Asymptotic freeness in tracial ultraproducts

Abstract

We prove novel asymptotic freeness results in tracial ultraproduct von Neumann algebras. In particular, we show that whenever M = M1 M2 is a tracial free product von Neumann algebra and u1 ∈ U(M1), u2 ∈ U(M2) are Haar unitaries, the relative commutants \u1\' M U and \u2\' M U are freely independent in the ultraproduct M U. Our proof relies on Mei-Ricard's results [MR16] regarding Lp-boundedness (for all 1 < p < +∞) of certain Fourier multipliers in tracial amalgamated free products von Neumann algebras. We derive two applications. Firstly, we obtain a general absorption result in tracial amalgamated free products that recovers several previous maximal amenability/Gamma absorption results. Secondly, we prove a new lifting theorem which we combine with our asymptotic freeness results and Chifan-Ioana-Kunnawalkam Elayavalli's recent construction [CIKE22] to provide the first example of a II1 factor that does not have property Gamma and is not elementary equivalent to any free product of diffuse tracial von Neumann algebras.