On locally finite dimensional traces
Abstract
We partially resolve three open questions on approximation properties of traces on simple C*-algebras. We partially answer two questions raised by Nate Brown by showing that locally finite dimensional (LFD) traces form a convex set on simple C*-algebras and that they are automatically uniformly LFD on locally reflexive C*-algebras. We prove that all the traces on the reduced -algebra C*r() of a discrete amenable ICC group are uniformly LFD, and conclude that C*r() is strong-NF in the sense of Blackadar-Kirchberg in this case. This partially answers another open question raised by Brown.
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