A divisor function of Wigert and higher degree forms

Abstract

Let k∈N. Wigert's divisor function d(1k)(j) counts the number of representations of j of the form mk+mn with m≥1 , n≥0. Let Fk(s) denote the Dirichlet series of d(1k)(j). While F2(s) is essentially a well-known special case of the Euler-Zagier double zeta function, and hence well-studied, very little is known about Fk(s) for k>2. We offer three new representations for Fk(s) for k≥2, one of which is an analogue of the Chowla-Selberg formula as well as of a formula of Atkinson. The meromorphicity of Fk(s) is also discussed. The special value F3(32) is expressed in terms of an infinite series of Bessel functions and a generalized divisor function.