English

Zeros of Dirichlet L-functions over Function Fields

Number Theory 2014-04-10 v1

Abstract

Random matrix theory has successfully modeled many systems in physics and mathematics, and often the analysis and results in one area guide development in the other. Hughes and Rudnick computed 11-level density statistics for low-lying zeros of the family of primitive Dirichlet LL-functions of fixed prime conductor QQ, as QQ \to \infty, and verified the unitary symmetry predicted by random matrix theory. We compute 11- and 22-level statistics of the analogous family of Dirichlet LL-functions over Fq(T)\mathbb{F}_q(T). Whereas the Hughes-Rudnick results were restricted by the support of the Fourier transform of their test function, our test function is periodic and our results are only restricted by a decay condition on its Fourier coefficients. We show the main terms agree with unitary symmetry, and also isolate error terms. In concluding, we discuss an Fq(T)\mathbb{F}_q(T)-analogue of Montgomery's Hypothesis on the distribution of primes in arithmetic progressions, which Fiorilli and Miller show would remove the restriction on the Hughes-Rudnick results.

Keywords

Cite

@article{arxiv.1404.2435,
  title  = {Zeros of Dirichlet L-functions over Function Fields},
  author = {Julio C. Andrade and Steven J. Miller and Kyle Pratt and Minh-Tam Trinh},
  journal= {arXiv preprint arXiv:1404.2435},
  year   = {2014}
}

Comments

22 pages. Comments are welcome

R2 v1 2026-06-22T03:46:48.841Z