The Boundary of the Orbital Beta Process

IF 0.6 4区数学 Q3 MATHEMATICS

Moscow Mathematical Journal Pub Date : 2019-05-21 DOI:10.17323/1609-4514-2021-21-4-659-694

T. Assiotis, J. Najnudel

引用次数: 16

Abstract

The unitarily invariant probability measures on infinite Hermitian matrices have been classified by Pickrell, and by Olshanski and Vershik. This classification is equivalent to determining the boundary of a certain inhomogeneous Markov chain with given transition probabilities. This formulation of the problem makes sense for general $\beta$-ensembles when one takes as the transition probabilities the Dixon-Anderson conditional probability distribution. In this paper we determine the boundary of this Markov chain for any $\beta \in (0,\infty]$, also giving in this way a new proof of the classical $\beta=2$ case. Finally, as a by-product of our results we obtain alternative proofs of the almost sure convergence of the rescaled Hua-Pickrell and Laguerre $\beta$-ensembles to the general $\beta$ Hua-Pickrell and $\beta$ Bessel point processes respectively.

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轨道贝塔过程的边界

Pickrell、Olshanski和Vershik对无穷厄米矩阵上的酉不变概率测度进行了分类。这种分类等价于确定具有给定转移概率的非齐次马尔可夫链的边界。当将狄克逊-安德森条件概率分布作为转移概率时，这种问题的表述对一般$\beta$ -系综是有意义的。本文确定了任意$\beta \in (0,\infty]$情况下马尔可夫链的边界，并由此给出了经典$\beta=2$情况的一个新的证明。最后，作为我们的结果的一个副产品，我们分别获得了重新标定的Hua-Pickrell和Laguerre $\beta$ -系综对一般的$\beta$ Hua-Pickrell和$\beta$ Bessel点过程几乎肯定收敛的替代证明。

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

Moscow Mathematical Journal 数学-数学

CiteScore

1.40

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Moscow Mathematical Journal (MMJ) is an international quarterly published (paper and electronic) by the Independent University of Moscow and the department of mathematics of the Higher School of Economics, and distributed by the American Mathematical Society. MMJ presents highest quality research and research-expository papers in mathematics from all over the world. Its purpose is to bring together different branches of our science and to achieve the broadest possible outlook on mathematics, characteristic of the Moscow mathematical school in general and of the Independent University of Moscow in particular. An important specific trait of the journal is that it especially encourages research-expository papers, which must contain new important results and include detailed introductions, placing the achievements in the context of other studies and explaining the motivation behind the research. The aim is to make the articles — at least the formulation of the main results and their significance — understandable to a wide mathematical audience rather than to a narrow class of specialists.