Topological freeness for C*-correspondences

Abstract

We study conditions that ensure uniqueness theorems of Cuntz-Krieger type for relative Cuntz-Pimsner algebras O(J,X) associated to a C*-correspondence X over a C*-algebra A. We give general sufficient conditions phrased in terms of a multivalued map X acting on the spectrum A of A. When X(J) is of Type I we construct a directed graph dual to X and prove a uniqueness theorem using this graph. When X(J) is liminal, we show that topological freeness of this graph is equivalent to the uniqueness property for O(J,X), as well as to an algebraic condition, which we call J-acyclicity of X. As an application we improve the Fowler-Raeburn uniqueness theorem for the Toeplitz algebra TX. We give new simplicity criteria for OX. We generalize and enhance uniqueness results for relative quiver C*-algebras of Muhly and Tomforde. We also discuss applications to crossed products by endomorphisms.