English

Operator algebras and representations from commuting semigroup actions

Operator Algebras 2014-10-07 v4 Representation Theory

Abstract

Let \sS\sS be a countable, abelian semigroup of continuous surjections on a compact metric space XX. Corresponding to this dynamical system we associate two operator algebras, the tensor algebra, and the semicrossed product. There is a unique smallest C^*-algebra into which an operator algebra is completely isometrically embedded, which is the C^*-envelope. We provide two distinct characterizations of the C^*-envelope of the tensor algebra; one developed in a general setting by Katsura, and the other using tools of projective and inductive limits, which gives the C^*-envelope as a crossed product C^*-algebra. We also study two natural classes of representations, the left regular representations and the orbit representations. The first is Shilov, and the second has a Shilov resolution.

Keywords

Cite

@article{arxiv.1008.2244,
  title  = {Operator algebras and representations from commuting semigroup actions},
  author = {Benton L. Duncan and Justin R. Peters},
  journal= {arXiv preprint arXiv:1008.2244},
  year   = {2014}
}

Comments

25 pages This version has many minor corrections throughout

R2 v1 2026-06-21T16:00:18.409Z