The unitary group of a II1 factor is SOT-contractible
Abstract
We show that the unitary group of any SOT-separable II1 factor M, with the strong operator topology, is contractible. Combined with several old results, this implies that the same is true for any SOT-separable von Neumann algebra with no type In direct summands (n < ∞). The proof for the II1-factor case uses regularization via free convolution and Popa's theorem on the existence of approximately free Haar unitaries in II1 factors.
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