One-level density and non-vanishing for cubic L-functions over the Eisenstein field

Abstract

We study the one-level density for families of L-functions associated with cubic Dirichlet characters defined over the Eisenstein field. We show that the family of L-functions associated with the cubic residue symbols n with n square-free and congruent to 1 modulo 9 satisfies the Katz-Sarnak conjecture for all test functions whose Fourier transforms are supported in (-13/11, 13/11), under GRH. This is the first result extending the support outside the trivial range (-1, 1) for a family of cubic L-functions. This implies that a positive density of the L-functions associated with these characters do not vanish at the central point s=1/2. A key ingredient in our proof is a bound on an average of generalized cubic Gauss sums at prime arguments, whose proof is based on the work of Heath-Brown and Patterson.