Proof of Nuprl Lemma : copath-at-W

Step * 1 1 2 2 1 1 1 of Lemma copath-at-W

.....eq aux.....
1. A : 𝕌'
2. B : A ⟶ Type
3. W(A;a.B[a]) ⊆r coW(A;a.B[a])
4. n : ℤ
5. 0 < n
6. w : W(A;a.B[a])
7. ¬(n = 0 ∈ ℤ)
8. ∀w:W(A;a.B[a]). ∀p1:coPath(a.B[a];w;n - 1).  (coPath-at(n - 1;w;p1) ∈ W(A;a.B[a]))
9. t : coW-dom(a.B[a];w)
10. p2 : coPath(a.B[a];coW-item(w;t);n - 1)
⊢ coPath-at(n - 1;coW-item(w;t);p2) ∈ W(A;a.B[a])
BY
{ BHyp -3 }

1
.....wf.....
1. A : 𝕌'
2. B : A ⟶ Type
3. W(A;a.B[a]) ⊆r coW(A;a.B[a])
4. n : ℤ
5. 0 < n
6. w : W(A;a.B[a])
7. ¬(n = 0 ∈ ℤ)
8. ∀w:W(A;a.B[a]). ∀p1:coPath(a.B[a];w;n - 1).  (coPath-at(n - 1;w;p1) ∈ W(A;a.B[a]))
9. t : coW-dom(a.B[a];w)
10. p2 : coPath(a.B[a];coW-item(w;t);n - 1)
⊢ coW-item(w;t) ∈ W(A;a.B[a])

2
.....wf.....
1. A : 𝕌'
2. B : A ⟶ Type
3. W(A;a.B[a]) ⊆r coW(A;a.B[a])
4. n : ℤ
5. 0 < n
6. w : W(A;a.B[a])
7. ¬(n = 0 ∈ ℤ)
8. ∀w:W(A;a.B[a]). ∀p1:coPath(a.B[a];w;n - 1).  (coPath-at(n - 1;w;p1) ∈ W(A;a.B[a]))
9. t : coW-dom(a.B[a];w)
10. p2 : coPath(a.B[a];coW-item(w;t);n - 1)
⊢ p2 ∈ coPath(a.B[a];coW-item(w;t);n - 1)

Latex:

Latex:
.....eq aux..... 1. A : \mBbbU{}' 2. B : A {}\mrightarrow{} Type 3. W(A;a.B[a]) \msubseteq{}r coW(A;a.B[a]) 4. n : \mBbbZ{} 5. 0 < n 6. w : W(A;a.B[a]) 7. \mneg{}(n = 0) 8. \mforall{}w:W(A;a.B[a]). \mforall{}p1:coPath(a.B[a];w;n - 1). (coPath-at(n - 1;w;p1) \mmember{} W(A;a.B[a])) 9. t : coW-dom(a.B[a];w) 10. p2 : coPath(a.B[a];coW-item(w;t);n - 1) \mvdash{} coPath-at(n - 1;coW-item(w;t);p2) \mmember{} W(A;a.B[a]) By Latex: BHyp -3 Home Index