On the isomorphism class of q-Gaussian C-algebras for infinite variables

Abstract

For a real Hilbert space HR and -1 < q < 1 Bozejko and Speicher introduced the C-algebra Aq(HR) and von Neumann algebra Mq(HR) of q-Gaussian variables. We prove that if (HR) = ∞ and -1 < q < 1, q = 0 then Mq(HR) does not have the Akemann-Ostrand property with respect to Aq(HR). It follows that Aq(HR) is not isomorphic to A0(HR). This gives an answer to the C-algebraic part of Question 1.1 and Question 1.2 in [NeZe18].