Semicrossed products of the disc algebra

Abstract

If α is the endomorphism of the disk algebra, , induced by composition with a finite Blaschke product b, then the semicrossed product ×α + imbeds canonically, completely isometrically into ()×α +. Hence in the case of a non-constant Blaschke product b, the C*-envelope has the form (b)×s , where (b, s) is the solenoid system for (, b). In the case where b is a constant, then the C*-envelope of ×α + is strongly Morita equivalent to a crossed product of the form (e)×s , where e × × is a suitable map and (e, s) is the solenoid system for ( × , \, e) .