Centrally pure C*-algebras
Abstract
We show that a separable C*-algebra A is Z-stable if and only if its uncorrected central sequence algebra A' AU is pure, if and only if Kirchberg's central sequence algebra F(A) is pure. More generally, we show that a C*-algebra A is separably Z-stable if and only if the relative central sequence algebra B' AU is pure for every separable subalgebra B ⊂eq AU.
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