Connes' bicentralizer problem for q-deformed Araki-Woods algebras

Abstract

Let (HR, Ut) be any strongly continuous orthogonal representation of R on a real (separable) Hilbert space HR. For any q∈ (-1,1), we denote by q(HR,Ut) the q-deformed Araki-Woods algebra introduced by Shlyakhtenko and Hiai. In this paper, we prove that q(HR,Ut) has trivial bicentralizer if it is a type III1 factor. In particular, we obtain that q(HR,Ut) always admits a maximal abelian subalgebra that is the range of a faithful normal conditional expectation. Moreover, using Sniady's work, we derive that q(HR,Ut) is a full factor provided that the weakly mixing part of (HR, Ut) is nonzero.