Representations of C*-dynamical systems implemented by Cuntz families

Abstract

Given a dynamical system (A,) where A is a unital -algebra and is a (possibly non-unital) *-endomorphism of A, we examine families (π,\Ti\) such that π is a representation of A, \Ti\ is a Toeplitz-Cuntz family and a covariance relation holds. We compute a variety of non-selfadjoint operator algebras that depend on the choice of the covariance relation, along with the smallest -algebra they generate, namely the -envelope. We then relate each occurrence of the -envelope to (a full corner of) an appropriate twisted crossed product. We provide a counterexample to show the extent of this variety. In the context of -algebras, these results can be interpreted as analogues of Stacey's famous result, for non-automorphic systems and n>1. Our study involves also the one variable generalized crossed products of Stacey and Exel. In particular, we refine a result that appears in the pioneering paper of Exel on (what is now known as) Exel systems.