English

$C^*$-Operator systems and crossed products

Operator Algebras 2019-10-16 v1

Abstract

The purpose of this paper is to introduce a consistent notion of universal and reduced crossed products by actions and coactions of groups on operator systems and operator spaces. In particular we shall put emphasis to reveal the full power of the universal properties of the the universal crossed products. It turns out that to make things consistent, it seems useful to perform our constructions on some bigger categories which allow the right framework for studying the universal properties and which are stable under the construction of crossed products even for non-discrete groups. In the case of operator systems, this larger category is what we call a CC^*-operator system, i.e., a selfadjoint subspace XX of some B(H)\mathcal B(H) which contains a CC^*-algebra AA such that AX=X=XAAX=X=XA. In the case of operator spaces, the larger category is given by what we call CC^*-operator bimodules. After we introduced the respective crossed products we show that the classical Imai-Takai and Katayama duality theorems for crossed products by group (co-)actions on CC^*-algebras extend one-to-one to our notion of crossed products by CC^*-operator systems and CC^*-operator bimodules.

Keywords

Cite

@article{arxiv.1910.06605,
  title  = {$C^*$-Operator systems and crossed products},
  author = {Massoud Amini and Siegfried Echterhoff and Hamed Nikpey},
  journal= {arXiv preprint arXiv:1910.06605},
  year   = {2019}
}

Comments

This paper is a completely rewritten and reorganized replacement of the paper "Crossed products by operator spaces" (see arXiv:1512.07776)

R2 v1 2026-06-23T11:43:54.801Z