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

Abstract

A recent work by A. Mandarino, T. Linowski and K. \.Zyczkowski left open the following question. If μN is a certain permutation of entries of a N2 × N2 matrix ("mixing map") and UN is a N2 × N2 Haar unitary random matrix, then is the family UN, UNμN, ( UN2 )μN, … , ( UNm)μN asymptotically free? (here by A μ we understand the matrix resulted by permuting the entries of A according to the permutation μ ). 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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