Injective envelopes and the intersection property
Abstract
We consider the ideal structure of a reduced crossed product of a unital -algebra equipped with an action of a discrete group. More specifically we find sufficient and necessary conditions for the group action to have the intersection property, meaning that non-zero ideals in the reduced crossed product restrict to non-zero ideals in the underlying -algebra. We show that the intersection property of a group action on a -algebra is equivalent to the intersection property of the action on the equivariant injective envelope. We also show that the centre of the equivariant injective envelope always contains a -algebraic copy of the equivariant injective envelope of the centre of the injective envelope. Finally, we give applications of these results in the case when the group is -simple.
Keywords
Cite
@article{arxiv.1704.02723,
title = {Injective envelopes and the intersection property},
author = {Rasmus Sylvester Bryder},
journal= {arXiv preprint arXiv:1704.02723},
year = {2021}
}
Comments
To appear in J. Operator Theory. 23 pages; v4; reorganised preliminaries and examples, restructured results