalSet{j}
4. phi : {G ⊢ _:𝔽}
5. A : {G.𝕀 ⊢ _}
6. T : {G.𝕀 ⊢ _}
7. f : {G.𝕀 ⊢ _:(T ⟶ A)}
8. t : {G.𝕀, (phi)p ⊢ _:T}
9. t0 : {G ⊢ _:(T)[0(𝕀)][phi |⟶ t[0]]}
10. cT : G.𝕀 +⊢ Compositon(T)
11. cA : G.𝕀 +⊢ Compositon(A)
12. app(f; t) ∈ {G.𝕀, (phi)p ⊢ _:A}
13. H = G ∈ {z:CubicalSet{j}| (z = H ∈ CubicalSet{j}) ∧ (z = G ∈ CubicalSet{j})}
14. z : CubicalSet{j}
15. z = H ∈ CubicalSet{j}
16. z = G ∈ CubicalSet{j}
⊢ {z ⊢ _:(Path_(A)[1(𝕀)] pres-c1(z;phi;f;t;t0;cA) pres-c2(z;phi;f;t;t0;cT))}
= {G ⊢ _:(Path_(A)[1(𝕀)] pres-c1(G;phi;f;t;t0;cA) pres-c2(G;phi;f;t;t0;cT))}
∈ 𝕌{[i' | j']}

2
1. G : CubicalSet{j}
2. H : CubicalSet{j}
3. H = G ∈ CubicalSet{j}
4. phi : {G ⊢ _:𝔽}
5. A : {G.𝕀 ⊢ _}
6. T : {G.𝕀 ⊢ _}
7. f : {G.𝕀 ⊢ _:(T ⟶ A)}
8. t : {G.𝕀, (phi)p ⊢ _:T}
9. t0 : {G ⊢ _:(T)[0(𝕀)][phi |⟶ t[0]]}
10. cT : G.𝕀 +⊢ Compositon(T)
11. cA : G.𝕀 +⊢ Compositon(A)
12. app(f; t) ∈ {G.𝕀, (phi)p ⊢ _:A}
13. H = G ∈ {z:CubicalSet{j}| (z = H ∈ CubicalSet{j}) ∧ (z = G ∈ CubicalSet{j})}
14. z : CubicalSet{j}
15. z = H ∈ CubicalSet{j}
16. z = G ∈ CubicalSet{j}
17. {z ⊢ _:(Path_(A)[1(𝕀)] pres-c1(z;phi;f;t;t0;cA) pres-c2(z;phi;f;t;t0;cT))}
= {G ⊢ _:(Path_(A)[1(𝕀)] pres-c1(G;phi;f;t;t0;cA) pres-c2(G;phi;f;t;t0;cT))}
∈ 𝕌{[i' | j']}

⊢ pres f [phi ⊢→ t] t0 ∈ {z ⊢ _:(Path_(A)[1(𝕀)] pres-c1(z;phi;f;t;t0;cA) pres-c2(z;phi;f;t;t0;cT))}

Latex:

Latex:
1. G : CubicalSet\{j\} 2. H : CubicalSet\{j\} 3. H = G 4. phi : \{G \mvdash{} \_:\mBbbF{}\} 5. A : \{G.\mBbbI{} \mvdash{} \_\} 6. T : \{G.\mBbbI{} \mvdash{} \_\} 7. f : \{G.\mBbbI{} \mvdash{} \_:(T {}\mrightarrow{} A)\} 8. t : \{G.\mBbbI{}, (phi)p \mvdash{} \_:T\} 9. t0 : \{G \mvdash{} \_:(T)[0(\mBbbI{})][phi |{}\mrightarrow{} t[0]]\} 10. cT : G.\mBbbI{} +\mvdash{} Compositon(T) 11. cA : G.\mBbbI{} +\mvdash{} Compositon(A) 12. app(f; t) \mmember{} \{G.\mBbbI{}, (phi)p \mvdash{} \_:A\} 13. H = G 14. z : CubicalSet\{j\} 15. z = H 16. z = G \mvdash{} pres f [phi \mvdash{}\mrightarrow{} t] t0 \mmember{} \{G \mvdash{} \_:(Path\_(A)[1(\mBbbI{})] pres-c1(G;phi;f;t;t0;cA) pres-c2(G;phi;f;t;t0;cT))\} By Latex: InferEqualType Home Index