Dimension growth for C*-algebras

Abstract

We introduce the growth rank of a C*-algebra, a (N ∞)-valued invariant which measures how far an algebra is from absorbing the Jiang-Su algebra Z tensorially. We prove that its range is exhausted by simple nuclear C*-algebras, and obtain in the process a well developed theory of unbounded dimension growth for approximately homogeneous (AH) algebras. Another consequence of the range result is the existence of a simple, nuclear, and non-Z-stable C*-algebra which is not tensorially prime. The properties of the growth rank suggest a universal property which may be considered inside any class of unital and nuclear C*-algebras. We prove that Z satisfies this property inside a class of locally subhomogeneous algebras.

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