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A Mean Value Theorem for general Dirichlet Series

Number Theory 2025-02-25 v1 Complex Variables

Abstract

In this paper we obtain a mean value theorem for a general Dirichlet series f(s)=j=1ajnjsf(s)= \sum_{j=1}^\infty a_j n_j^{-s} with positive coefficients for which the counting function A(x)=njxajA(x) = \sum_{n_{j}\le x}a_{j} satisfies A(x)=ρx+O(xβ)A(x)=\rho x + O(x^\beta) for some ρ>0\rho>0 and β<1\beta<1. We prove that 1T0Tf(σ+it)2dtj=1aj2nj2σ\frac1T\int_0^T |f(\sigma+it)|^2\, dt \to \sum_{j=1}^\infty a_j^2n_j^{-2\sigma} for σ>1+β2\sigma>\frac{1+\beta}{2} and obtain an upper bound for this moment for β<σ1+β2\beta<\sigma\le \frac{1+\beta}{2}. We provide a number of examples indicating the sharpness of our results.

Keywords

Cite

@article{arxiv.2409.06301,
  title  = {A Mean Value Theorem for general Dirichlet Series},
  author = {Frederik Broucke and Titus Hilberdink},
  journal= {arXiv preprint arXiv:2409.06301},
  year   = {2025}
}

Comments

To appear in Quart. J. Math

R2 v1 2026-06-28T18:39:35.950Z