Proof of Nuprl Lemma : integral-from-Taylor

Step * 2 of Lemma integral-from-Taylor

1. a : ℝ
2. t : {t:ℝ| r0 < t}
3. F : ℕ ⟶ (a - t, a + t) ⟶ℝ
4. ∀k:ℕ. ∀x,y:{x:ℝ| x ∈ (a - t, a + t)} . ((x = y) ⇒ (F[k;x] = F[k;y]))
5. infinite-deriv-seq((a - t, a + t);i,x.F[i;x])

6. ∀r:{r:ℝ| (r0 ≤ r) ∧ (r < t)} . lim k→∞.r^k * (F[k + 1;x]/r((k)!)) = λx.r0 for x ∈ (a - t, a + t)

7. b : {b:ℝ| b ∈ (a - t, a + t)}

8. lim n→∞.b_∫^-x Σ{(F[i;a]/r((i)!)) * t - a^i | 0≤i≤n} dt = λx.b_∫^-x F[0;t] dt for x ∈ (a - t, a + t)

9. lim n→∞.b_∫^-x Σ{(F[i;a]/r((i)!)) * t - a^i | 0≤i≤n} dt = λy.b_∫^-y F[0;t] dt for x ∈ (a - t, a + t)

⇒

 lim n→∞.Σ{(F[i;a]/r((i)!)) * (x - a^i + 1 - b - a^i + 1/r(i + 1)) | 0≤i≤n} = λy.b_∫^-y F[0;t] dt for x ∈ (a - t, a

+ t)

⊢ lim n→∞.Σ{(F[i;a]/r((i)!)) * (x - a^i + 1 - b - a^i + 1/r(i + 1)) | 0≤i≤n} = λx.b_∫^-x F[0;t] dt for x ∈ (a - t, a + t)

BY
{ (D -1 THEN Try (Trivial)) }

Latex:

Latex:
1. a : \mBbbR{} 2. t : \{t:\mBbbR{}| r0 < t\} 3. F : \mBbbN{} {}\mrightarrow{} (a - t, a + t) {}\mrightarrow{}\mBbbR{} 4. \mforall{}k:\mBbbN{}. \mforall{}x,y:\{x:\mBbbR{}| x \mmember{} (a - t, a + t)\} . ((x = y) {}\mRightarrow{} (F[k;x] = F[k;y])) 5. infinite-deriv-seq((a - t, a + t);i,x.F[i;x]) 6. \mforall{}r:\{r:\mBbbR{}| (r0 \mleq{} r) \mwedge{} (r < t)\} . lim k\mrightarrow{}\minfty{}.r\^{}k * (F[k + 1;x]/r((k)!)) = \mlambda{}x.r0 for x \mmember{} (a - t, a + t) 7. b : \{b:\mBbbR{}| b \mmember{} (a - t, a + t)\} 8. lim n\mrightarrow{}\minfty{}.b\_\mint{}\msupminus{}x \mSigma{}\{(F[i;a]/r((i)!)) * t - a\^{}i | 0\mleq{}i\mleq{}n\} dt = \mlambda{}x.b\_\mint{}\msupminus{}x F[0;t] dt for x \mmember{} (a - t, a + t) 9. lim n\mrightarrow{}\minfty{}.b\_\mint{}\msupminus{}x \mSigma{}\{(F[i;a]/r((i)!)) * t - a\^{}i | 0\mleq{}i\mleq{}n\} dt = \mlambda{}y.b\_\mint{}\msupminus{}y F[0;t] dt for x \mmember{} (a - t, a + t) {}\mRightarrow{} lim n\mrightarrow{}\minfty{}.\mSigma{}\{(F[i;a]/r((i)!)) * (x - a\^{}i + 1 - b - a\^{}i + 1/r(i + 1)) | 0\mleq{}i\mleq{}n\} = \mlambda{}y.b\_\mint{}\msupminus{}y F[0;t] dt for x \mmember{} (a - t, a + t) \mvdash{} lim n\mrightarrow{}\minfty{}.\mSigma{}\{(F[i;a]/r((i)!)) * (x - a\^{}i + 1 - b - a\^{}i + 1/r(i + 1)) | 0\mleq{}i\mleq{}n\} = \mlambda{}x.b\_\mint{}\msupminus{}x F[0;t] dt for x \mmember{} (a - t, a + t) By Latex: (D -1 THEN Try (Trivial)) Home Index