DYNAMICAL MCDUFF-TYPE PROPERTIES FOR GROUP ACTIONS ON VON NEUMANN ALGEBRAS

IF 1.1 2区数学 Q1 MATHEMATICS

Journal of the Institute of Mathematics of Jussieu Pub Date : 2024-04-02 DOI:10.1017/s1474748024000057

Gábor Szabó, Lise Wouters

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引用次数: 0

Abstract

We consider the notion of strong self-absorption for continuous actions of locally compact groups on the hyperfinite II Abstract Image $_1$ factor and characterize when such an action is tensorially absorbed by another given action on any separably acting von Neumann algebra. This extends the well-known McDuff property for von Neumann algebras and is analogous to the core theorems around strongly self-absorbing C$^*$-dynamics. Given a countable discrete group G and an amenable action Abstract Image $G\curvearrowright M$ on any separably acting semifinite von Neumann algebra, we establish a type of measurable local-to-global principle: If a given strongly self-absorbing G-action is suitably absorbed at the level of each fibre in the direct integral decomposition of M, then it is tensorially absorbed by the action on M. As a direct application of Ocneanu’s theorem, we deduce that if M has the McDuff property, then every amenable G-action on M has the equivariant McDuff property, regardless whether M is assumed to be injective or not. By employing Tomita–Takesaki theory, we can extend the latter result to the general case, where M is not assumed to be semifinite.

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冯-诺依曼代数上的群作用的动力学麦克杜夫型性质

我们考虑了超无限 II$_1$ 因子上局部紧凑群连续作用的强自吸收概念，并描述了当这种作用被任何可分离作用的 von Neumann 代数上的另一个给定作用张量吸收时的特征。这扩展了著名的 von Neumann 代数的 McDuff 特性，类似于强自吸收 C$^*$ 动力学的核心定理。给定一个可数离散群 G 和任何可分离作用的半有限 von Neumann 代数上的一个可处理作用 $G\curvearrowright M$，我们建立了一种可度量的局部到全局原理：如果给定的强自吸收 G 作用在 M 的直接积分分解的每个纤维层面上被适当地吸收，那么它就会被 M 上的作用张量地吸收。作为奥克纳努定理的直接应用，我们推导出，如果 M 具有麦克杜夫性质，那么无论假定 M 是否为注入式，M 上的每一个可变 G 作用都具有等变麦克杜夫性质。通过使用富田竹崎理论，我们可以将后一结果推广到一般情况，即不假定 M 是半有限的。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of the Institute of Mathematics of Jussieu 数学-数学

CiteScore

2.40

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of the Institute of Mathematics of Jussieu publishes original research papers in any branch of pure mathematics; papers in logic and applied mathematics will also be considered, particularly when they have direct connections with pure mathematics. Its policy is to feature a wide variety of research areas and it welcomes the submission of papers from all parts of the world. Selection for publication is on the basis of reports from specialist referees commissioned by the Editors.