Proof of Nuprl Lemma : Taylor-series-converges-everywhere

Step * 3 1 1 1 1 of Lemma Taylor-series-converges-everywhere

.....wf.....
1. a : ℝ
2. F : ℕ ⟶ ℝ ⟶ ℝ
3. ∀k:ℕ. ∀x,y:ℝ. ((x = y) ⇒ (F[k;x] = F[k;y]))
4. infinite-deriv-seq((-∞, ∞);i,x.F[i;x])
5. ∀r:{r:ℝ| r0 ≤ r} . lim k→∞.r^k * (F[k + 1;x]/r((k)!)) = λx.r0 for x ∈ (-∞, ∞)
6. m : ℕ⁺
7. icompact([r(-m), r(m)])
8. t : {t:ℝ| r0 < t}
9. [r(-m), r(m)] ⊆ (a - t, a + t)
10. r : {r:ℝ| (r0 ≤ r) ∧ (r < t)}
11. m1 : {m:ℕ⁺| icompact(i-approx((a - t, a + t);m))}
12. n : ℕ⁺
13. i-approx((a - t, a + t);m1) ⊆ i-approx((-∞, ∞);n)
⊢ n ∈ {m:ℕ⁺| icompact(i-approx((-∞, ∞);m))}
BY
{ ((MemTypeCD THEN Auto) THEN D 0 THEN Auto) }

1
1. a : ℝ
2. F : ℕ ⟶ ℝ ⟶ ℝ
3. ∀k:ℕ. ∀x,y:ℝ. ((x = y) ⇒ (F[k;x] = F[k;y]))
4. infinite-deriv-seq((-∞, ∞);i,x.F[i;x])
5. ∀r:{r:ℝ| r0 ≤ r} . lim k→∞.r^k * (F[k + 1;x]/r((k)!)) = λx.r0 for x ∈ (-∞, ∞)
6. m : ℕ⁺
7. icompact([r(-m), r(m)])
8. t : {t:ℝ| r0 < t}
9. [r(-m), r(m)] ⊆ (a - t, a + t)
10. r : {r:ℝ| (r0 ≤ r) ∧ (r < t)}
11. m1 : {m:ℕ⁺| icompact(i-approx((a - t, a + t);m))}
12. n : ℕ⁺
13. i-approx((a - t, a + t);m1) ⊆ i-approx((-∞, ∞);n)
⊢ i-nonvoid(i-approx((-∞, ∞);n))

Latex:

Latex:
.....wf..... 1. a : \mBbbR{} 2. F : \mBbbN{} {}\mrightarrow{} \mBbbR{} {}\mrightarrow{} \mBbbR{} 3. \mforall{}k:\mBbbN{}. \mforall{}x,y:\mBbbR{}. ((x = y) {}\mRightarrow{} (F[k;x] = F[k;y])) 4. infinite-deriv-seq((-\minfty{}, \minfty{});i,x.F[i;x]) 5. \mforall{}r:\{r:\mBbbR{}| r0 \mleq{} r\} . lim k\mrightarrow{}\minfty{}.r\^{}k * (F[k + 1;x]/r((k)!)) = \mlambda{}x.r0 for x \mmember{} (-\minfty{}, \minfty{}) 6. m : \mBbbN{}\msupplus{} 7. icompact([r(-m), r(m)]) 8. t : \{t:\mBbbR{}| r0 < t\} 9. [r(-m), r(m)] \msubseteq{} (a - t, a + t) 10. r : \{r:\mBbbR{}| (r0 \mleq{} r) \mwedge{} (r < t)\} 11. m1 : \{m:\mBbbN{}\msupplus{}| icompact(i-approx((a - t, a + t);m))\} 12. n : \mBbbN{}\msupplus{} 13. i-approx((a - t, a + t);m1) \msubseteq{} i-approx((-\minfty{}, \minfty{});n) \mvdash{} n \mmember{} \{m:\mBbbN{}\msupplus{}| icompact(i-approx((-\minfty{}, \minfty{});m))\} By Latex: ((MemTypeCD THEN Auto) THEN D 0 THEN Auto) Home Index