Proof of Nuprl Lemma : lconnects-transitive

Step * 2 1 2 2 1 1 2 1 of Lemma lconnects-transitive

1. u : IdLnk@i
2. v : IdLnk List@i

3. ∀q:IdLnk List. ∀i,j,k:Id.  (∃r:IdLnk List. lconnects(r;i;k)) supposing (lconnects(q;j;k) and lconnects(v;i;j))@i

4. q : IdLnk List@i
5. i : Id@i
6. j : Id@i
7. k : Id@i
8. lpath([u / v])
9. ((||v|| + 1) = 0 ∈ ℤ) ⇒ (i = j ∈ Id)
10. lconnects(q;j;k)
11. i = source(u) ∈ Id
12. j = destination(last([u / v])) ∈ Id
13. u1 : IdLnk
14. v1 : IdLnk List
15. lpath(v1)

16. (destination(u1) = source(hd(v1)) ∈ Id) ∧ (¬(hd(v1) = lnk-inv(u1) ∈ IdLnk)) supposing ¬(||v1|| = 0 ∈ ℤ)

17. ((||v1|| + 1) = 0 ∈ ℤ) ⇒ (destination(u) = k ∈ Id)
18. u1 = lnk-inv(u) ∈ IdLnk
19. destination(u1) = source(u) ∈ Id
20. destination(u) = source(u1) ∈ Id
21. k = destination(last([u1 / v1])) ∈ Id
⊢ (||v1|| = 0 ∈ ℤ) ⇒ (i = k ∈ Id)
BY
{ (DVar `v1' THEN (Unfold `last` (-1)) THEN All Reduce THEN Auto')⋅ }

Latex:

1. u : IdLnk@i 2. v : IdLnk List@i 3. \mforall{}q:IdLnk List. \mforall{}i,j,k:Id. (\mexists{}r:IdLnk List. lconnects(r;i;k)) supposing (lconnects(q;j;k) and lconnects(v;i;j))@i 4. q : IdLnk List@i 5. i : Id@i 6. j : Id@i 7. k : Id@i 8. lpath([u / v]) 9. ((||v|| + 1) = 0) {}\mRightarrow{} (i = j) 10. lconnects(q;j;k) 11. i = source(u) 12. j = destination(last([u / v])) 13. u1 : IdLnk 14. v1 : IdLnk List 15. lpath(v1) 16. (destination(u1) = source(hd(v1))) \mwedge{} (\mneg{}(hd(v1) = lnk-inv(u1))) supposing \mneg{}(||v1|| = 0) 17. ((||v1|| + 1) = 0) {}\mRightarrow{} (destination(u) = k) 18. u1 = lnk-inv(u) 19. destination(u1) = source(u) 20. destination(u) = source(u1) 21. k = destination(last([u1 / v1])) \mvdash{} (||v1|| = 0) {}\mRightarrow{} (i = k) By (DVar `v1' THEN (Unfold `last` (-1)) THEN All Reduce THEN Auto')\mcdot{} Home Index