A note on Cartan isometries

Abstract

We record a lifting theorem for the intertwiner of two S-isometries which are those subnormal operator tuples whose minimal normal extensions have their Taylor spectra contained in the Shilov boundary of a certain function algebra associated with , being a bounded convex domain in n containing the origin. The theorem captures several known lifting results in the literature and yields interesting new examples of liftings as a consequence of its being applicabile to Cartesian products of classical Cartan domains in n. Further, we derive intrinsic characterizations of S-isometries where is a classical Cartan domain of any of the types I, II, III and IV, and we also provide a neat description of an S-isometry in case is a finite Cartesian product of such Cartan domains.