Dirichlet series associated to sum-of-digits functions

Abstract

We study the Dirichlet series Fb(s)=Σn=1∞ db(n)n-s, where db(n) is the sum of the base-b digits of the integer n, and Gb(s)=Σn=1∞ Sb(n)n-s, where Sb(n)=Σm=1n-1db(m) is the summatory function of db(n). We show that Fb(s) and Gb(s) have continuations to the plane C as meromorphic functions of order at least 2, determine the locations of all poles, and give explicit formulas for the residues at the poles. We give a continuous interpolation of the sum-of-digits functions db and Sb to non-integer bases using a formula of Delange, and show that the associated Dirichlet series have a meromorphic continuation at least one unit left of their abscissa of absolute convergence.