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Invariant manifolds in discrete and continuous dynamical systems / Kaspar Nipp, Daniel Stoffer.

Math/Physics/Astronomy Library QA845 .N56 2013
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Format:
Book
Author/Creator:
Nipp, Kaspar, 1949- author.
Stoffer, Daniel, author.
Series:
EMS tracts in mathematics ; 21.
EMS tracts in mathematics ; 21
Language:
English
Subjects (All):
Dynamics.
Invariant manifolds.
Banach spaces.
Physical Description:
ix, 216 pages : illustrations ; 25 cm.
Place of Publication:
Zürich, Switzerland : European Mathematical Society, [2013]
Summary:
In this book, dynamical systems are investigated from a geometric viewpoint. Admitting an invariant manifold is a strong geometric property of a dynamical system. This text presents rigorous results on invariant manifolds and gives examples of possible applications. In the first part, discrete dynamical systems in Banach spaces are considered. Results on the existence and smoothness of attractive and repulsive invariant manifolds are derived. In addition, perturbations and approximations of the manifolds and the foliation of the adjacent space are treated. In the second part, analogous results for continuous dynamical systems in finite dimensions are established. In the third part, the theory developed is applied to problems in numerical analysis and to singularly perturbed systems of ordinary differential equations. The mathematical approach is based on the so-called graph transform, already used by Hadamard in 1901. The aim is to establish invariant manifold results in a simple setting that provides quantitative estimates. The book is targeted at researchers in the field of dynamical systems interested in precise theorems that are easy to apply. The application part might also serve as an underlying text for a student seminar in mathematics. A publication of the European Mathematical Society (EMS). Distributed within the Americas by the American Mathematical Society.
Contents:
1. Existence
2. Perturbation and approximation
3. Smoothness
4. Foliation
5. Smoothness of the foliation with respect to the base point
6. A general result for the time-[Tau] map
7. Invariant manifold results
8. Fixed points and equilibria
9. The one-step method associated to a linear multistep method
10. Invariant manifolds for singularly perturbed ODEs
11. Runge-Kutta methods applied to singularly perturbed ODEs
12. Invariant curves of Perturbed harmonic oscillators
13. Blow-up in singular perturbations
14. Application of Runge-Kutta methods to differential-algebraic equations
Appendix A. Hypotheses and conditions for maps
Appendix B. Hypotheses and conditions for ODEs.
Notes:
Includes bibliographical references (pages 207-214) and index.
ISBN:
9783037191248
3037191244
OCLC:
857405246

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