正交和交错随机矩阵的特征多项式、雅可比集合和 L 函数

Pub Date : 2024-05-10 DOI:10.1142/s2010326324500060
Mustafa Alper Gunes
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引用次数: 0

摘要

从蒙哥马利猜想开始,人们对随机矩阵理论和 L 函数理论之间的联系产生了浓厚的兴趣。特别是,随机矩阵的特征多项式的矩在各种著作中被用来估计 L 函数族的矩的渐近性。在本文中,我们首先考虑交点随机矩阵的特征多项式及其二次导数的联合矩。我们得到了渐近线,以及前阶系数在潘列韦方程解中的表示。这样,我们就得到了迪里夏特 L 函数族上相应联合矩的猜想渐近学。在此过程中,我们计算了某个加性雅可比统计量的渐近线,这可能与随机矩阵理论有关。最后,我们考虑了一种略有不同的联合矩,它是之前各种著作中考虑的 U(N) 上平均值的类似物。我们明确地得到了渐近线和前阶系数。
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Characteristic polynomials of orthogonal and symplectic random matrices, Jacobi ensembles & L-functions

Starting from Montgomery’s conjecture, there has been a substantial interest on the connections of random matrix theory and the theory of L-functions. In particular, moments of characteristic polynomials of random matrices have been considered in various works to estimate the asymptotics of moments of L-function families. In this paper, we first consider joint moments of the characteristic polynomial of a symplectic random matrix and its second derivative. We obtain the asymptotics, along with a representation of the leading order coefficient in terms of the solution of a Painlevé equation. This gives us the conjectural asymptotics of the corresponding joint moments over families of Dirichlet L-functions. In doing so, we compute the asymptotics of a certain additive Jacobi statistic, which could be of independent interest in random matrix theory. Finally, we consider a slightly different type of joint moment that is the analogue of an average considered over U(N) in various works before. We obtain the asymptotics and the leading order coefficient explicitly.

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