关于 E. Meckes 提出的弧上单元特征值过程问题

IF 1.4 3区 数学 Q1 MATHEMATICS Analysis and Mathematical Physics Pub Date : 2024-05-12 DOI:10.1007/s13324-024-00919-w
L. Kryvonos, E. B. Saff
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引用次数: 0

摘要

我们研究了 E. Meckes 最初提出的关于随机 \(n \times n\) 矩阵的单元特征值过程的核特征值的渐近线问题。核的特征值 \(p_{j}\)又与离散的球面波函数相关联。我们考虑特征值计数函数 \(|G(x,n)|:=\#\{j:p_j>Ce^{-x n}\}\), (\(C>;这里是一个固定常数),并通过将函数 |G(x, n)|与下面单位圆 \(S^{1}\)上能量问题的解 J(q)相关联,建立其在区间 \(x \in (\lambda -\varepsilon , \lambda +\varepsilon )\) 上的平均值的渐近行为。也就是说,对于给定的\(theta \),\(0<theta < 2 \pi \),以及给定的q,\(0<q<1\),我们确定函数 \(J(q) =\inf \{I(\mu ):\mu \in \mathcal {P}(S^{1}), \mu (A_{\theta }) = q\}\), where \(I(\mu ):= \int \!\是支持在单位圆上的概率度量\(\mu \)的对数能量,而\(A_{theta }\) 是从\(e^{-i \theta /2}\)到\(e^{i \theta /2}\)的弧。
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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On a problem of E. Meckes for the unitary eigenvalue process on an arc

We study the problem originally communicated by E. Meckes on the asymptotics for the eigenvalues of the kernel of the unitary eigenvalue process of a random \(n \times n\) matrix. The eigenvalues \(p_{j}\) of the kernel are, in turn, associated with the discrete prolate spheroidal wave functions. We consider the eigenvalue counting function \(|G(x,n)|:=\#\{j:p_j>Ce^{-x n}\}\), (\(C>0\) here is a fixed constant) and establish the asymptotic behavior of its average over the interval \(x \in (\lambda -\varepsilon , \lambda +\varepsilon )\) by relating the function |G(xn)| to the solution J(q) of the following energy problem on the unit circle \(S^{1}\), which is of independent interest. Namely, for given \(\theta \), \(0<\theta < 2 \pi \), and given q, \(0<q<1\), we determine the function \(J(q) =\inf \{I(\mu ): \mu \in \mathcal {P}(S^{1}), \mu (A_{\theta }) = q\}\), where \(I(\mu ):= \int \!\int \log \frac{1}{|z - \zeta |} d\mu (z) d\mu (\zeta )\) is the logarithmic energy of a probability measure \(\mu \) supported on the unit circle and \(A_{\theta }\) is the arc from \(e^{-i \theta /2}\) to \(e^{i \theta /2}\).

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来源期刊
Analysis and Mathematical Physics
Analysis and Mathematical Physics MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
2.70
自引率
0.00%
发文量
122
期刊介绍: Analysis and Mathematical Physics (AMP) publishes current research results as well as selected high-quality survey articles in real, complex, harmonic; and geometric analysis originating and or having applications in mathematical physics. The journal promotes dialog among specialists in these areas.
期刊最新文献
Correction: On entire solutions of certain partial differential equations Correction: Preimages under linear combinations of iterates of finite Blaschke products Symmetries of large BKP hierarchy Lieb–Thirring inequalities on the spheres and SO(3) Meromorphic solutions of Bi-Fermat type partial differential and difference equations
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