Crossed products by compact group actions with the Rokhlin property. Gardella, E. Journal of Noncommutative Geometry, 11(4):1593–1626, 2017. tex.ids: Gardella2016Crossed arXiv: 1408.1946 mr: 3743232![Crossed products by compact group actions with the Rokhlin property [link]](https://bibbase.org/img/filetypes/link.svg "link")
Paper doi abstract bibtex We present a systematic study of the structure of crossed products and fixed point algebras by compact group actions with the Rokhlin property on not necessarily unital C∗-algebras. Our main technical result is the existence of an approximate homomorphism from the algebra to its subalgebra of fixed points, which is a left inverse for the canonical inclusion. Upon combining this with results regarding local approximations, we show that a number of classes characterized by inductive limit decompositions with weakly semiprojective building blocks, are closed under formation of crossed products by such actions. Similarly, in the presence of the Rokhlin property, if the algebra has any of the following properties, then so do the crossed product and the fixed point algebra: being a Kirchberg algebra, being simple and having tracial rank zero or one, having real rank zero, having stable rank one, absorbing a strongly self-absorbing C∗-algebra, satisfying the Universal Coefficient Theorem (in the simple, nuclear case), and being weakly semiprojective. The ideal structure of crossed products and fixed point algebras by Rokhlin actions is also studied.
@article{gardella_crossed_2017,
title = {Crossed products by compact group actions with the {Rokhlin} property},
volume = {11},
issn = {1661-6952},
url = {https://mathscinet.ams.org/mathscinet-getitem?mr=3743232},
doi = {10.4171/JNCG/11-4-11},
abstract = {We present a systematic study of the structure of crossed products and fixed point algebras by compact group actions with the Rokhlin property on not necessarily unital C∗-algebras. Our main technical result is the existence of an approximate homomorphism from the algebra to its subalgebra of fixed points, which is a left inverse for the canonical inclusion. Upon combining this with results regarding local approximations, we show that a number of classes characterized by inductive limit decompositions with weakly semiprojective building blocks, are closed under formation of crossed products by such actions. Similarly, in the presence of the Rokhlin property, if the algebra has any of the following properties, then so do the crossed product and the fixed point algebra: being a Kirchberg algebra, being simple and having tracial rank zero or one, having real rank zero, having stable rank one, absorbing a strongly self-absorbing C∗-algebra, satisfying the Universal Coefficient Theorem (in the simple, nuclear case), and being weakly semiprojective. The ideal structure of crossed products and fixed point algebras by Rokhlin actions is also studied.},
number = {4},
urldate = {2020-12-14},
journal = {Journal of Noncommutative Geometry},
author = {Gardella, Eusebio},
year = {2017},
note = {tex.ids: Gardella2016Crossed
arXiv: 1408.1946
mr: 3743232},
keywords = {46L55 (Primary), 46L35 (Secondary), 46L80, Mathematics - Functional Analysis, Mathematics - Operator Algebras},
pages = {1593--1626},
}
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