Determining Optimal Test Functions for Bounding the Average Rank in Families of $L$-Functions

TL;DR

This paper investigates optimal test functions for bounding the average rank in families of $L$-functions, aiming to improve understanding of their vanishing behavior at the central point through connections with random matrix theory.

Contribution

It advances the determination of optimal test functions for classical groups under various support restrictions, enhancing bounds on average ranks of $L$-functions.

Findings

Identified optimal test functions for different classical groups.

Established improved bounds on average ranks.

Linked test function choices to rank bounds improvements.

Abstract

Given an $L$-function, one of the most important questions concerns its vanishing at the central point; for example, the Birch and Swinnerton-Dyer conjecture states that the order of vanishing there of an elliptic curve $L$-function equals the rank of the Mordell-Weil group. The Katz and Sarnak Density Conjecture states that this and other behavior is well-modeled by random matrix ensembles. This correspondence is known for many families when the test functions are suitably restricted. For appropriate choices, we obtain bounds on the average order of vanishing at the central point in families. In this note we report on progress in determining the optimal test functions for the various classical compact groups for different support restrictions, and discuss how this relates to improved rank bounds.