Zeros near s=1 and the constant term of L'/L for L-functions in the Selberg class

Abstract

Let L(s) = Σn=1∞ an n-s be an L-function in the Selberg class, and qL its conductor. Let 0(L) be the constant term of the Laurent expansion of L'/L at s=1. We show that for certain families F of L-functions in the Selberg class with polynomial Euler product: If L∈F has no zeros β + iγ with β > 1 - δ( qL)-1, |γ| < ( qL)-1/2 for some absolute δ >0, then (0(L)) F qL; If (0(L)) qL for all L∈ F, then there is some absolute δ > 0 such that L has no zeros β + iγ with β > 1 - δ( qL)-1, |γ| < (1-β)1/2( qL)-1/2. This generalizes, for instance, the case of families of Dedekind zeta functions of number fields with bounded degree.