English

On the density hypothesis for $L$-functions associated with holomorphic cusp forms

Number Theory 2025-06-10 v2

Abstract

We study the range of validity of the density hypothesis for the zeros of LL-functions associated with cusp Hecke eigenforms ff of even integral weight and prove that Nf(σ,T)T2(1σ)+εN_{f}(\sigma, T) \ll T^{2(1-\sigma)+\varepsilon} holds for σ1407/1601\sigma \geq 1407/1601. This improves upon a result of Ivi\'{c}, who had previously shown the zero-density estimate in the narrower range σ53/60\sigma\geq 53/60. Our result relies on an improvement of the large value estimates for Dirichlet polynomials based on mixed moment estimates for the Riemann zeta function. The main ingredients in our proof are the Hal\'{a}sz-Montgomery inequality, Ivi\'{c}'s mixed moment bounds for the zeta function, Huxley's subdivision argument, Bourgain's dichotomy approach, and Heath-Brown's bound for double zeta sums.

Keywords

Cite

@article{arxiv.2310.14797,
  title  = {On the density hypothesis for $L$-functions associated with holomorphic cusp forms},
  author = {Bin Chen and Gregory Debruyne and Jasson Vindas},
  journal= {arXiv preprint arXiv:2310.14797},
  year   = {2025}
}

Comments

22 pages

R2 v1 2026-06-28T12:58:45.990Z