Proof of Nuprl Lemma : eo-strict-forward-before

Step * 1 2 1 1 of Lemma eo-strict-forward-before

1. Info : Type
2. es : EO+(Info)
3. e : E@i
4. ∀e1:E. ((e1 < e) ⇒ (∀b:E. ((b <loc e1) ⇒ (before(e1) = (b, e1) ∈ (E List)))))
5. b : E@i
6. (b <loc e)@i
7. e ∈ E
8. loc(e) = loc(b) ∈ Id
9. ¬↑first(e)
10. ¬(pred(e) = b ∈ E)
11. before(pred(e)) = (b, pred(e)) ∈ (E List)
12. pred(e) ∈ E
13. ¬↑first(e)
14. E ⊆r E
⊢ (before(pred(e)) @ [pred(e)]) = (b, e) ∈ (E List)
BY
{ Assert ⌈pred(e) = pred(e) ∈ E⌉⋅ }

1
.....assertion.....
1. Info : Type
2. es : EO+(Info)
3. e : E@i
4. ∀e1:E. ((e1 < e) ⇒ (∀b:E. ((b <loc e1) ⇒ (before(e1) = (b, e1) ∈ (E List)))))
5. b : E@i
6. (b <loc e)@i
7. e ∈ E
8. loc(e) = loc(b) ∈ Id
9. ¬↑first(e)
10. ¬(pred(e) = b ∈ E)
11. before(pred(e)) = (b, pred(e)) ∈ (E List)
12. pred(e) ∈ E
13. ¬↑first(e)
14. E ⊆r E
⊢ pred(e) = pred(e) ∈ E

2
1. Info : Type
2. es : EO+(Info)
3. e : E@i
4. ∀e1:E. ((e1 < e) ⇒ (∀b:E. ((b <loc e1) ⇒ (before(e1) = (b, e1) ∈ (E List)))))
5. b : E@i
6. (b <loc e)@i
7. e ∈ E
8. loc(e) = loc(b) ∈ Id
9. ¬↑first(e)
10. ¬(pred(e) = b ∈ E)
11. before(pred(e)) = (b, pred(e)) ∈ (E List)
12. pred(e) ∈ E
13. ¬↑first(e)
14. E ⊆r E
15. pred(e) = pred(e) ∈ E
⊢ (before(pred(e)) @ [pred(e)]) = (b, e) ∈ (E List)

Latex:

1. Info : Type 2. es : EO+(Info) 3. e : E@i 4. \mforall{}e1:E. ((e1 < e) {}\mRightarrow{} (\mforall{}b:E. ((b <loc e1) {}\mRightarrow{} (before(e1) = (b, e1))))) 5. b : E@i 6. (b <loc e)@i 7. e \mmember{} E 8. loc(e) = loc(b) 9. \mneg{}\muparrow{}first(e) 10. \mneg{}(pred(e) = b) 11. before(pred(e)) = (b, pred(e)) 12. pred(e) \mmember{} E 13. \mneg{}\muparrow{}first(e) 14. E \msubseteq{}r E \mvdash{} (before(pred(e)) @ [pred(e)]) = (b, e) By Assert \mkleeneopen{}pred(e) = pred(e)\mkleeneclose{}\mcdot{} Home Index