Random Matrix Theory and Its Applications

IF 3.9 1区 数学 Q1 STATISTICS & PROBABILITY
A. Izenman
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引用次数: 2

Abstract

This article reviews the important ideas behind random matrix theory (RMT), which has become a major tool in a variety of disciplines, including mathematical physics, number theory, combinatorics and multivariate statistical analysis. Much of the theory involves ensembles of random matrices that are governed by some probability distribution. Examples include Gaussian ensembles and Wishart–Laguerre ensembles. Interest has centered on studying the spectrum of random matrices, especially the extreme eigenvalues, suitably normalized, for a single Wishart matrix and for two Wishart matrices, for finite and infinite sample sizes in the real and complex cases. The Tracy–Widom Laws for the probability distribution of a normalized largest eigenvalue of a random matrix have become very prominent in RMT. Limiting probability distributions of eigenvalues of a certain random matrix lead to Wigner’s Semicircle Law and Marc˘enko–Pastur’s Quarter-Circle Law. Several applications of these results in RMT are described in this article.
随机矩阵理论及其应用
本文回顾了随机矩阵理论(RMT)背后的重要思想,它已经成为各种学科的主要工具,包括数学物理,数论,组合学和多元统计分析。许多理论涉及由某种概率分布支配的随机矩阵的集合。例子包括高斯系综和Wishart-Laguerre系综。兴趣集中在研究随机矩阵的谱,特别是对于单个Wishart矩阵和两个Wishart矩阵,在真实和复杂情况下的有限和无限样本量,适当归一化的极端特征值。随机矩阵的归一化最大特征值的概率分布的tracey - wisdom定律在RMT中已经变得非常突出。某随机矩阵特征值的极限概率分布导致Wigner的半圆定律和Marc × × enko-Pastur的四分之一圆定律。本文描述了这些结果在RMT中的几个应用。
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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来源期刊
Statistical Science
Statistical Science 数学-统计学与概率论
CiteScore
6.50
自引率
1.80%
发文量
40
审稿时长
>12 weeks
期刊介绍: The central purpose of Statistical Science is to convey the richness, breadth and unity of the field by presenting the full range of contemporary statistical thought at a moderate technical level, accessible to the wide community of practitioners, researchers and students of statistics and probability.
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