Proof of Nuprl Lemma : lpath

Step * of Lemma lpath_cons

∀[l:IdLnk]. ∀[p:IdLnk List].
uiff(lpath([l / p]);lpath(p)

  ∧ (destination(l) = source(hd(p)) ∈ Id) ∧ (¬(hd(p) = lnk-inv(l) ∈ IdLnk)) supposing ¬(||p|| = 0 ∈ ℤ))

BY
{ Auto' }

1
1. l : IdLnk
2. p : IdLnk List
3. lpath([l / p])
⊢ lpath(p)

2
1. l : IdLnk
2. p : IdLnk List
3. lpath([l / p])
4. ¬(||p|| = 0 ∈ ℤ)
⊢ destination(l) = source(hd(p)) ∈ Id

3
1. l : IdLnk
2. p : IdLnk List
3. lpath([l / p])
4. ¬(||p|| = 0 ∈ ℤ)
⊢ ¬(hd(p) = lnk-inv(l) ∈ IdLnk)

4
1. l : IdLnk
2. p : IdLnk List
3. lpath(p)

4. (destination(l) = source(hd(p)) ∈ Id) ∧ (¬(hd(p) = lnk-inv(l) ∈ IdLnk)) supposing ¬(||p|| = 0 ∈ ℤ)

⊢ lpath([l / p])

Latex:

Latex:
\mforall{}[l:IdLnk]. \mforall{}[p:IdLnk List]. uiff(lpath([l / p]);lpath(p) \mwedge{} (destination(l) = source(hd(p))) \mwedge{} (\mneg{}(hd(p) = lnk-inv(l))) supposing \mneg{}(||p|| = 0)) By Latex: Auto' Home Index