Low-lying zeros of L-functions for Maass forms over imaginary quadratic fields

Abstract

We study the 1- or 2-level density of families of L-functions for Hecke--Maass forms over an imaginary quadratic field F. For test functions whose Fourier transform is supported in (- 32, 32), we prove that the 1-level density for Hecke--Maass forms over F of square-free level q, as N(q) tends to infinity, agrees with that of the orthogonal random matrix ensembles. For Hecke--Maass forms over F of full level, we prove similar statements for the 1- and 2-level densities, as the Laplace eigenvalues tends to infinity.