Complete metric approximation property for q-Araki-Woods algebras
Abstract
By adapting an ultraproduct technique of Junge and Zeng, we prove that radial completely bounded multipliers on q-Gaussian algebras transfer to q-Araki-Woods algebras. As a consequence, we establish the w-complete metric approximation property for all q-Araki-Woods algebras. We apply the latter result to show that the canonical ultraweakly dense C-subalgebras of q-Araki-Woods algebras are always QWEP.
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