An omega result for the least negative Hecke eigenvalue

Abstract

We establish the existence of many holomorphic Hecke eigenforms f of large weight k for the full modular group, for which the least positive integer nf such that λf(nf)<0 satisfies nf ( k)1-o(1). This is believed to be best possible up to the o(1) term in the exponent, and improves on a result of Kowalski, Lau, Soundararajan and Wu, who showed that, when restricted to primes, the least prime p such that λf(p)<0 can be as large as ( k)1/2+o(1). We also discuss an extension of our result to primitive holomorphic cusp forms of weight k and squarefree level N≥ 1.