On C*-algebras associated to transfer operators for countable-to-one maps

Abstract

Our initial data is a transfer operator L for a continuous, countable-to-one map : X defined on an open subset of a locally compact Hausdorff space X. Then L may be identified with a `potential', i.e. a map : X that need not be continuous unless is a local homeomorphism. We define the crossed product C0(X) L as a universal C*-algebra with explicit generators and relations, and give an explicit faithful representation of C0(X) L under which it is generated by weighted composition operators. We explain its relationship with Exel-Royer's crossed products, quiver C*-algebras of Muhly and Tomforde, C*-algebras associated to complex or self-similar dynamics by Kajiwara and Watatani, and groupoid C*-algebras associated to Deaconu-Renault groupoids. We describe spectra of core subalgebras of C0(X) L and use it to characterise simplicity of C0(X) L and prove the uniqueness theorem for C0(X) L. We give efficient criteria for C0(X) L to be a Kirchberg algebra, and we discuss relationship between KMS states on the core subalgebra of C0(X) L and conformal measures for .