Author:
Pan Zhenjiang,Wu Zhengang
Abstract
<abstract><p>In recent years, many mathematicians researched infinite reciprocal sums of various sequences and evaluated their value by the asymptotic formulas. We study the asymptotic formulas of the infinite reciprocal sums formed as $ \left(\sum^{\infty}_{k = n} \frac{1}{k^r(k+t)^s} \right)^{-1} $ for $ r, s, t \in \mathbb{N^+} $, where the asymptotic formulas are polynomials.</p></abstract>
Publisher
American Institute of Mathematical Sciences (AIMS)