Ultraproducts, QWEP von Neumann Algebras, and the Effros-Mar\'echal Topology

Abstract

Based on the analysis on the Ocneanu/Groh-Raynaud ultraproducts and the Effros-Mar\'echal topology on the space vN(H) of von Neumann algebras acting on a separable Hilbert space H, we show that for a von Neumann algebra M in vN(H), the following conditions are equivalent: (1) M has the Kirhcberg's quotient weak expectation property (QWEP). (2) M is in the closure of the set Finj of injective factors on H with respect to the Effros-Mar\'echal topology. (3) M admits an embedding i into the Ocneanu ultrapower Rinftyomega of the injective III1 factor R∞ with a normal faithful conditional expectation epsilon: Rinftyomega to i(M). (4) For every epsilon>0, natural number n, and xi1,...,xin in PMnatural, there is a natural number k and a1,...,anin Mk(C)+, such that |<xii,xij>-trk(aiaj)|<epsilon (1<=i,j<=n) holds, where trk is the tracial state on Mk(C), and PMnatural is the natural cone in the standard form of M.