Unitaries in a Simple C*-algebra of Tracial Rank One

Abstract

Let A be a unital separable simple infinite dimensional with tracial rank no more than one and with the tracial state space T(A) and let U(A) be the unitary group of A. Suppose that u∈ U0(A), the connected component of U(A) containing the identity. We show that, for any >0, there exists a selfadjoint element h∈ As.a such that \|u-(ih)\|<. We also study the problem when u can be approximated by unitaries in A with finite spectrum. Denote by CU(A) the closure of the subgroup of unitary group of U(A) generated by its commutators. It is known that CU(A)⊂ U0(A). Denote by a the affine function on T(A) defined by a(τ)=τ(a). We show that u can be approximated by unitaries in A with finite spectrum if and only if u∈ CU(A) and un+(un)*,i(un-(un)*)∈ A(K0(A) for all n 1. Examples are given that there are unitaries in CU(A) which can not be approximated by unitaries with finite spectrum. Significantly these results are obtained in the absence of amenability.