Noncommutative topological boundaries and amenable invariant random intermediate subalgebras
Abstract
As an analogue of the topological boundary of discrete groups , we define the noncommutative topological boundary of tracial von Neumann algebras (M, τ) and apply it to generalize the main results of [AHO23], showing that for a trace-preserving action (A, τA) on an amenable tracial von Neumann algebra, any -invariant amenable intermediate subalgebra between A and A is necessarily a subalgebra of Rad() A. By taking (A, τA) = L∞(X, X) for a free pmp action (X, X), we obtain a similar result for the invariant subequivalence relations of R X.
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