Establishing strong 1-boundedness via non-microstates free entropy techniques

Abstract

We show that, for many choices of finite tuples of generators X = (x1, … , xd) of a tracial von Neumann algebra (M, τ) satisfying certain decomposition properties (non-primeness, possessing a Cartan subalgebra, or property ), one can find a diffuse, hyperfinite subalgebra N ⊂eq (W*(X))ω (often in W*(X) itself), such that W*(N,X+tS) = W*(N,X,S) for all t > 0. (Here S is a free semicircular family, free from \X\ N). This gives a short non-microstates proof of strong 1-boundedness for such algebras.

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