Estimating the remainder of an alternating \(p\)-series revisited
-
Vito Lampret
vito.lampret@guest.arnes.si
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DOI:
https://doi.org/10.56754/0719-0646.2701.075Abstract
For the \( n \)th remainder \( R_n(p):=
\sum_{k=n+1}^{\infty}(-1)^{k+1}k^{-p} \) of an alternating
\( p \)-series, several asymptotic estimates are presented. For
example, for any integer \( n \ge 3 \), and \( p \in \mathbb{R}^+ \), we have
\[
R_n(p) = \frac{(-1)^n}{2\left(2\left\lfloor \frac{n+1}{2} \right\rfloor\right)^p} -
\frac{p}{4\left(2\left\lfloor \frac{n+1}{2} \right\rfloor\right)^{p+1}}
+ \varepsilon_n^*(p)
\]
and
\[
\left| \varepsilon_n^*(p) \right| < \frac{p(p+1)}{5\,(n-2)^{p+2}},
\]
where \( \lfloor x \rfloor \) denotes the integer part (the floor) of \( x \).
Keywords
Mathematics Subject Classification:
O. Echi, A. Khalfallah, and D. Kroumi, “Estimating the remainder of an alternating series using hypergeometric functions,” J. Math. Inequal., vol. 17, no. 2, pp. 569–580, 2023, doi: https://doi.org/10.7153/jmi-2023-17-36">10.7153/jmi-2023-17-36
V. Lampret, “Efficient estimate of the remainder for the Dirichlet function ( eta(p) ) for ( p in mathbb{R}^+ ),” Miskolc Math. Notes, vol. 21, no. 1, pp. 241–247, 2020, doi: https://doi.org/10.18514/mmn.2020.2877">10.18514/mmn.2020.2877
A. Sîntămărian, “A new proof for estimating the remainder of the alternating harmonic series,” Creat. Math. Inform, vol. 21, no. 2, pp. 221–225, 2012.
A. Sîntămărian, “Sharp estimates regarding the remainder of the alternating harmonic series,” Math. Inequal. Appl., vol. 18, no. 1, pp. 347–352, 2015, doi: https://doi.org/10.7153/mia-18-24">10.7153/mia-18-24
L. Tóth and J. Bukor, “On the alternating series ( 1 - frac{1}{2} + frac{1}{3} - frac{1}{4} + cdots ),” J. Math. Anal. Appl., vol. 282, no. 1, pp. 21–25, 2003, doi: https://doi.org/10.1016/S0022-247X(02)00344-X
S. Wolfram, “Mathematica 7.0,” (2008). Wolfram Research, Inc.
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