Ordered $*$-Semigroups and a $C^*$-Correspondence for a Partial Isometry
Operator Algebras
2014-06-03 v3
Abstract
Certain -semigroups are associated with the universal -algebra generated by a partial isometry, which is itself the universal -algebra of a -semigroup. A fundamental role for a -structure on a semigroup is emphasized, and ordered and matricially ordered -semigroups are introduced, along with their universal -algebras. The universal -algebra generated by a partial isometry is isomorphic to a relative Cuntz-Pimsner -algebra of a -correspondence over the -algebra of a matricially ordered -semigroup. One may view the -algebra of a partial isometry as the crossed product algebra associated with a dynamical system defined by a complete order map modelled by a partial isometry acting on a matricially ordered -semigroup.
Keywords
Cite
@article{arxiv.1304.2284,
title = {Ordered $*$-Semigroups and a $C^*$-Correspondence for a Partial Isometry},
author = {Berndt Brenken},
journal= {arXiv preprint arXiv:1304.2284},
year = {2014}
}