Proof of Nuprl Lemma : name-morph-extend

Step * 1 2 2 1 2 of Lemma name-morph-extend_wf

1. I : Cname List
2. J : Cname List
3. f : name-morph(I;J)
4. v : Cname
5. ¬(v ∈ I)
6. fresh-cname(I) = v ∈ {x:Cname| ¬(x ∈ I)}
7. v1 : Cname
8. ¬(v1 ∈ J)
9. fresh-cname(J) = v1 ∈ {x:Cname| ¬(x ∈ J)}
10. extd-nameset(J) ⊆r extd-nameset([v1 / J])
11. i : nameset([v / I])
12. j : nameset([v / I])
13. j ≠ v
14. i = v ∈ ℤ
⊢ (↑tt) ⇒ (↑isname(f j)) ⇒ (v1 = (f j) ∈ extd-nameset([v1 / J])) ⇒ (i = j ∈ nameset([v / I]))
BY
{ TACTIC:(Assert j ∈ nameset(I) BY
(DVar `j' THEN (RW ListC (-3) THENA Auto) THEN D -3 THEN Auto)) }

1
1. I : Cname List
2. J : Cname List
3. f : name-morph(I;J)
4. v : Cname
5. ¬(v ∈ I)
6. fresh-cname(I) = v ∈ {x:Cname| ¬(x ∈ I)}
7. v1 : Cname
8. ¬(v1 ∈ J)
9. fresh-cname(J) = v1 ∈ {x:Cname| ¬(x ∈ J)}
10. extd-nameset(J) ⊆r extd-nameset([v1 / J])
11. i : nameset([v / I])
12. j : nameset([v / I])
13. j ≠ v
14. i = v ∈ ℤ
15. j ∈ nameset(I)
⊢ (↑tt) ⇒ (↑isname(f j)) ⇒ (v1 = (f j) ∈ extd-nameset([v1 / J])) ⇒ (i = j ∈ nameset([v / I]))

Latex:

Latex:
1. I : Cname List 2. J : Cname List 3. f : name-morph(I;J) 4. v : Cname 5. \mneg{}(v \mmember{} I) 6. fresh-cname(I) = v 7. v1 : Cname 8. \mneg{}(v1 \mmember{} J) 9. fresh-cname(J) = v1 10. extd-nameset(J) \msubseteq{}r extd-nameset([v1 / J]) 11. i : nameset([v / I]) 12. j : nameset([v / I]) 13. j \mneq{} v 14. i = v \mvdash{} (\muparrow{}tt) {}\mRightarrow{} (\muparrow{}isname(f j)) {}\mRightarrow{} (v1 = (f j)) {}\mRightarrow{} (i = j) By Latex: TACTIC:(Assert j \mmember{} nameset(I) BY (DVar `j' THEN (RW ListC (-3) THENA Auto) THEN D -3 THEN Auto)) Home Index