Franklin

Introduction to smooth ergodic theory [electronic resource] / Luis Barreira, Yakov Pesin.

Author/Creator:
Barreira, Luis, 1968-
Other Title:
Graduate Studies in Mathematics.
Publication:
Providence, Rhode Island : American Mathematical Society, [2013]
Series:
Graduate Studies in Mathematics, v. 148
Format/Description:
Book
1 online resource (ix, 277 pages : 26 cm.)
Subjects:
Ergodic theory.
Topological dynamics.
System Details:
Mode of access : World Wide Web
Contents:
Chapter 1. Examples of hyperbolic dynamical systems Chapter 2. General theory of Lyapunov exponents Chapter 3. Lyapunov stability theory of nonautonomous equations Chapter 4. Elements of the nonuniform hyperbolicity theory Chapter 5. Cocycles over dynamical systems Chapter 6. The Multiplicative Ergodic Theorem Chapter 7. Local manifold theory Chapter 8. Absolute continuity of local manifolds Chapter 9. Ergodic properties of smooth hyperbolic measures Chapter 10. Geodesic flows on surfaces of nonpositive curvature Chapter 11. Cone technics Chapter 12. Partially hyperbolic diffeomorphisms with nonzero exponents Chapter 13. More examples of dynamical systems with nonzero Lyapunov exponents Chapter 14. Anosov rigidity Chapter 15. $C^1$ pathological behavior: Pugh's example
Notes:
Includes bibliographical references (pages 267-271) and index.
Electronic reproduction. Providence, Rhode Island : American Mathematical Society. 2013
Description based on print version record.
Contributor:
Pesin, Ya. B.
Other format:
Print version: Barreira, Luis, 1968- Introduction to smooth ergodic theory /
ISBN:
9781470409722 (online)
Access Restriction:
Restricted for use by site license.
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