Hereditary uniform property

Abstract

We study the uniform property for separable simple C*-algebras which have quasitraces and may not be exact. We show that a stably finite separable simple C*-algebra A with strict comparison and uniform property has tracial approximate oscillation zero and stable rank one. Moreover in this case, its hereditary C*-subalgebras also have a version of uniform property . If a separable non-elementary simple amenable C*-algebra A with strict comparison has this hereditary uniform property , then A is Z-stable.