On certain zeta functions associated with Beatty sequences

Abstract

Let α>1 be an irrational number of finite type τ. In this paper, we introduce and study a zeta function Zα(r,q;s) that is closely related to the Lipschitz-Lerch zeta function and is naturally associated with the Beatty sequence B(α):=(α m)m∈ N. If r is an element of the lattice Z+ Zα-1, then Zα(r,q;s) continues analytically to the half-plane \σ>-1/τ\ with its only singularity being a simple pole at s=1. If r∈ Z+ Zα-1, then Zα(r,q;s) extends analytically to the half-plane \σ>1-1/(2τ2)\ and has no singularity in that region.