Title
Chaotic Billiards,Used
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In this new treatment of one of the most dynamic but difficult topics in modern theory, Chernov and Markarian keep the beginner in mind as they start from the basics and work through all the definitions and give full proofs of the main theorems as they cover basic constructions, Lyapunov exponents and hyperbolicity, dispersing billiards, dynamics of unstable manifolds, ergodic properties, statistical properties, Bunimovich billiards and general focusing chaotic billiards. Readers should have completed graduate courses in measure theory, probability, Riemann geometry, topology and complex analysis. Annotation 2006 Book News, Inc., Portland, OR (booknews.com)
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- Q: What topics does 'Chaotic Billiards' cover? A: 'Chaotic Billiards' covers a range of advanced topics in modern theory, including basic constructions, Lyapunov exponents, hyperbolicity, dispersing billiards, dynamics of unstable manifolds, ergodic properties, statistical properties, and Bunimovich billiards.
- Q: Who is the author of 'Chaotic Billiards'? A: The author of 'Chaotic Billiards' is Nikolai Chernov, who is known for his work in mathematical analysis and dynamical systems.
- Q: What is the intended audience for this book? A: 'Chaotic Billiards' is aimed at graduate students and researchers who have completed courses in measure theory, probability, Riemann geometry, topology, and complex analysis.
- Q: What is the condition of the book? A: 'Chaotic Billiards' is a new book, ensuring that readers receive a quality product that is free from marks or wear.
- Q: How many pages does 'Chaotic Billiards' have? A: 'Chaotic Billiards' contains a total of 316 pages, providing a comprehensive exploration of the subject matter.
- Q: What type of binding does the book have? A: 'Chaotic Billiards' is available in hardcover binding, which adds durability and a professional appearance.
- Q: When was 'Chaotic Billiards' published? A: 'Chaotic Billiards' was published on July 26, 2006.
- Q: Are there any reviews available for 'Chaotic Billiards'? A: Yes, reviews for 'Chaotic Billiards' can be found on various online platforms, providing insights from readers about its content and value.
- Q: What makes 'Chaotic Billiards' unique? A: 'Chaotic Billiards' is unique in its thorough approach to complex topics in chaos theory, making it accessible for beginners while still being informative for advanced readers.
- Q: Is there any supplementary material included with the book? A: 'Chaotic Billiards' does not typically include supplementary materials; however, readers may find additional resources through academic institutions or online databases.