Semicrossed products of C*-algebras and their C*-envelopes

Abstract

Let C be a C*-algebra and α:C → C a unital *-endomorphism. There is a natural way to construct operator algebras which are called semicrossed products, using a convolution induced by the action of α on C. We show that the C*-envelope of a semicrossed product is (a full corner of) a crossed product. As a consequence, we get that, when α is *-injective, the semicrossed products are completely isometrically isomorphic and share the same C*-envelope, the crossed product C∞ α∞ Z. We show that minimality of the dynamical system (C,α) is equivalent to non-existence of non-trivial Fourier invariant ideals in the C*-envelope. We get sharper results for commutative dynamical systems.