Free products and rescalings involving non-separable abelian von Neumann algebras
Abstract
For a self-symmetric tracial von Neumann algebra A, we study rescalings of A*n * LFr for n ∈ N and r ∈ (1, ∞] and use them to obtain an interpolation Fs,r(A) for all real numbers s>0 and 1-s < r ≤ ∞. We get formulas for their free products, and free products with finite-dimensional or hyperfinite von Neumann algebras. In particular, for any such A, we can compute compressions (A*n)t for 0<t<1, and the Murray-von Neumann fundamental group of A*∞. When A is also non-separable and abelian, this answers two questions in Section 4.3 of recent work of Boutonnet-Drimbe-Ioana-Popa.
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