Rational K-Stability of Continuous C(X)-Algebras
Abstract
We show that the property of being rationally K-stable passes from the fibers of a continuous C(X)-algebra to the ambient algebra, under the assumption that the underlying space X is compact, metrizable, and of finite covering dimension. As an application, we show that a crossed product C*-algebra is (rationally) K-stable provided the underlying C*-algebra is (rationally) K-stable, and the action has finite Rokhlin dimension with commuting towers.
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