Approximation Properties for Non-commutative Lp-Spaces Associated with Discrete Groups
Abstract
Let 1 < p < ∞. It is shown that if G is a discrete group with the approximation property introduced by Haagerup and Kraus, then the non-commutative Lp(VN(G)) space has the operator space approximation property. If, in addition, the group von Neumann algebra VN(G) has the QWEP, i.e. is a quotient of a C*-algebra with Lance's weak expectation property, then Lp(VN(G)) actually has the completely contractive approximation property and the approximation maps can be chosen to be finite-rank completely contractive multipliers on Lp(VN(G)). Finally, we show that if G is a countable discrete group having the approximation property and VN(G) has the QWEP, then Lp(VN(G)) has a very nice local structure, i.e. it is a Cp space and has a completely bounded Schauder basis.
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