Asymptotics of the shifted finite differences of the overpatition function and a problem of Wang--Xie--Zhang

Abstract

Let p(n) denote the overpartition function, and for j∈ N, rj denote the r-fold applications of the shifted difference operator j defined by j(a)(n):=a(n)-a(n-j). The main goal of this paper is to derive an asymptotic expansion of rj(p)(n) with an effective error bound which subsequently gives an answer to a problem of Wang, Xie, and Zhang. In order to get the asymptotics of rj(p)(n), we derive an asymptotic expansion of the shifted overpartition function p(n+k) for any integer k≠ 0.

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