Zeros of Dirichlet series with periodic coefficients

Abstract

Let a=(an)n 1 be a periodic sequence, Fa(s) the meromorphic continuation of Σn 1 an/ns, and Na(σ1, σ2, T) the number of zeros of Fa(s), counted with their multiplicities, in the rectangle σ1 < s < σ2, | s | T. We extend previous results of Laurincikas, Kaczorowski, Kulas, and Steuding, by showing that if Fa(s) is not of the form P(s) L (s), where P(s) is a Dirichlet polynomial and L(s) a Dirichlet L-function, then there exists an η=η(a)>0 such that for all 1/2 < σ1 < σ2 < 1+η, we have c1 T Na(σ1, σ2, T) c2 T for sufficiently large T, and suitable positive constants c1 and c2 depending on a, σ1, and σ2.