Proof of Nuprl Lemma : paths-are-refl-iff2

Step * 1 of Lemma paths-are-refl-iff2

1. X : CubicalSet{j}
2. A : {X ⊢ _}

3. ∀Z:j⊢. ∀s:Z j⟶ X. ∀p:{Z ⊢ _:Path((A)s)}.  ∀[x,y:{Z ⊢ _:𝕀}].  (p @ x = p @ y ∈ {Z ⊢ _:(A)s})

4. Z : CubicalSet{j}

5. ∀s:Z j⟶ X. ∀p:{Z ⊢ _:Path((A)s)}.  ∀[x,y:{Z ⊢ _:𝕀}].  (p @ x = p @ y ∈ {Z ⊢ _:(A)s})

6. s : Z j⟶ X
7. ∀p:{Z ⊢ _:Path((A)s)}. ∀[x,y:{Z ⊢ _:𝕀}]. (p @ x = p @ y ∈ {Z ⊢ _:(A)s})
⊢ ∀p:{Z.𝕀 ⊢ _:((A)s)p}. ∀[x,y:{Z ⊢ _:𝕀}]. ((p)[x] = (p)[y] ∈ {Z ⊢ _:(A)s})
BY
{ Intros }

1
1. X : CubicalSet{j}
2. A : {X ⊢ _}

3. ∀Z:j⊢. ∀s:Z j⟶ X. ∀p:{Z ⊢ _:Path((A)s)}.  ∀[x,y:{Z ⊢ _:𝕀}].  (p @ x = p @ y ∈ {Z ⊢ _:(A)s})

4. Z : CubicalSet{j}

5. ∀s:Z j⟶ X. ∀p:{Z ⊢ _:Path((A)s)}.  ∀[x,y:{Z ⊢ _:𝕀}].  (p @ x = p @ y ∈ {Z ⊢ _:(A)s})

6. s : Z j⟶ X
7. ∀p:{Z ⊢ _:Path((A)s)}. ∀[x,y:{Z ⊢ _:𝕀}]. (p @ x = p @ y ∈ {Z ⊢ _:(A)s})
8. p : {Z.𝕀 ⊢ _:((A)s)p}
9. x : {Z ⊢ _:𝕀}
10. y : {Z ⊢ _:𝕀}
⊢ (p)[x] = (p)[y] ∈ {Z ⊢ _:(A)s}

Latex:

Latex:
1. X : CubicalSet\{j\} 2. A : \{X \mvdash{} \_\} 3. \mforall{}Z:j\mvdash{}. \mforall{}s:Z j{}\mrightarrow{} X. \mforall{}p:\{Z \mvdash{} \_:Path((A)s)\}. \mforall{}[x,y:\{Z \mvdash{} \_:\mBbbI{}\}]. (p @ x = p @ y) 4. Z : CubicalSet\{j\} 5. \mforall{}s:Z j{}\mrightarrow{} X. \mforall{}p:\{Z \mvdash{} \_:Path((A)s)\}. \mforall{}[x,y:\{Z \mvdash{} \_:\mBbbI{}\}]. (p @ x = p @ y) 6. s : Z j{}\mrightarrow{} X 7. \mforall{}p:\{Z \mvdash{} \_:Path((A)s)\}. \mforall{}[x,y:\{Z \mvdash{} \_:\mBbbI{}\}]. (p @ x = p @ y) \mvdash{} \mforall{}p:\{Z.\mBbbI{} \mvdash{} \_:((A)s)p\}. \mforall{}[x,y:\{Z \mvdash{} \_:\mBbbI{}\}]. ((p)[x] = (p)[y]) By Latex: Intros Home Index