回答a . Mandarino, T. Linowski和K. Zyczkowski的问题

Pub Date : 2021-10-14 DOI:10.1142/s0219025723500054

M. Popa

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引用次数: 0

摘要

A. Mandarino, T. Linowski和K. Życzkowski最近的一项研究留下了以下问题。如果$ \mu_N $是一个$ N^2 \times N^2 $矩阵(“混合映射”)的某个元素的排列，$ U_N $是一个$ N^2 \times N^2 $ Haar酉随机矩阵，那么族$ U_N, U_N^{\mu_N}, ( U_N^2 )^{\mu_N}, \dots , ( U_N^m)^{\mu_N} $是渐近自由的吗?(这里通过$A^{ \mu}$我们理解根据$ \mu $的排列对$ A $的条目进行排列所得到的矩阵)。本文提出了解决这类问题的一些技术。特别是，主要结果的一个简单结果是，上面的问题有一个肯定的答案。

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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Answer to a question by A. Mandarino, T. Linowski and K. Zyczkowski

A recent work by A. Mandarino, T. Linowski and K. \.{Z}yczkowski left open the following question. If $ \mu_N $ is a certain permutation of entries of a $ N^2 \times N^2 $ matrix ("mixing map") and $ U_N $ is a $ N^2 \times N^2 $ Haar unitary random matrix, then is the family $ U_N, U_N^{\mu_N}, ( U_N^2 )^{\mu_N}, \dots , ( U_N^m)^{\mu_N} $ asymptotically free? (here by $A^{ \mu}$ we understand the matrix resulted by permuting the entries of $ A $ according to the permutation $ \mu $). This paper presents some techniques for approaching such problems. In particular, one easy consequence of the main result is that the question above has an affirmative answer.

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