The twisted mean square and critical zeros of Dirichlet $L$-functions

Xiaosheng Wu

arXiv:1802.09704·math.NT·October 14, 2022

The twisted mean square and critical zeros of Dirichlet $L$-functions

Xiaosheng Wu

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TL;DR

This paper derives an asymptotic formula for the twisted mean square of Dirichlet L-functions using a longer, more general mollifier, leading to improved zero distribution results on the critical line.

Contribution

It introduces a new asymptotic formula for the twisted mean square of Dirichlet L-functions with a more general mollifier, enhancing zero distribution estimates.

Findings

01

Over 41.72% of zeros are on the critical line.

02

More than 40.74% of zeros are simple and on the critical line.

03

Results surpass previous bounds for the Riemann zeta-function.

Abstract

In this work, we obtain an asymptotic formula for the twisted mean square of a Dirichlet $L$ -function with a longer mollifier, whose coefficients are also more general than before. As an application we obtain that, for every Dirichlet $L$ -function, more than 41.72\% of zeros are on the critical line and more than 40.74\% of zeros are simple and on the critical line. These proportions also improve previous results which were proved only for the Riemann zeta-function.

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Taxonomy

TopicsAnalytic Number Theory Research · Meromorphic and Entire Functions · Mathematics and Applications