English

On zero-density estimates for Beurling zeta functions

Number Theory 2024-09-17 v1

Abstract

We show the zero-density estimate N(ζP;α,T)T4(1α)32αθ(logT)9 N(\zeta_{\mathcal{P}}; \alpha, T) \ll T^{\frac{4(1-\alpha)}{3-2\alpha-\theta}}(\log T)^{9} for Beurling zeta functions ζP\zeta_{\mathcal{P}} attached to Beurling generalized number systems with integers distributed as NP(x)=Ax+O(xθ)N_{\mathcal{P}}(x) = Ax + O(x^{\theta}). We also show a similar zero-density estimate for a broader class of general Dirichlet series, consider improvements conditional on finer pointwise or L2kL^{2k}-bounds of ζP\zeta_{\mathcal{P}}, and discuss some optimality questions.

Keywords

Cite

@article{arxiv.2409.10051,
  title  = {On zero-density estimates for Beurling zeta functions},
  author = {Frederik Broucke},
  journal= {arXiv preprint arXiv:2409.10051},
  year   = {2024}
}
R2 v1 2026-06-28T18:45:43.641Z