Entropy, Lyapunov exponents, and rigidity of group actions

Ensaios Matemáticos Pub Date : 2018-09-24 DOI:10.21711/217504322019/em331

Aaron W. Brown, S. Alvarez, Dominique Malicet, Davi Obata, M. Rold'an, B. Santiago, Michele Triestino

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引用次数: 8

Abstract

This text is an expanded series of lecture notes based on a 5-hour course given at the workshop entitled Workshop for young researchers: Groups acting on manifolds held in Teresopolis, Brazil in June 2016. The course introduced a number of classical tools in smooth ergodic theory-particularly Lya-punov exponents and metric entropy-as tools to study rigidity properties of group actions on manifolds. We do not present comprehensive treatment of group actions or general rigidity programs. Rather, we focus on two rigidity results in higher-rank dynamics: the measure rigidity theorem for affine Anosov abelian actions on tori due to A. Katok and R. Spatzier [114] and recent the work of the author with D. Fisher, S. Hurtado, F. Rodriguez Hertz, and Z. Wang on actions of lattices in higher-rank semisimple Lie groups on manifolds [31, 36]. We give complete proofs of these results and present sufficient background in smooth ergodic theory needed for the proofs. A unifying theme in this text is the use of metric entropy and its relation to the geometry of conditional measures along foliations as a mechanism to verify invariance of measures. i

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熵、李雅普诺夫指数和群体行为的刚性

本文是根据2016年6月在巴西Teresopolis举行的题为“青年研究人员研讨会:对流形的研究小组”的5小时课程进行的一系列讲座笔记的扩展。本课程介绍了光滑遍历理论中的一些经典工具——特别是Lya-punov指数和度量熵——作为研究流形上群作用的刚性特性的工具。我们不提供集体行动的综合治疗或一般刚性方案。相反，我们关注的是高阶动力学中的两个刚性结果:A. Katok和R. Spatzier提出的环面上仿射Anosov阿贝尔作用的测度刚性定理[114]，以及作者最近与D. Fisher、S. Hurtado、F. Rodriguez Hertz和Z. Wang合作的关于流形上高阶半单李群中格的作用的研究[31,36]。我们给出了这些结果的完整证明，并给出了证明所需的光滑遍历理论的充分背景。在这篇文章的一个统一的主题是使用度量熵及其关系的几何条件措施沿叶作为一种机制，以验证措施的不变性。我

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Ensaios Matemáticos

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