Proof of Nuprl Lemma : partial-term-0

Step * 2 of Lemma partial-term-0_wf

1. [H] : CubicalSet{j}
2. [A] : {H.𝕀 ⊢ _}
3. [phi] : {H ⊢ _:𝔽}
4. [u] : {H.𝕀, (phi)p ⊢ _:A}
5. ((phi)p)[0(𝕀)] ∈ {H ⊢ _:𝔽}
⊢ u[0] ∈ {H, phi ⊢ _:(A)[0(𝕀)]}
BY
{ (Unfold `partial-term-0` 0
THEN (InstLemma `context-subset-map` [⌜H.𝕀⌝;⌜(phi)p⌝;⌜H⌝;⌜[0(𝕀)]⌝]⋅ THENA Auto)
THEN InferEqualType) }

1
1. H : CubicalSet{j}
2. A : {H.𝕀 ⊢ _}
3. phi : {H ⊢ _:𝔽}
4. u : {H.𝕀, (phi)p ⊢ _:A}
5. ((phi)p)[0(𝕀)] ∈ {H ⊢ _:𝔽}
6. [0(𝕀)] ∈ H, ((phi)p)[0(𝕀)] j⟶ H.𝕀, (phi)p
⊢ {H, ((phi)p)[0(𝕀)] ⊢ _:(A)[0(𝕀)]} = {H, phi ⊢ _:(A)[0(𝕀)]} ∈ 𝕌{[i | j']}

2
1. H : CubicalSet{j}
2. A : {H.𝕀 ⊢ _}
3. phi : {H ⊢ _:𝔽}
4. u : {H.𝕀, (phi)p ⊢ _:A}
5. ((phi)p)[0(𝕀)] ∈ {H ⊢ _:𝔽}
6. [0(𝕀)] ∈ H, ((phi)p)[0(𝕀)] j⟶ H.𝕀, (phi)p
7. {H, ((phi)p)[0(𝕀)] ⊢ _:(A)[0(𝕀)]} = {H, phi ⊢ _:(A)[0(𝕀)]} ∈ 𝕌{[i | j']}
⊢ (u)[0(𝕀)] ∈ {H, ((phi)p)[0(𝕀)] ⊢ _:(A)[0(𝕀)]}

Latex:

Latex:
1. [H] : CubicalSet\{j\} 2. [A] : \{H.\mBbbI{} \mvdash{} \_\} 3. [phi] : \{H \mvdash{} \_:\mBbbF{}\} 4. [u] : \{H.\mBbbI{}, (phi)p \mvdash{} \_:A\} 5. ((phi)p)[0(\mBbbI{})] \mmember{} \{H \mvdash{} \_:\mBbbF{}\} \mvdash{} u[0] \mmember{} \{H, phi \mvdash{} \_:(A)[0(\mBbbI{})]\} By Latex: (Unfold `partial-term-0` 0 THEN (InstLemma `context-subset-map` [\mkleeneopen{}H.\mBbbI{}\mkleeneclose{};\mkleeneopen{}(phi)p\mkleeneclose{};\mkleeneopen{}H\mkleeneclose{};\mkleeneopen{}[0(\mBbbI{})]\mkleeneclose{}]\mcdot{} THENA Auto) THEN InferEqualType) Home Index