English

Explicit transformations of certain Lambert series

Number Theory 2022-05-06 v2 Classical Analysis and ODEs

Abstract

An exact transformation, which we call the \emph{master identity}, is obtained for the first time for the series n=1σa(n)eny\sum_{n=1}^{\infty}\sigma_{a}(n)e^{-ny} for aCa\in\mathbb{C} and Re(y)>0(y)>0. New modular-type transformations when aa is a non-zero even integer are obtained as its special cases. The precise obstruction to modularity is explicitly seen in these transformations. These include a novel companion to Ramanujan's famous formula for ζ(2m+1)\zeta(2m+1). The Wigert-Bellman identity arising from the a=0a=0 case of the master identity is derived too. When aa is an odd integer, the well-known modular transformations of the Eisenstein series on SL2(Z)\textup{SL}_{2}\left(\mathbb{Z}\right), that of the Dedekind eta function as well as Ramanujan's formula for ζ(2m+1)\zeta(2m+1) are derived from the master identity. The latter identity itself is derived using Guinand's version of the Vorono\"{\dotlessi} summation formula and an integral evaluation of N.~S.~Koshliakov involving a generalization of the modified Bessel function Kν(z)K_{\nu}(z). Koshliakov's integral evaluation is proved for the first time. It is then generalized using a well-known kernel of Watson to obtain an interesting two-variable generalization of the modified Bessel function. This generalization allows us to obtain a new modular-type transformation involving the sums-of-squares function rk(n)r_k(n). Some results on functions self-reciprocal in the Watson kernel are also obtained.

Keywords

Cite

@article{arxiv.2012.12064,
  title  = {Explicit transformations of certain Lambert series},
  author = {Atul Dixit and Aashita Kesarwani and Rahul Kumar},
  journal= {arXiv preprint arXiv:2012.12064},
  year   = {2022}
}

Comments

The earlier title of the paper is modified to the current one. This paper has now been accepted for publication in 'Research in the Mathematical Sciences'

R2 v1 2026-06-23T21:12:52.438Z