Semicrossed products of operator algebras and their C*-envelopes

Abstract

Let be a unital operator algebra and let α be an automorphism of that extends to a *-automorphism of its -envelope (). In this paper we introduce the isometric semicrossed product ×α + and we show that ( ×α +) () ×α . In contrast, the -envelope of the familiar contractive semicrossed product ×α + may not equal () ×α . Our main tool for calculating -envelopes for semicrossed products is the concept of a relative semicrossed product of an operator algebra, which we explore in the more general context of injective endomorphisms. As an application, we extend a recent result of Davidson and Katsoulis to tensor algebras of -correspondences. We show that if + is the tensor algebra of a -correspondence (, ) and α a completely isometric automorphism of + that fixes the diagonal elementwise, then the contractive semicrossed product satisfies (+ ×α +) ×α , where denotes the Cuntz-Pimsner algebra of (, ).