On the uniqueness of injective III1 factor
Abstract
We give a new proof of a theorem due to Alain Connes, that an injective factor N of type III1 with separable predual and with trivial bicentralizer is isomorphic to the Araki--Woods type III1 factor R∞. This, combined with the author's solution to the bicentralizer problem for injective III1 factors provides a new proof of the theorem that up to *-isomorphism, there exists a unique injective factor of type III1 on a separable Hilbert space.
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