On the non-vanishing of certain Dirichlet series

Abstract

Given k∈ N, we study the vanishing of the Dirichlet series Dk(s,f):=Σn≥1 dk(n)f(n)n-s at the point s=1, where f is a periodic function modulo a prime p. We show that if (k,p-1)=1 or (k,p-1)=2 and p 3 4, then there are no odd rational-valued functions f 0 such that Dk(1,f)=0, whereas in all other cases there are examples of odd functions f such that Dk(1,f)=0. As a consequence, we obtain, for example, that the set of values L(1,)2, where ranges over odd characters mod p, are linearly independent over Q.