A Criterion for Z-Stability with Applications to Crossed Products
Abstract
Building on an argument by Toms and Winter, we show that if A is a simple, separable, unital, Z-stable C*-algebra, then the crossed product of C(X,A) by an automorphism is also Z-stable, provided that the automorphism induces a minimal homeomorphism on X. As a consequence, we observe that if A is nuclear and purely infinite then the crossed product is a Kirchberg algebra.
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