Zeros of the Epstein zeta function to the right of the critical line

Abstract

Let E(s, Q) be the Epstein zeta function attached to a positive definite quadratic form of discriminant D<0, such that h(D)≥ 2, where h(D) is the class number of the imaginary quadratic field Q(D). We denote by NE(σ1, σ2, T) the number of zeros of E(s, Q) in the rectangle σ1 <Re(s)≤ σ2 and T≤ Im(s)≤ 2T, where 1/2<σ1<σ2<1 are fixed real numbers. In this paper, we improve the asymptotic formula of Gonek and Lee for NE(σ1, σ2, T), obtaining a saving of a power of T in the error term.