Proof of Nuprl Lemma : es-locl-iff

Step * 1 2 of Lemma es-locl-iff

1. the_es : EO@i'
2. Trans(E;e,e'.(e <loc e'))
3. SWellFounded((e <loc e'))
4. ∀e,e':E. (loc(e) = loc(e') ∈ Id ⇐⇒ (e <loc e') ∨ (e = e' ∈ E) ∨ (e' <loc e))
5. ∀e:E. (↑first(e) ⇐⇒ ∀e':E. (¬(e' <loc e)))

6. ∀e:E. (pred(e) <loc e) ∧ (∀e':E. (¬((pred(e) <loc e') ∧ (e' <loc e)))) supposing ¬↑first(e)

7. Trans(E;e,e'.(e < e'))
8. SWellFounded((e < e'))
9. ∀e,e':E. ((e <loc e') ⇒ (e < e'))
10. e : E@i
11. e' : E@i
12. (¬↑first(e')) c∧ ((e = pred(e') ∈ E) ∨ (e <loc pred(e')))@i
⊢ (e <loc e')
BY
{ ((D (-1)) THEN (InstHyp [⌈e'⌉] 6)⋅ THEN Auto THEN (D (-3))) }

1
1. the_es : EO@i'
2. Trans(E;e,e'.(e <loc e'))
3. SWellFounded((e <loc e'))
4. ∀e,e':E. (loc(e) = loc(e') ∈ Id ⇐⇒ (e <loc e') ∨ (e = e' ∈ E) ∨ (e' <loc e))
5. ∀e:E. (↑first(e) ⇐⇒ ∀e':E. (¬(e' <loc e)))

6. ∀e:E. (pred(e) <loc e) ∧ (∀e':E. (¬((pred(e) <loc e') ∧ (e' <loc e)))) supposing ¬↑first(e)

7. Trans(E;e,e'.(e < e'))
8. SWellFounded((e < e'))
9. ∀e,e':E. ((e <loc e') ⇒ (e < e'))
10. e : E@i
11. e' : E@i
12. ¬↑first(e')@i
13. e = pred(e') ∈ E@i
14. (pred(e') <loc e')
15. ∀e'@0:E. (¬((pred(e') <loc e'@0) ∧ (e'@0 <loc e')))
⊢ (e <loc e')

2
1. the_es : EO@i'
2. Trans(E;e,e'.(e <loc e'))
3. SWellFounded((e <loc e'))
4. ∀e,e':E. (loc(e) = loc(e') ∈ Id ⇐⇒ (e <loc e') ∨ (e = e' ∈ E) ∨ (e' <loc e))
5. ∀e:E. (↑first(e) ⇐⇒ ∀e':E. (¬(e' <loc e)))

6. ∀e:E. (pred(e) <loc e) ∧ (∀e':E. (¬((pred(e) <loc e') ∧ (e' <loc e)))) supposing ¬↑first(e)

7. Trans(E;e,e'.(e < e'))
8. SWellFounded((e < e'))
9. ∀e,e':E. ((e <loc e') ⇒ (e < e'))
10. e : E@i
11. e' : E@i
12. ¬↑first(e')@i
13. (e <loc pred(e'))@i
14. (pred(e') <loc e')
15. ∀e'@0:E. (¬((pred(e') <loc e'@0) ∧ (e'@0 <loc e')))
⊢ (e <loc e')

Latex:

1. the$_{es}$ : EO@i' 2. Trans(E;e,e'.(e <loc e')) 3. SWellFounded((e <loc e')) 4. \mforall{}e,e':E. (loc(e) = loc(e') \mLeftarrow{}{}\mRightarrow{} (e <loc e') \mvee{} (e = e') \mvee{} (e' <loc e)) 5. \mforall{}e:E. (\muparrow{}first(e) \mLeftarrow{}{}\mRightarrow{} \mforall{}e':E. (\mneg{}(e' <loc e))) 6. \mforall{}e:E. (pred(e) <loc e) \mwedge{} (\mforall{}e':E. (\mneg{}((pred(e) <loc e') \mwedge{} (e' <loc e)))) supposing \mneg{}\muparrow{}first(e) 7. Trans(E;e,e'.(e < e')) 8. SWellFounded((e < e')) 9. \mforall{}e,e':E. ((e <loc e') {}\mRightarrow{} (e < e')) 10. e : E@i 11. e' : E@i 12. (\mneg{}\muparrow{}first(e')) c\mwedge{} ((e = pred(e')) \mvee{} (e <loc pred(e')))@i \mvdash{} (e <loc e') By ((D (-1)) THEN (InstHyp [\mkleeneopen{}e'\mkleeneclose{}] 6)\mcdot{} THEN Auto THEN (D (-3))) Home Index