Lower order terms of the one level density of a family of quadratic Hecke L-functions

Abstract

In this paper, we study lower order terms of the 1-level density of low-lying zeros of quadratic Hecke L-functions in the Gaussian field. Assuming the Generalized Riemann Hypothesis, our result is valid for even test functions whose Fourier transforms are supported in (-2, 2). Moreover, we apply the ratios conjecture of L-functions to derive these lower order terms as well. Up to the first lower order term, we show that our results is consistent with each other, when the Fourier transforms of the test functions are supported in (-2, 2).