Proof of Nuprl Lemma : decidable_

Step * 1 1 2 1 2 of Lemma decidable__alle-lt

.....decidable?.....
1. es : EO@i'
2. WellFnd{i'}(E;x,y.(x <loc y))
3. j : E@i
4. ∀k:E. ((k <loc j) ⇒ (∀[P:{e:E| loc(e) = loc(k) ∈ Id}  ─→ ℙ]. (∀e@loc(k).Dec(P[e]) ⇒ Dec(∀e<k.P[e]))))@i'
5. [P] : {e:E| loc(e) = loc(j) ∈ Id}  ─→ ℙ
6. ∀e@loc(j).Dec(P[e])@i
7. ¬↑first(j)
8. ∀[P:{e:E| loc(e) = loc(pred(j)) ∈ Id}  ─→ ℙ]. (∀e@loc(pred(j)).Dec(P[e]) ⇒ Dec(∀e<pred(j).P[e]))
9. Dec(∀e<pred(j).P[e])
⊢ Dec(P[pred(j)] ∧ ∀e<pred(j).P[e] supposing ¬False)
BY
{ ((Unfold `alle-at` 6 THEN (InstHyp [pred(j)] 6)⋅) THENA Auto) }

1
1. es : EO@i'
2. WellFnd{i'}(E;x,y.(x <loc y))
3. j : E@i
4. ∀k:E. ((k <loc j) ⇒ (∀[P:{e:E| loc(e) = loc(k) ∈ Id}  ─→ ℙ]. (∀e@loc(k).Dec(P[e]) ⇒ Dec(∀e<k.P[e]))))@i'
5. [P] : {e:E| loc(e) = loc(j) ∈ Id}  ─→ ℙ
6. ∀e:E. ((loc(e) = loc(j) ∈ Id) ⇒ Dec(P[e]))@i
7. ¬↑first(j)
8. ∀[P:{e:E| loc(e) = loc(pred(j)) ∈ Id}  ─→ ℙ]. (∀e@loc(pred(j)).Dec(P[e]) ⇒ Dec(∀e<pred(j).P[e]))
9. Dec(∀e<pred(j).P[e])
10. Dec(P[pred(j)])
⊢ Dec(P[pred(j)] ∧ ∀e<pred(j).P[e] supposing ¬False)

Latex:

.....decidable?..... 1. es : EO@i' 2. WellFnd\{i'\}(E;x,y.(x <loc y)) 3. j : E@i 4. \mforall{}k:E ((k <loc j) {}\mRightarrow{} (\mforall{}[P:\{e:E| loc(e) = loc(k)\} {}\mrightarrow{} \mBbbP{}]. (\mforall{}e@loc(k).Dec(P[e]) {}\mRightarrow{} Dec(\mforall{}e<k.P[e]))))@i' 5. [P] : \{e:E| loc(e) = loc(j)\} {}\mrightarrow{} \mBbbP{} 6. \mforall{}e@loc(j).Dec(P[e])@i 7. \mneg{}\muparrow{}first(j) 8. \mforall{}[P:\{e:E| loc(e) = loc(pred(j))\} {}\mrightarrow{} \mBbbP{}]. (\mforall{}e@loc(pred(j)).Dec(P[e]) {}\mRightarrow{} Dec(\mforall{}e<pred(j).P[e])) 9. Dec(\mforall{}e<pred(j).P[e]) \mvdash{} Dec(P[pred(j)] \mwedge{} \mforall{}e<pred(j).P[e] supposing \mneg{}False) By ((Unfold `alle-at` 6 THEN (InstHyp [pred(j)] 6)\mcdot{}) THENA Auto) Home Index