On classification of simple non-unital amenable C*-algebras, II

Abstract

We present a classification theorem for amenable simple stably projectionless C*-algebras with generalized tracial rank one whose K0 vanish on traces which satisfy the Universal Coefficient Theorem. One of them is denoted by Z0 which has a unique tracial state and K0( Z0)=Z and K1( Z0)=\0\. Let A and B be two separable simple C*-algebras satisfying the UCT and have finite nuclear dimension. We show that A Z0 B Z0 if and only if Ell(B Z0)= Ell(B Z0). A class of simple separable C*-algebras which are approximately sub-homogeneous whose spectra having bounded dimension is shown to exhaust all possible Elliott invariant for C*-algebras of the form A Z0, where A is any finite separable simple amenable C*-algebras. Suppose that A and B are two finite separable simple C*-algebras with finite nuclear dimension satisfying the UCT such that traces vanishe on K0(A) and K0(B) (but arbitrary K1). One consequence of the main results in this situation is that A B if and only if A and B have the isomorphic Elliott invariant.