Low-Lying Zeros on the Critical Line for Families of Dirichlet L-Functions

Abstract

In this paper, we establish a new lower bound for the number of low-lying zeros of Dirichlet L-functions L(s, χ) on the critical line within extremely short intervals. Specifically, for a sufficiently large prime P and real number T ∈ [a1/ P, 1], we prove that the sum of the number of zeros on the critical line N0(T, χ) over characters χ P satisfies Σχ P N0(T, χ) T2 P P . Traditional approaches encounter significant technical barriers in this short-interval regime. The Levinson method fails due to its own inherent limitations in handling such restricted intervals , while standard applications of the Selberg mollifier are hindered by the emergence of complex, inseparable cross-terms that are difficult to evaluate. To overcome these obstacles, we introduce a novel analytic framework utilizing high-dimensional Mellin transforms. This approach systematically manages the multi-variable series generated by the mollifier calculations. By explicitly resolving these cross-term obstructions, we extract the localized lower bound, providing a robust method that circumvents the short-interval bottleneck and offers potential applicability to the zero statistics of higher-rank L-function families.