遍历性理论引论

出版时间:2003-6  出版社:世界图书出版公司(此信息作废)  作者:P.Walters  页数:250  
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内容概要

In 1970 I gave a graduate course in ergodic theory at the University of Maryland in College Park, and these lectures were the basis of the Springer Lecture Notes in Mathematics Volume 458 called "Ergodic Theory--Introductory Lectures" which was published in 1975. This volume is nowout of print, so I decided to revise and add to the contents of these notes. I have updated the earlier chapters and have added some new chapters on the ergodic theory of continuous transformations of compact metric spaces. In particular, I have included some material on topological pressure and equilibrium states. In recent years there have been some fascinating interactions of ergodic theory with differentiable dynamics, differential geometry,number theory, von Neumann algebras, probability theory, statistical mechanics, and other topics. In Chapter 10 1 have briefly described some of these and given references to some of the others. I hope that this book will give the reader enough foundation to tackle the research papers on ergodictheory and its applications.

书籍目录

Chapter 0  Preliminaries  0.1  Introduction  0.2  Measure Spaces  0.3  Integration  0.4  Absolutely Continuous Measures and Conditional Expectations  0.5  Function Spaces  0.6  Haar Measure  0.7  Character Theory  0.8  Endomorphisms of Tori  0.9  Perron-Frobenius Theory  0.10 Topology  Chapter 1  Measure-Preserving Transformations  1.1  Definition and Examples  1.2  Problems in Ergodic Theory  1.3  Associated Isometries  1.4  Recurrence  1.5  Ergodicity  1.6  The Ergodic Theorem  1.7  Mixing  Chapter 2  Isomorphism, Conjugacy, and Spectral Isomorphism  2.1  Point Maps and Set Maps  2.2  Isomorphism of Measure-Preserving Transformations  2.3  Conjugacy of Measure-preserving Transformhtions  2.4  The Isomorphism Problem  2.5  Spectral Isomorphism  2.6  Spectral Invariants  Chapter 3  Measure-Preserving Transformations with Discrete Spectrum  3.1  Eigenvalues and Eigenfunctions  3.2  Discrete Spectrum  3.3  Group Rotations  Chapter 4  Entropy  4.1  Partitions and Subalgebras  4.2  Entropy of a Partition  4.3  Conditional Entropy  4.4  Entropy of a Measure-Preserving Transformation  4.5  Properties orb T,A  and h T    4.6  Some Methods for Calculating h T   4.7  Examples  4.8  How Good an Invariant is Entropy   4.9  Bernoulli Automorphisms and Kolmogorov Automorphisms  4.10 The Pinsker -Algebra of a Measure-Preserving Transformation  4.11 Sequence Entropy  4.12 Non-invertible Transformations  4.13 Comments  Chapter 5  Topological Dynamics  5.1  Examples  5.2  Minimality  5.3  The Non-wandering Set  5.4  Topological Transitivity  5.5  Topological Conjugacy and Discrete Spectrum  5.6  Expansive Homeomorphisms  Chapter 6  Invariant Measures for Continuous Transformations  6.1  Measures on Metric Spaces  6.2  Invariant Measures for Continuous Transformations  6.3  Interpretation of Ergodicity and Mixing  6.4  Relation of Invariant Measures to Non-wandering Sets, Periodic   Points and Topological Transitivity    6.5  Unique Ergodicity   6.6  Examples  Chapter 7  Topological Entropy  7.1  Definition Using Open Covers  7.2  Bowen's Definition  7.3  Calculation of Topological Entropy  Chapter 8  Relationship Between Topological Entropy and  Measure-Theoretic Entropy   8.1  The Entropy Map   8.2  The Variational Principle   8.3  Measures with Maximal Entropy   8.4  Entropy of Affine Transformations   8.5  The Distribution of Periodic Points   8.6  Definition of Measure-Theoretic Entropy Using the Metrics dn  Chapter 9  Topological Pressure and Its Relationship with  Invariant Measures  9.1  Topological Pressure  9.2  Properties of Pressure  9.3  The Variational Principle  9.4  Pressure Determines M X, T   9.5  Equilibrium States  Chapter 10  Applications and Other Topics  10.1  The Qualitative Behaviour of Diffeomorphisms  10.2  The Subadditive Ergodic Theorem and the Multiplicative Ergodic Theorem  10.3  Quasi-invariant Measures  10.4  Other Types of Isomorphism  10.5  Transformations of Intervals  10.6  Further Reading  References  Index

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用户评论 (总计12条)

 
 

  •   关于遍历论为数不多的经典教材,当然也有比较新的教材,可是价格实在承受不住,这本确实实惠。
  •   拓扑动力系统
  •   正版图书 超支持
  •   看着累啊~
  •   整体很不错啊!这本书很急用的,结果卖家很给力,不到两天就到货啦!谢谢啦!就是书可能放久了,有点脏了!呵呵 这是小问题啦!总的来说很不错,顶一下了!!
  •   书很好,印刷质量不错。还没看,希望以后多买当当上的GTM
  •   正在研读,这本书的作者感觉水平很高,书写得简介到位,印刷质量也好。如有同行也在读可以交流
  •   是了解动力系统的入门书
  •   不错的书,参考用
  •   可以配合着Furstenberg的《Recurrence in ergodic Theory and ***binatorial number Theory》一起看,作为入门基础。。。
  •   概述适合初学者,很经典,
  •   内容比较深奥,印刷质量一般。
 

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