A new characterization of (pre)liminary C*-algebras

Abstract

Given an arbitrary countable ordinal α , we introduce the notion of type Iα C*-algebra and α -subhomogeneous C*-algebra. When α =0, these recover the notions of Fell C*-algebra and of commutative C*-algebra, respectively. When α =n<ω , these recover the notions of type In C*-algebra and of n-subhomogeneous C*-algebra, respectively. We prove that a separable C*-algebra is liminary if and only if it is type Iα for some α <ω 1, and it is preliminary (i.e., has no infinite-dimensional irreducible representation) if and only if it is α -subhomogeneous for some α <ω 1. We also prove that for any countable ordinal α there exists a separable C*-algebra that is type Iα and not type Iβ for β <α , and a separable C*-algebra that is α -subhomogeneous and not β -subhomogeneous for any β <α .