Proof of Nuprl Lemma : fun-converges-iff-cauchy

Step * 2 1 1 1 of Lemma fun-converges-iff-cauchy

1. I : Interval
2. f : ℕ ⟶ I ⟶ℝ
3. ∀x:{x:ℝ| x ∈ I} . ∃y:ℝ. lim n→∞.f[n;x] = y
4. g : x:{x:ℝ| x ∈ I} ⟶ ℝ
5. ∀x:{x:ℝ| x ∈ I} . lim n→∞.f[n;x] = g x
6. m : {m:ℕ⁺| icompact(i-approx(I;m))}
7. k : ℕ⁺

8. ∀k:ℕ⁺. ∃N:ℕ⁺. ∀x:{x:ℝ| x ∈ i-approx(I;m)} . ∀n,m:{N...}.  (|f[n;x] - f[m;x]| ≤ (r1/r(k)))

⊢ ∃N:ℕ⁺. ∀x:{x:ℝ| x ∈ i-approx(I;m)} . ∀n:{N...}.  (|f[n;x] - g x| ≤ (r1/r(k)))
BY
{ ((With ⌜2 * k⌝ (D (-1))⋅ THEN Auto) THEN D -1) }

1
1. I : Interval
2. f : ℕ ⟶ I ⟶ℝ
3. ∀x:{x:ℝ| x ∈ I} . ∃y:ℝ. lim n→∞.f[n;x] = y
4. g : x:{x:ℝ| x ∈ I}  ⟶ ℝ
5. ∀x:{x:ℝ| x ∈ I} . lim n→∞.f[n;x] = g x
6. m : {m:ℕ⁺| icompact(i-approx(I;m))}
7. k : ℕ⁺
8. N : ℕ⁺
9. ∀x:{x:ℝ| x ∈ i-approx(I;m)} . ∀n,m:{N...}.  (|f[n;x] - f[m;x]| ≤ (r1/r(2 * k)))
⊢ ∃N:ℕ⁺. ∀x:{x:ℝ| x ∈ i-approx(I;m)} . ∀n:{N...}.  (|f[n;x] - g x| ≤ (r1/r(k)))

Latex:

Latex:
1. I : Interval 2. f : \mBbbN{} {}\mrightarrow{} I {}\mrightarrow{}\mBbbR{} 3. \mforall{}x:\{x:\mBbbR{}| x \mmember{} I\} . \mexists{}y:\mBbbR{}. lim n\mrightarrow{}\minfty{}.f[n;x] = y 4. g : x:\{x:\mBbbR{}| x \mmember{} I\} {}\mrightarrow{} \mBbbR{} 5. \mforall{}x:\{x:\mBbbR{}| x \mmember{} I\} . lim n\mrightarrow{}\minfty{}.f[n;x] = g x 6. m : \{m:\mBbbN{}\msupplus{}| icompact(i-approx(I;m))\} 7. k : \mBbbN{}\msupplus{} 8. \mforall{}k:\mBbbN{}\msupplus{}. \mexists{}N:\mBbbN{}\msupplus{}. \mforall{}x:\{x:\mBbbR{}| x \mmember{} i-approx(I;m)\} . \mforall{}n,m:\{N...\}. (|f[n;x] - f[m;x]| \mleq{} (r1/r(k))) \mvdash{} \mexists{}N:\mBbbN{}\msupplus{}. \mforall{}x:\{x:\mBbbR{}| x \mmember{} i-approx(I;m)\} . \mforall{}n:\{N...\}. (|f[n;x] - g x| \mleq{} (r1/r(k))) By Latex: ((With \mkleeneopen{}2 * k\mkleeneclose{} (D (-1))\mcdot{} THEN Auto) THEN D -1) Home Index