Upper Bounds on Large Deviations of Dirichlet $L$-functions in the $q$-aspect

TL;DR

This paper establishes upper bounds on the large deviations of central values of Dirichlet L-functions in the q-aspect, extending methods from the Riemann zeta function to Dirichlet characters and analyzing fractional moments.

Contribution

It adapts recursive schemes from zeta function studies to Dirichlet L-functions, providing new bounds on large deviations in the q-aspect, including cases where deviations grow slower than log log q.

Findings

Bounds on large deviations for central L-values in the q-aspect.

Extension of recursive methods from zeta to Dirichlet L-functions.

Bounds on deviations where V=o(log log q).

Abstract

We prove a result on the large deviations of the central values of even primitive Dirichlet $L$-functions with a given modulus. For $V\sim \alpha\log\log q$ with $0<\alpha<1$, we show that \begin{equation}\nonumber\frac{1}{\varphi(q)} \# \left\{\chi \text{ even, primitive mod }q: \log \left|L\left(\chi,\frac{1}{2}\right)\right| >V\right\}\ll \frac{e^{-\frac{V^2}{\log\log q}}}{\sqrt{\log\log q}}.\end{equation} This yields the sharp upper bound for the fractional moments of central values of Dirichlet $L$-functions proved by Gao, upon noting that the number of even, primitive characters with modulus $q$ is $\frac{\varphi(q)}{2}+O(1).$ The proof is an adaptation to the $q$-aspect of the recursive scheme developed by Arguin, Bourgade and Radziwill for the local maxima of the Riemann zeta function, and applied by Arguin and Bailey to the large deviations in the $t$-aspect. We go further and get bounds on the case where $V=o(\log\log q)$. These bounds are not expected to be sharp, but the discrepancy from the Central Limit Theorem estimate grows very slowly with $q$. The method involves a formula for the twisted mollified second moment of central values of Dirichlet $L$-functions, building on the work of Iwaniec and Sarnak.