Large values of $L(1,\chi)$ for $k$-th order characters $\chi$ and applications to character sums

TL;DR

This paper proves the existence of infinitely many characters of a fixed order with large $L$-values, and applies these results to construct large character sums, advancing understanding of $L$-functions and character sums.

Contribution

It establishes the existence of infinitely many characters of any fixed order with maximal $L(1,\chi)$ values, and applies this to large character sums, a novel extension in the field.

Findings

Existence of infinitely many characters with $|L(1,\chi)| \geq (e^{\gamma}+o(1))\log\log q$

Similar results for even order characters and quadratic twists

Construction of large even order character sums

Abstract

For any given integer $k\geq 2$ we prove the existence of infinitely many $q$ and characters $ \chi\pmod q$ of order $k$, such that $|L(1,\chi)|\geq (e^{\gamma}+o(1))\log\log q$. We believe this bound to be best possible. When the order $k$ is even, we obtain similar results for $L(1,\chi)$ and $L(1,\chi\xi)$ where $\chi$ is restricted to even (or odd) characters of order $k$, and $\xi$ is a fixed quadratic character. As an application of these results, we exhibit large even order character sums, which are likely to be optimal.