On the meromorphic continuation of Beatty Zeta-Functions and Sturmian Dirichlet series

Abstract

For a positive irrational number α, we study the ordinary Dirichlet series ζα(s) = Σn≥1 α n-s and Sα(s) = Σn≥1 (α n - α (n-1))n-s. We prove relations between them and Jα(s)=Σn≥1(α n-12)n-s. Motivated by the previous work of Hardy and Littlewood, Hecke and others regarding Jα, we show that ζα and Sα can be continued analytically beyond the imaginary axis except for a simple pole at s=1. Based on the latter results, we also prove that the series ζα(s;β)=Σn≥0(α n+β)-s can be continued analytically beyond the imaginary axis except for a simple pole at s=1.