Auto-Correlation Functions for Unitary Groups

Pub Date : 2023-09-11 DOI:10.1007/s10468-023-10225-x

Kyu-Hwan Lee, Se-Jin Oh

引用次数: 0

Abstract

We compute the auto-correlations functions of order \(m\ge 1\) for the characteristic polynomials of random matrices from certain subgroups of the unitary groups \({\text {U}}(2)\) and \({\text {U}}(3)\) by establishing new branching rules. These subgroups can be understood as certain analogues of Sato–Tate groups of \({\text {USp}}(4)\) in our previous paper. Our computation yields symmetric polynomial identities with m-variables involving irreducible characters of \({\text {U}}(m)\) for all \(m \ge 1\) in an explicit, uniform way.

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单元群的自相关函数

我们通过建立新的分支规则，从单元群\({\text {U}}(2)\) 和\({\text {U}}(3)\) 的某些子群中计算随机矩阵特征多项式的阶\(m\ge 1\) 的自相关函数。这些子群可以理解为我们前一篇论文中 \({\text {USp}}(4)\) 的 Sato-Tate 群的某些类似群。我们的计算以一种明确、统一的方式得出了涉及所有 \(m \ge 1\) 的 \({\text {U}(m)\)的不可还原字符的 m 变量的对称多项式等式。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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