Minimal compact group actions on C∗-algebras with simple fixed point algebras

被引:1
作者
Izumi, Masaki [1 ]
机构
[1] Kyoto Univ, Grad Sch Sci, Sakyo Ku, Kyoto 6068502, Japan
来源
REVIEWS IN MATHEMATICAL PHYSICS | 2024年
关键词
C-& lowast; -algebra; compact group actions; C-ASTERISK-ALGEBRAS; QUASI-PRODUCT ACTIONS; VON-NEUMANN-ALGEBRAS; OPERATOR-ALGEBRAS; ERGODIC ACTIONS; CLASSIFICATION; DUALITY; AUTOMORPHISMS; AMENABILITY; INCLUSIONS;
D O I
10.1142/S0129055X24610026
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
The notion of quasi-product actions of a compact group on a C & lowast;-algebra was introduced by Bratteli et al. in their attempt to seek an equivariant analogue of Glimm's characterization of non-type I C-& lowast;-algebras. We show that a faithful minimal action of a second countable compact group on a separable C-& lowast;-algebra is quasi-product whenever its fixed point algebra is simple. This was previously known only for compact abelian groups and for profinite groups. Our proof relies on a subfactor technique applied to finite index inclusions of simple C-& lowast;-algebras in the purely infinite case, and also uses ergodic actions of compact groups in the general case. As an application, we show that if moreover the fixed point algebra is a Kirchberg algebra, such an action is always isometrically shift-absorbing, and hence is classifiable by the equivariant KK-theory due to a recent result of Gabe-Szab & oacute;.
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页数:33
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