2019
DOI: 10.1090/memo/1240
|View full text |Cite
|
Sign up to set email alerts
|

Crossed Products of Operator Algebras

Abstract: Chapter 1. Introduction Chapter 2. Preliminaries 2.1. Generalities 2.2. C ˚-correspondences and tensor algebras 2.3. Crossed products of C ˚-algebras Chapter 3. Definitions and Fundamental Results Chapter 4. Maximal C ˚-covers, Iterated Crossed Products and Takai Duality Chapter 5. Crossed Products and the Dirichlet Property Chapter 6. Crossed Products and Semisimplicity 6.1. Crossed products by discrete abelian groups 6.2. Crossed products by compact abelian groups 6.3. More examples of crossed product Dirich… Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
4
1

Citation Types

0
108
0

Year Published

2019
2019
2023
2023

Publication Types

Select...
7
1

Relationship

2
6

Authors

Journals

citations
Cited by 23 publications
(108 citation statements)
references
References 96 publications
0
108
0
Order By: Relevance
“…The notions of the C * -envelope, also known as the non-commutative Shilov boundary, and the more delicate non-commutative Choquet boundary are very useful in operator algebras. A good instance of this appears in the recent work of Katsoulis and Ramsey, and Katsoulis on the Hao-Ng isomorphism problem [26,30], where non-self-adjoint algebras and their C * -envelopes play a prominent role.…”
Section: Introductionmentioning
confidence: 95%
See 1 more Smart Citation
“…The notions of the C * -envelope, also known as the non-commutative Shilov boundary, and the more delicate non-commutative Choquet boundary are very useful in operator algebras. A good instance of this appears in the recent work of Katsoulis and Ramsey, and Katsoulis on the Hao-Ng isomorphism problem [26,30], where non-self-adjoint algebras and their C * -envelopes play a prominent role.…”
Section: Introductionmentioning
confidence: 95%
“…Characterizing the C * -envelope of various operator structures was of use and intrigue to many authors, as can be seen for instance in [14,25,30]. In [29], Katsoulis and Kribs improve on the work in [35] and [22,Theorem 5.3] and show that the C * -envelope of a tensor algebra associated to a general C * -correspondence, is the Cuntz-Pimsner-Katsura algebra of the C * -correspondence.…”
Section: Introductionmentioning
confidence: 99%
“…First, we mention that the property of an operator algebra being RFD isn't preserved by crossed products with groups. This is an immediate consequence of the so-called Takai duality [28,Theorem 4.4]. We refer the interested reader to [28] for details on these topics.…”
Section: 1mentioning
confidence: 90%
“…We show that the reduced and full enveloping crossed products agree when the group G is amenable. We turn to nuclearity detectors in Section §5, allowing us to give counterexamples to the first two problems of the monograph of Katsoulis and Ramsey [23]. Finally, we show in Section §6 that the operator algebra U(W 3,2 ) is hyperrigid in its C * -envelope, which shows that the identity…”
Section: Introductionmentioning
confidence: 94%
“…Problem 1 asks whether the identity C * env (A ⋊ C * u (A),α G) = C * env (A) ⋊ α G holds for all operator algebra dynamical systems. If the identity above was true for all operator algebraic dynamical systems, then the Hao-Ng isomorphism theorem would have a positive answer for all C * -correspondences and all locally compact groups [23,Chapter 7]. In a similar direction, Problem 2 asks whether the images of C c (G, A) in C * env (A) ⋊ G and C * u (A) ⋊ G are canonically completely isometrically isomorphic.…”
Section: Introductionmentioning
confidence: 99%