Proof of Nuprl Lemma : es-pplus-first-since-exit

Step * 2 of Lemma es-pplus-first-since-exit

1. es : EO@i'
2. e1 : E@i
3. e2 : {e:E| loc(e) = loc(e1) ∈ Id} @i
4. [Q] : {e:E| loc(e) = loc(e1) ∈ Id}  ─→ ℙ
5. [R] : {e:E| loc(e) = loc(e1) ∈ Id}  ─→ ℙ
6. ∀e:{e:E| loc(e) = loc(e1) ∈ Id} . Dec(Q[e])@i
7. e1 ≤loc e2  ∧ Q[e2] ∧ ∀e∈[e1,e2].R[e] ⇒ Q[e]@i
⊢ [e1,e2]~([a,b].b = first e ≥ a.Q[e] ∧ ∀e∈[a,b).¬R[e])+
BY
{ Assert [e1,e2]~([a,b].b = first e ≥ a.Q[e])+⋅ }

1
.....assertion.....
1. es : EO@i'
2. e1 : E@i
3. e2 : {e:E| loc(e) = loc(e1) ∈ Id} @i
4. [Q] : {e:E| loc(e) = loc(e1) ∈ Id}  ─→ ℙ
5. [R] : {e:E| loc(e) = loc(e1) ∈ Id}  ─→ ℙ
6. ∀e:{e:E| loc(e) = loc(e1) ∈ Id} . Dec(Q[e])@i
7. e1 ≤loc e2  ∧ Q[e2] ∧ ∀e∈[e1,e2].R[e] ⇒ Q[e]@i
⊢ [e1,e2]~([a,b].b = first e ≥ a.Q[e])+

2
1. es : EO@i'
2. e1 : E@i
3. e2 : {e:E| loc(e) = loc(e1) ∈ Id} @i
4. [Q] : {e:E| loc(e) = loc(e1) ∈ Id}  ─→ ℙ
5. [R] : {e:E| loc(e) = loc(e1) ∈ Id}  ─→ ℙ
6. ∀e:{e:E| loc(e) = loc(e1) ∈ Id} . Dec(Q[e])@i
7. e1 ≤loc e2  ∧ Q[e2] ∧ ∀e∈[e1,e2].R[e] ⇒ Q[e]@i
8. [e1,e2]~([a,b].b = first e ≥ a.Q[e])+
⊢ [e1,e2]~([a,b].b = first e ≥ a.Q[e] ∧ ∀e∈[a,b).¬R[e])+

Latex:

1. es : EO@i' 2. e1 : E@i 3. e2 : \{e:E| loc(e) = loc(e1)\} @i 4. [Q] : \{e:E| loc(e) = loc(e1)\} {}\mrightarrow{} \mBbbP{} 5. [R] : \{e:E| loc(e) = loc(e1)\} {}\mrightarrow{} \mBbbP{} 6. \mforall{}e:\{e:E| loc(e) = loc(e1)\} . Dec(Q[e])@i 7. e1 \mleq{}loc e2 \mwedge{} Q[e2] \mwedge{} \mforall{}e\mmember{}[e1,e2].R[e] {}\mRightarrow{} Q[e]@i \mvdash{} [e1,e2]\msim{}([a,b].b = first e \mgeq{} a.Q[e] \mwedge{} \mforall{}e\mmember{}[a,b).\mneg{}R[e])+ By Assert [e1,e2]\msim{}([a,b].b = first e \mgeq{} a.Q[e])+\mcdot{} Home Index