Upgraded free independence phenomena for random unitaries

Abstract

We study upgraded free independence phenomena for unitary elements u1, u2, … representing the large-n limit of Haar random unitaries, showing that free independence extends to several larger algebras containing uj in the ultraproduct of matrices Πn U Mn(C). Using a uniform asymptotic freeness argument and volumetric analysis, we prove free independence of the Pinsker algebras Pj containing uj. The Pinsker algebra Pj is the maximal subalgebra containing uj with vanishing 1-bounded entropy defined by Hayes; Pj in particular contains the relative commutant \uj\' Πn U Mn(C), more generally any unitary that can be connected to uj by a sequence of commuting pairs of Haar unitaries, and any unitary v such that vPj v* Pj is diffuse. Through an embedding argument, we go back and deduce analogous free independence results for MU when M is a free product of Connes embeddable tracial von Neumann algebras Mi, which thus yields (in the Connes-embeddable case) a generalization and a new proof of Houdayer--Ioana's results on free independence of approximate commutants. It also yields a new proof of the general absorption results for Connes-embeddable free products obtained by the first author, Hayes, Nelson, and Sinclair.

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