An expansion for the sum of a product of an exponential and a Bessel function

Abstract

We examine convergent representations for the sum of a decaying exponential and a Bessel function in the form \[Σn=1∞ e-an(12 bn)\,J(bn),\] where J(x) is the Bessel function of the first kind of order >-1/2 and a, b are positive parameters. By means of a double Mellin-Barnes integral representation we obtain a convergent asymptotic expansion that enables the evaluation of this sum in the limit a 0 with b<2π fixed. A similar result is derived for the sum when the Bessel function is replaced by the modified Bessel function K(x). The alternating versions of these sums are also mentioned.