Extending the unconditional support in an Iwaniec-Luo-Sarnak family

Abstract

We study the harmonically weighted one-level density of low-lying zeros of L-functions in the family of holomorpic newforms of fixed even weight k and prime level N tending to infinity. For this family, Iwaniec, Luo and Sarnak proved that the Katz--Sarnak prediction for the one-level density holds unconditionally when the support of the Fourier transform of the implied test function is contained in (-32,32). In this paper, we extend this admissible support to (-k,k), where 2 = 1.866… and k tends monotonically to 2 as k tends to infinity. This is asymptotically as good as the best known GRH result. The main novelty in our analysis is the use of zero-density estimates for Dirichlet L-functions.