Relative Topological Entropy for Actions of Non-discrete Groups on Compact Spaces in the Context of Cut and Project Schemes

Hauser T.

首页> 外文期刊>Journal of dynamics and differential equations >Relative Topological Entropy for Actions of Non-discrete Groups on Compact Spaces in the Context of Cut and Project Schemes

【24h】

Relative Topological Entropy for Actions of Non-discrete Groups on Compact Spaces in the Context of Cut and Project Schemes

机译：在切割和项目方案背景下紧凑型空间上的非离散组的行动的相对拓扑熵

获取原文

获取原文并翻译 | 示例

掌桥外文数据库（机构版） >>

开具论文收录证明 >>

文献代查 >>

页面导航

摘要
著录项
相关主题

摘要

In the study of aperiodic order via dynamical methods, topological entropy is an important concept. In this paper, parts of the theory, like Bowen's formula for fibre wise entropy or the independence of the definition from the choice of a Van Hove sequence, are extended to actions of several non-discrete groups. To establish these results, we will show that the Ornstein-Weiss lemma is valid for all considered groups which appear in the study of cut and project schemes.

机译：通过动态方法研究非周期性阶的研究，拓扑熵是一个重要的概念。在本文中，该理论的部分，如Bowen的纤维明智熵的公式或从van Hove序列选择的定义的独立性，延伸到几个非离散组的动作。为了建立这些结果，我们将表明，Ornstein-Weiss Lemma对所有被认为的裁定和项目计划研究中的群体有效。

著录项

来源
《Journal of dynamics and differential equations》 |2021年第2期|891-912|共22页
作者
Hauser T.;
展开▼
作者单位

Friedrich Schiller Univ Jena Fac Math & Comp Sci Inst Math D-07743 Jena Germany;

展开▼
收录信息
原文格式 PDF
正文语种 eng
中图分类
关键词
Entropy; Ornstein-Weiss lemma; Bowen formula; Uniform space; Dynamical system; Cut and project scheme; Amenable group; Van Hove sequence; Folner sequence; Uniform lattice;

机译：熵;ornstein-weiss lemma;bowen公式;均匀的空间;动态系统;剪切和项目方案;易于组;van hove序列;folner序列;均匀的格子;

Relative Topological Entropy for Actions of Non-discrete Groups on Compact Spaces in the Context of Cut and Project Schemes

摘要

著录项

相关主题

期刊订阅