Exponential rank and exponential length for Z-stable simple C*-algebras

Abstract

Let A be a unital separable simple Z-stable C*-algebra which has rational tracial rank at most one and let u∈ U0(A), the connected component of the unitary group of A. We show that, for any ε>0, there exists a self-adjoint element h∈ A such that |u-(ih)|<ε. The lower bound of |h| could be as large as one wants. If u∈ CU(A), the closure of the commutator subgroup of the unitary group, we prove that there exists a self-adjoint element h∈ A such that |u-(ih)| <ε and |h| 2π. Examples are given that the bound 2π for |h| is the optimal in general. For the Jiang-Su algebra Z, we show that, if u∈ U0( Z) and ε>0, there exists a real number -π<t π and a self-adjoint element h∈ Z with |h| 2π such that |eitu-(ih)|<ε.