On the structure of relatively biexact group von Neumann algebras

Abstract

Using computations in the bidual of B(L2M) we develop a new technique at the von Neumann algebra level to upgrade relative proper proximality to full proper proximality. This is used to structurally classify subalgebras of L where is an infinite group that is biexact relative to a finite family of subgroups \i\i∈ I such that each i is almost malnormal in . This generalizes the result of DKEP21 which classifies subalgebras of von Neumann algebras of biexact groups. By developing a combination with techniques from Popa's deformation-rigidity theory we obtain a new structural absorption theorem for free products and a generalized Kurosh type theorem in the setting of properly proximal von Neumann algebras.

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