Ebook Info
- Published: 2003
- Number of pages: 121 pages
- Format: PDF
- File Size: 17.60 MB
- Authors: Anatole Katok
Description
Ergodic theory studies measure-preserving transformations of measure spaces. These objects are intrinsically infinite, and the notion of an individual point or of an orbit makes no sense. Still there are a variety of situations when a measure preserving transformation (and its asymptotic behavior) can be well described as a limit of certain finite objects (periodic processes). The first part of this book develops this idea systematically. Genericity of approximation in various categories is explored, and numerous applications are presented, including spectral multiplicity and properties of the maximal spectral type. The second part of the book contains a treatment of various constructions of cohomological nature with an emphasis on obtaining interesting asymptotic behavior from approximate pictures at different time scales. The book presents a view of ergodic theory not found in other expository sources. It is suitable for graduate students familiar with measure theory and basic functional analysis.
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Free Download Combinatorial Constructions in Ergodic Theory and Dynamics (University Lecture Series) in PDF format
Combinatorial Constructions in Ergodic Theory and Dynamics (University Lecture Series) PDF Free Download
Download Combinatorial Constructions in Ergodic Theory and Dynamics (University Lecture Series) 2003 PDF Free
Combinatorial Constructions in Ergodic Theory and Dynamics (University Lecture Series) 2003 PDF Free Download
Download Combinatorial Constructions in Ergodic Theory and Dynamics (University Lecture Series) PDF
Free Download Ebook Combinatorial Constructions in Ergodic Theory and Dynamics (University Lecture Series)