Dynamics Reported Expositions in Dynamical Systems.

This book contains four excellent contributions on topics in dynamical systems by authors with an international reputation: "Hyperbolic and Exponential Dichotomy for Dynamical Systems", "Feedback Stabilizability of Time-periodic Parabolic Equations", "Homoclinic Bifurcations...

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Bibliographic Details
Corporate Author:	SpringerLink (Online service)
Format:	eBook
Language:	English
Published:	Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, 1996.
Edition:	1st ed. 1996.
Series:	Dynamics Reported. New Series, Expositions in Dynamical Systems, 5 Springer eBook Collection.
Subjects:	Mathematical analysis. Analysis (Mathematics). Manifolds (Mathematics). Complex manifolds. Mathematical physics. Electronic resources (E-books)
Online Access:	Click to view e-book
Holy Cross Note:	Loaded electronically. Electronic access restricted to members of the Holy Cross Community.

Table of Contents:

Hyperbolicity and Exponential Dichotomy for Dynamical Systems
1. Introduction
2. The Main Lemma
3. The Linearization Theorem of Hartman and Grobman
4. Hyperbolic Invariant Sets: e-orbits and Stable Manifolds
5. Structural Stability of Anosov Diffeomorphisms
6. Periodic Points of Anosov Diffeomorphisms
7. Axiom A Diffeomorphisms: Spectral Decomposition
8. The In-Phase Theorem
9. Flows
10. Proof of Lemma 1
References
Feedback Stabilizability of Time-Periodic ParabolicEquations
0. Introduction
I. Linear Periodic Evolution Equations
II. Controllability, Observability and Feedback Stabilizability
III. Applications to Second Order Time-Periodic Parabolic Initial-Boundary Value Problems
References
Homoclinic Bifurcations with Weakly Expanding Center
1. Introduction
2. Hypotheses, a Reduction Principle and Basic Existence Theorems
3. Preliminaries
4. Proof of the Main Results in 2
5. Simple Periodic Solutions
6. Bifurcations of Homoclinic Solutions with One-Dimensional Local Center Manifolds
7. Estimates Related to a Nondegenerate Hopf Bifurcation
8. Interaction of Homoclinic Bifurcation and Hopf Bifurcation
9. The Disappearance of Periodic and Aperiodic Solutions when ?2 Passes Through Turning Points
References
Homoclinic Orbits in a Four Dimensional Model of a Perturbed NLS Equation: A Geometric Singular Perturbation Study
1. Introduction
2. Geometric Structure and Dynamics of the Unperturbed System
3. Geometric Structure and Dynamics of the Perturbed System
4. Fiber Representations of Stable and Unstable Manifolds
5. Orbits Homoclinic to q€
6. Numerical Study of Orbits Homoclinic to q€
7. The Dynamical Consequences of Orbits Homoclinic to q€: The Existence and Nature of Chaos
8. Conclusion
References.

Dynamics Reported Expositions in Dynamical Systems.

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