On the mean value of the generalized Dirichlet L-functions with the weight of the Gauss Sums

Abstract

Let q3 be an integer, denote a Dirichlet character modulo q, for any real number a 0, we define the generalized Dirichlet L-functions L(s,,a)=Σn=1∞(n)(n+a)s, where s=σ+it with σ>1 and t both real. It can be extended to all s by analytic continuation. For any integer m, the famous Gauss sum G(m,) is defined as follows: G(m,)=Σa=1q(a)e(amq), where e(y)=e2π iy. The main purpose of this paper is to use the analytic method to study the mean value properties of the generalized Dirichlet L-functions with the weight of the Gauss Sums, and obtain a sharp asymptotic formula.