An asymptotic expansion for a Lambert series associated to the symmetric square L-function

Abstract

Hafner and Stopple proved a conjecture of Zagier, that the inverse Mellin transform of the symmetric square L-function associated to the Ramanujan tau function has an asymptotic expansion in terms of the non-trivial zeros of the Riemann zeta function ζ(s). Later, Chakraborty, Kanemitsu and the second author extended this phenomenon for any Hecke eigenform over the full modular group. In this paper, we study an asymptotic expansion of the Lambert series equation* yk Σn=1∞ λf( n2 ) (- ny), as\,\, y → 0+, equation* where λf(n) is the nth Fourier coefficient of a Hecke eigen form f(z) of weight k over the full modular group.