Proof of Nuprl Lemma : oal_lt

Step * 1 2 1 of Lemma oal_lt_trans

1. s : LOSet
2. g : OCMon
3. a : |oal(s;g)|
4. b : |oal(s;g)|
5. c : |oal(s;g)|
6. k1 : |s|
7. ∀k':|s|. ((k1 <s k') ⇒ ((a[k']) = (b[k']) ∈ |g|))
8. (a[k1]) < (b[k1])
9. k : |s|
10. ∀k':|s|. ((k <s k') ⇒ ((b[k']) = (c[k']) ∈ |g|))
11. (b[k]) < (c[k])
12. ¬(k ≤ k1)
13. k' : |s|
14. k <s k'
⊢ (a[k']) = (c[k']) ∈ |g|
BY
{ ((OnMHyps [10;7] (InstHyp [k'])
THEN Try RelRST ) THEN Auto) }

Latex:

Latex:
1. s : LOSet 2. g : OCMon 3. a : |oal(s;g)| 4. b : |oal(s;g)| 5. c : |oal(s;g)| 6. k1 : |s| 7. \mforall{}k':|s|. ((k1 <s k') {}\mRightarrow{} ((a[k']) = (b[k']))) 8. (a[k1]) < (b[k1]) 9. k : |s| 10. \mforall{}k':|s|. ((k <s k') {}\mRightarrow{} ((b[k']) = (c[k']))) 11. (b[k]) < (c[k]) 12. \mneg{}(k \mleq{} k1) 13. k' : |s| 14. k <s k' \mvdash{} (a[k']) = (c[k']) By Latex: ((OnMHyps [10;7] (InstHyp [k']) THEN Try RelRST ) THEN Auto) Home Index