# Lower Order Terms for the One-Level Density of a Symplectic Family of   Hecke L-Functions

**Authors:** Ezra Waxman

arXiv: 1905.10362 · 2021-01-06

## TL;DR

This paper uses the Ratios Conjecture to analyze the one-level density of a symplectic family of Hecke L-functions, revealing a transition at support 1 and confirming predictions with unconditional results, including non-vanishing at the central point.

## Contribution

It applies the Ratios Conjecture to compute one-level density for Hecke L-functions, identifying a transition at support 1 and providing unconditional results consistent with conjectures.

## Key findings

- Transition in main and lower order terms at support 1
- Unconditional agreement with Ratios Conjecture predictions for support less than 1
- At least 75% of L-functions do not vanish at the central point under GRH

## Abstract

In this paper we apply the $L$-function Ratios Conjecture to compute the one-level density for a symplectic family of $L$-functions attached to Hecke characters of infinite order. When the support of the Fourier transform of the corresponding test function $f$ reaches $1$, we observe a transition in the main term, as well as in the lower order term. The transition in the lower order term is in line with behavior recently observed by D. Fiorilli, J. Parks, and A. S\"odergren in their study of a symplectic family of quadratic Dirichlet $L$-functions. We then directly calculate main and lower order terms for test functions $f$ such that supp($\widehat{f}) \subset [-\alpha,\alpha]$ for some $\alpha <1$, and observe that this unconditional result is in agreement with the prediction provided by the Ratios Conjecture. As the analytic conductor of these L-functions grow twice as large (on a logarithmic scale) as the cardinality of the family in question, this is the optimal support that can be expected with current methods. Finally as a corollary we deduce that, under GRH, at least 75$\%$ of these $L$-functions do not vanish at the central point.

## Full text

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## References

27 references — full list in the complete paper: https://tomesphere.com/paper/1905.10362/full.md

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Source: https://tomesphere.com/paper/1905.10362