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E-grāmata: Differentiable Dynamical Systems

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  • Formāts: 192 pages
  • Sērija : Graduate Studies in Mathematics
  • Izdošanas datums: 30-Jul-2016
  • Izdevniecība: American Mathematical Society
  • ISBN-13: 9781470432102
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Differentiable Dynamical SystemsPalielināt
  • Formāts: 192 pages
  • Sērija : Graduate Studies in Mathematics
  • Izdošanas datums: 30-Jul-2016
  • Izdevniecība: American Mathematical Society
  • ISBN-13: 9781470432102
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This is a graduate text in differentiable dynamical systems. It focuses on structural stability and hyperbolicity, a topic that is central to the field. Starting with the basic concepts of dynamical systems, analyzing the historic systems of the Smale horseshoe, Anosov toral automorphisms, and the solenoid attractor, the book develops the hyperbolic theory first for hyperbolic fixed points and then for general hyperbolic sets. The problems of stable manifolds, structural stability, and shadowing property are investigated, which lead to a highlight of the book, the -stability theorem of Smale.

While the content is rather standard, a key objective of the book is to present a thorough treatment for some tough material that has remained an obstacle to teaching and learning the subject matter. The treatment is straightforward and hence could be particularly suitable for self-study.

Recenzijas

This book introduces the reader to some basic concepts of hyperbolic theory of dynamical systems with emphasis on structural stability. It is well written, the proofs are presented with great attention to details, and every chapter ends with a good collection of exercises. It is suitable for a semester-long course on the basics of dynamical systems"". - Yakov Pesin, Penn State University

""Lan Wen's book is a thorough introduction to the ``classical'' theory of (uniformly) hyperbolic dynamics, updated in light of progress since Smale's seminal 1967 Bulletin article. The exposition is aimed at newcomers to the field and is clearly informed by the author's extensive experience teaching this material. A thorough discussion of some canonical examples and basic technical results culminates in the proof of the Omega-stability theorem and a discussion of structural stability. A fine basic text for an introductory dynamical systems course at the graduate level"". - Zbigniew Nitecki, Tufts University

"...[ T]he introductory parts of the book are quite suitable for graduate students, and the more advanced sections can be useful even for experts in the field." - S. Yu. Pilyugin, Mathematical Reviews

Preface ix
Chapter 1 Basics of dynamical systems
1(24)
§1.1 Basic concepts
4(6)
§1.2 Topological conjugacy and structural stability
10(4)
§1.3 Circle homeomorphisms
14(4)
§1.4 Conley's Fundamental Theorem of Dynamical Systems
18(7)
Exercises
22(3)
Chapter 2 Hyperbolic fixed points
25(32)
§2.1 Hyperbolic linear isomorphisms
25(4)
§2.2 Persistence of hyperbolic fixed points
29(5)
§2.3 Persistence of hyperbolicity for a fixed point
34(7)
§2.4 Hartman-Grobman theorem
41(4)
§2.5 The local stable manifold for a hyperbolic fixed point
45(12)
Exercises
54(3)
Chapter 3 Horseshoes, toral automorphisms, and solenoids
57(18)
§3.1 Symbolic dynamics
57(3)
§3.2 Smale horseshoe
60(6)
§3.3 Anosov toral automorphisms
66(4)
§3.4 The solenoid attractor
70(5)
Exercises
73(2)
Chapter 4 Hyperbolic sets
75(64)
§4.1 The concept of hyperbolic set
75(8)
§4.2 Persistence of hyperbolicity for an invariant set
83(6)
§4.3 Smoothness in Lemma 2.17 and Theorem 2.18
89(6)
§4.4 Stable manifolds of hyperbolic sets
95(22)
§4.5 Structural stability of hyperbolic sets
117(11)
§4.6 The shadowing lemma
128(11)
Exercises
134(5)
Chapter 5 Axiom A, no-cycle condition, and Ω-stability
139(18)
§5.1 Spectral decomposition and Axiom A
139(6)
§5.2 Cycle and Ω-explosion
145(2)
§5.3 No-cycle and Ω-stability
147(3)
§5.4 Equivalent descriptions
150(7)
Exercises
154(3)
Chapter 6 Quasi-hyperbolicity and linear transversality
157(24)
§6.1 The simplest setting
157(1)
§6.2 Quasi-hyperbolicity
158(8)
§6.3 Linear transversality
166(2)
§6.4 Applications
168(4)
§6.5 A Glimpse of the Stability Conjectures
172(9)
Exercises
180(1)
Bibliography 181(8)
Index 189
Lan Wen, Peking University, Beijing, China.
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