A Class of Freely Complemented von Neumann Subalgebras of LFn

Abstract

We prove that if A1, A2, …, An are tracial abelian von Neumann algebras for 2≤ n ≤ ∞ and M = A1 * ·s * An is their free product, then any subalgebra A ⊂ M of the form A = Σi=1n ui Ai pi ui*, for some projections pi ∈ Ai and unitaries ui ∈ U(M), for 1 ≤ i ≤ n, such that Σi ui pi ui* = 1, is freely complemented (FC) in M. Moreover, if A1, A2, …, An are purely non-separable abelian, and M = A1 * ·s * An, then any purely non-separable singular MASA in M is FC. We also show that any of the known maximal amenable MASAs A⊂ LFn (notably the radial MASA), satisfies Popa's weak FC conjecture, i.e., there exist Haar unitaries u∈ LFn that are free independent to A.

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