Iterated Minkowski sums, horoballs and north-south dynamics

IF 0.6 3区数学 Q3 MATHEMATICS

Groups Geometry and Dynamics Pub Date : 2020-09-19 DOI:10.4171/ggd/670

Jeremias Epperlein, Tom Meyerovitch

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引用次数: 3

Abstract

Given a finite generating set $A$ for a group $\Gamma$, we study the map $W \mapsto WA$ as a topological dynamical system -- a continuous self-map of the compact metrizable space of subsets of $\Gamma$. If the set $A$ generates $\Gamma$ as a semigroup and contains the identity, there are precisely two fixed points, one of which is attracting. This supports the initial impression that the dynamics of this map is rather trivial. Indeed, at least when $\Gamma= \mathbb{Z}^d$ and $A \subseteq \mathbb{Z}^d$ a finite positively generating set containing the natural invertible extension of the map $W \mapsto W+A$ is always topologically conjugate to the unique "north-south" dynamics on the Cantor set. In contrast to this, we show that various natural "geometric" properties of the finitely generated group $(\Gamma,A)$ can be recovered from the dynamics of this map, in particular, the growth type and amenability of $\Gamma$. When $\Gamma = \mathbb{Z}^d$, we show that the volume of the convex hull of the generating set $A$ is also an invariant of topological conjugacy. Our study introduces, utilizes and develops a certain convexity structure on subsets of the group $\Gamma$, related to a new concept which we call the sheltered hull of a set. We also relate this study to the structure of horoballs in finitely generated groups, focusing on the abelian case.

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迭代闵可夫斯基和，球和南北动力学

给定群$\Gamma$的有限生成集$a$，我们将映射$W\mapsto-WA$研究为拓扑动力系统——$\Gamma子集的紧致可度量空间的连续自映射。如果集合$A$生成$\Gamma$作为半群并且包含恒等式，则恰好存在两个不动点，其中一个是吸引的。这支持了最初的印象，即该地图的动力学相当琐碎。事实上，至少当$\Gamma=\mathbb｛Z｝^d$和$A\substeq\mathbb{Z｝^ d$时，包含映射$W\mapsto W+A$的自然可逆扩展的有限正生成集总是拓扑共轭于Cantor集上唯一的“南北”动力学。与此相反，我们证明了有限生成群$（\Gamma，A）$的各种自然“几何”性质可以从该映射的动力学中恢复，特别是$\Gamma$的增长类型和可修正性。当$\Gamma=\mathbb｛Z｝^d$时，我们证明了生成集$A$的凸包的体积也是拓扑共轭的不变量。我们的研究在群$\Gamma$的子集上引入、利用和发展了一个特定的凸性结构，这与我们称之为集合的遮蔽壳的一个新概念有关。我们还将这项研究与有限生成群中星座球的结构联系起来，重点关注阿贝尔情况。

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

Groups Geometry and Dynamics 数学-数学

CiteScore

1.10

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Groups, Geometry, and Dynamics is devoted to publication of research articles that focus on groups or group actions as well as articles in other areas of mathematics in which groups or group actions are used as a main tool. The journal covers all topics of modern group theory with preference given to geometric, asymptotic and combinatorial group theory, dynamics of group actions, probabilistic and analytical methods, interaction with ergodic theory and operator algebras, and other related fields. Topics covered include: geometric group theory; asymptotic group theory; combinatorial group theory; probabilities on groups; computational aspects and complexity; harmonic and functional analysis on groups, free probability; ergodic theory of group actions; cohomology of groups and exotic cohomologies; groups and low-dimensional topology; group actions on trees, buildings, rooted trees.