Proof of Nuprl Lemma : uniform-continuity-pi-search-prop1

Step * 1 1 1 1 of Lemma uniform-continuity-pi-search-prop1

1. P : ℕ ⟶ ℙ
2. m : ℕ
⊢ ∀x:ℕ
    ((∃n:{x..(x + m) + 1^-}. P[n])
    ⇒ (∀G:∀m:ℕx + m. Dec(P[m])
          (uniform-continuity-pi-search(
           G;
           x + m;x) ∈ {k:{x..(x + m) + 1^-}| P[k] ∧ (∀m:{x..k^-}. (¬P[m]))} )))
BY
{ (NatInd (-1) THEN (UnivCD THENA Auto) THEN RecUnfold `uniform-continuity-pi-search` 0 THEN AutoSplit) }

1
1. P : ℕ ⟶ ℙ
2. m : ℤ
3. x : ℕ
4. ∃n:{x..(x + 0) + 1^-}. P[n]
5. G : ∀m:ℕx + 0. Dec(P[m])
6. (x + 0) ≤ x
⊢ x + 0 ∈ {k:{x..(x + 0) + 1^-}| P[k] ∧ (∀m:{x..k^-}. (¬P[m]))}

2
1. P : ℕ ⟶ ℙ
2. m : ℤ
3. 0 < m
4. ∀x:ℕ
     ((∃n:{x..(x + (m - 1)) + 1^-}. P[n])
     ⇒ (∀G:∀m:ℕx + (m - 1). Dec(P[m])
           (uniform-continuity-pi-search(
            G;

            x + (m - 1);x) ∈ {k:{x..(x + (m - 1)) + 1^-}| P[k] ∧ (∀m:{x..k^-}. (¬P[m]))} )))

5. x : ℕ
6. ¬((x + m) ≤ x)
7. ∃n:{x..(x + m) + 1^-}. P[n]
8. G : ∀m:ℕx + m. Dec(P[m])

⊢ if isl(G x) then x else uniform-continuity-pi-search(G;x + m;x + 1) fi  ∈ {k:{x..(x + m) + 1^-}|

                                                                             P[k] ∧ (∀m:{x..k^-}. (¬P[m]))}

Latex:

Latex:
1. P : \mBbbN{} {}\mrightarrow{} \mBbbP{} 2. m : \mBbbN{} \mvdash{} \mforall{}x:\mBbbN{} ((\mexists{}n:\{x..(x + m) + 1\msupminus{}\}. P[n]) {}\mRightarrow{} (\mforall{}G:\mforall{}m:\mBbbN{}x + m. Dec(P[m]) (uniform-continuity-pi-search( G; x + m;x) \mmember{} \{k:\{x..(x + m) + 1\msupminus{}\}| P[k] \mwedge{} (\mforall{}m:\{x..k\msupminus{}\}. (\mneg{}P[m]))\} ))) By Latex: (NatInd (-1) THEN (UnivCD THENA Auto) THEN RecUnfold `uniform-continuity-pi-search` 0 THEN AutoSplit) Home Index