Unitary groups and augmented Cuntz semigroups of separable simple Z-stable C*-algebras

Abstract

Let A be a separable simple exact Z-stable C*-algebra. We show that the unitay group of A has the cancellation property. If A has continuous scale, the Cuntz semigroup of A has the strict comparison property and a weak cancellation property. Let C be a 1-dimensional non-commutative CW complex with K1(C)=\0\. Suppose that λ: Cu(C) Cu(A) is a morphism in Cuntz semigroups which is strictly positive. Then there exists a sequence of homomorphisms φn: C A such that n∞ Cu(φn)=λ. This result leads to the proof that every separable amenable simple C*-algebra in the UCT class has rationally generalized tracial rank at most one.