野康托动作

IF 0.7 4区数学 Q2 MATHEMATICS

Journal of the Mathematical Society of Japan Pub Date : 2020-10-01 DOI:10.2969/JMSJ/85748574

J. '. L'opez, Ram'on Barral Lij'o, O. Lukina, Hiraku Nozawa

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引用次数: 4

摘要

群$G$在Cantor集$X$上的最小等连续作用的判别群是由固定给定点的同胚组成的$X$同胚群中作用的闭包的子群。与作用相关的稳定器群和集中器群是作为具有某些性质的判别群的子群序列的直接极限而获得的。Cantor集上的极小等连续群作用允许通过稳定器和中心化器直接极限群的性质进行分类。在本文中，我们构造了Cantor集上最小等连续作用的新的例子族，这些例子说明了这种分类的某些方面。这些示例被构造为对有根树的操作。作用群是群的乘积或环积的可数子群。我们讨论了我们的结果在研究动力系统的吸引子和叶理的极小集中的应用。

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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Wild Cantor actions

The discriminant group of a minimal equicontinuous action of a group $G$ on a Cantor set $X$ is the subgroup of the closure of the action in the group of homeomorphisms of $X$, consisting of homeomorphisms which fix a given point. The stabilizer and the centralizer groups associated to the action are obtained as direct limits of sequences of subgroups of the discriminant group with certain properties. Minimal equicontinuous group actions on Cantor sets admit a classification by the properties of the stabilizer and centralizer direct limit groups. In this paper, we construct new families of examples of minimal equicontinuous actions on Cantor sets, which illustrate certain aspects of this classification. These examples are constructed as actions on rooted trees. The acting groups are countable subgroups of the product or of the wreath product of groups. We discuss applications of our results to the study of attractors of dynamical systems and of minimal sets of foliations.

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来源期刊

Journal of the Mathematical Society of Japan 数学-数学

CiteScore

1.40

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of the Mathematical Society of Japan (JMSJ) was founded in 1948 and is published quarterly by the Mathematical Society of Japan (MSJ). It covers a wide range of pure mathematics. To maintain high standards, research articles in the journal are selected by the editorial board with the aid of distinguished international referees. Electronic access to the articles is offered through Project Euclid and J-STAGE. We provide free access to back issues three years after publication (available also at Online Index).