与非微观表征相关的紧凑群上独立均匀变量的强渐近自由性

IF 2.6 1区 数学 Q1 MATHEMATICS
Charles Bordenave, Benoît Collins
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引用次数: 0

摘要

沃伊库勒斯库发现了独立哈分布单元矩阵的渐近自由性。后来又得到了许多改进,包括随机单元的强渐近自由性和作用于佩伦-弗罗贝尼斯特征向量正交的随机排列的强渐近自由性。在本文中,我们考虑了从紧凑群的表示理论中自然出现的一种新的矩阵单元模型。我们固定一个非难签名(\rho \),即两个非递增自然数的有限序列,并且对于足够大的(n),考虑与签名(\rho \)相关联的(\mathbb{U}_{n}\)的不可还原表示(\(V_{n,\rho }\ )。我们把 \(\mathbb{U}_{n,\rho }\) 的商看作是 \(\mathbb{U}(V_{n,\rho })\) 的矩阵子群,并证明在这种广义背景下,当绘制独立的哈量副本时,强渐近自由性是成立的。我们还得到了这一结果的正交变体。得益于表示论中的经典结果,这一结果与张量的强渐近自由性密切相关,我们初步建立了张量的强渐近自由性。为了实现这一结果,我们需要开发四种新工具,每种工具都具有独立的理论意义:(i) 居中的魏格腾微积分及其统一估计;(ii) 矩阵的高斯矩和单元矩的系统统一比较;(iii) 一般 \(C^{*}\) 代数中的广义简化算子值非回溯理论;最后,(iv) 张量矩阵的组合学。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Strong asymptotic freeness for independent uniform variables on compact groups associated to nontrivial representations

Strong asymptotic freeness for independent uniform variables on compact groups associated to nontrivial representations

Voiculescu discovered asymptotic freeness of independent Haar-distributed unitary matrices. Many refinements have been obtained, including strong asymptotic freeness of random unitaries and strong asymptotic freeness of random permutations acting on the orthogonal of the Perron-Frobenius eigenvector. In this paper, we consider a new matrix unitary model appearing naturally from representation theory of compact groups. We fix a nontrivial signature \(\rho \), i.e. two finite sequences of non-increasing natural numbers, and for \(n\) large enough, consider the irreducible representation \(V_{n,\rho }\) of \(\mathbb{U}_{n}\) associated with the signature \(\rho \). We consider the quotient \(\mathbb{U}_{n,\rho }\) of \(\mathbb{U}_{n}\) viewed as a matrix subgroup of \(\mathbb{U}(V_{n,\rho })\), and show that strong asymptotic freeness holds in this generalized context when drawing independent copies of the Haar measure. We also obtain the orthogonal variant of this result. Thanks to classical results in representation theory, this result is closely related to strong asymptotic freeness for tensors, which we establish as a preliminary. To achieve this result, we need to develop four new tools, each of independent theoretical interest: (i) a centered Weingarten calculus and uniform estimates thereof, (ii) a systematic and uniform comparison of Gaussian moments and unitary moments of matrices, (iii) a generalized and simplified operator-valued non-backtracking theory in a general \(C^{*}\)-algebra, and finally, (iv) combinatorics of tensor moment matrices.

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来源期刊
Inventiones mathematicae
Inventiones mathematicae 数学-数学
CiteScore
5.60
自引率
3.20%
发文量
76
审稿时长
12 months
期刊介绍: This journal is published at frequent intervals to bring out new contributions to mathematics. It is a policy of the journal to publish papers within four months of acceptance. Once a paper is accepted it goes immediately into production and no changes can be made by the author(s).
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