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Applications of Centre Manifold Theory PDF

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Applied Mathematical Sciences I Volume 35 Jack Carr Applications of Centre Manifold Theory Springer-Verlag New York Heidelberg Berlin Arch W. Naylor George R. Sell University of Michigan University of Minnesota Department of Electrical Institute for Mathematics and Computer Engineering and its Applications Ann Arbor, MI 48104 514 Vincent Hall USA 206 Church Street, S.E. Minneapolis, MN 55455 USA Editors J. E. Marsden L. Sirovich Department of Division of Mathematics Applied Mathematics University of California Brown University Berkeley, CA 94720 Providence, RI 02912 USA USA AMS Subject Classifications: 4601, 4701, 1501, 2801, 34B25, 4001, 4201, 4401, 4501, 54E35,9301 Library of Congress Cataloging in Publication Data Naylor, Arch W. Linear operator theory in engineering and science (Applied mathematical sciences; 40) Includes index. 1. Linear operators. I. Sell, George R., 1937- . ll. Title. ill. Series: Applied mathematical sciences (Springer-Verlag New York Inc.); 40. QA1.A647 vol. 40 [ QA329.2] 510s 82-10432 [ 515.7 '246 ] ISBN-13: 978-0-387-90577-8 e-ISBN-I3: 978-1-4612-5929-9 DOl: 10.1007/978-1-4612-5929-9 (First Springer edition, with a few minor corrections-This title was originally published in 1971 by Holt, Rinehart and Winston, Inc.) First softcover printing, 2000. © 1982 by Springer-Verlag New York Inc. All rights reserved. No part of this book may be translated or reproduced in any form without written permission from Springer-Verlag, 175 Fifth Avenue, New York, New York 10010, USA. 9 8 7 6 5 432 1 To my parents PREFACE These notes are based on a series of lectures given in the Lefschetz Center for Dynamical Systems in the Division of Applied Mathematics at Brown University during the academic year 1978-79. The purpose of the lectures was to give an introduction to the applications of centre manifold theory to differential equations. Most of the material is presented in an informal fashion, by means of worked examples in the hope that this clarifies the use of centre manifold theory. The main application of centre manifold theory given in these notes is to dynamic bifurcation theory. Dynamic bifurcation theory is concerned with topological changes in the nature of the solutions of differential equations as para meters are varied. Such an example is the creation of periodic orbits from an equilibrium point as a parameter crosses a critical value. In certain circumstances, the application of centre manifold theory reduces the dimension of the system under investigation. In this respect the centre manifold theory plays the same role for dynamic problems as the Liapunov-Schmitt procedure plays for the analysis of static solutions. Our use of centre manifold theory in bifurcation problems follows that of Ruelle and Takens [57) and of Marsden and McCracken [51) . In order to make these notes more widely accessible, we give a full account of centre manifold theory for finite dimensional systems. Indeed, the first five chapters are de voted to this. Once the finite dimensional case is under stood, the step up to infinite dimensional problems is essentially technical. Throughout these notes we give the simplest such theory, for example our equations are autono mous. Once the core of an idea has been understood in a simple setting, generalizations to more complicated situations are much more readily understood. In Chapter 1, we state the main results of centre mani fold theory for finite dimensional systems and we illustrate their use by a few simple examples. In Chapter 2, we prove the theorems which were stated in Chapter 1, and Chapter 3 contains further examples. In Section 2 of Chapter 3 we out line Hopf bifurcation theory for Z-dimensional systems. In Section 3 of Chapter 3 we apply this theory to a singular per turbation problem which arises in biology. In Example 3 of Chapter 6 we apply the same theory to a system of partial dif ferential equations. In Chapter 4 we study a dynamic bifurca tion problem in the plane with two parameters. Some of the results in this chapter are new and, in particular, they con firm a conjecture of Takens [64). Chapter 4 can be read in dependently of the rest of the notes. In Chapter 5, we apply the theory of Chapter 4 to a 4-dimensional system. In Chap ter 6, we extend the centre manifold theory given in Chapter 2 to a simple class of infinite dimensional problems. Fin ally, we illustrate their use in partial differential equa tions by means of some simple examples. first became interested in centre manifold theory through reading Dan Henry's Lecture Notes (34). My debt to these notes is enormous. would like to thank Jack K. Hale. Dan Henry and John Mallet-Paret for many valuable discussions during the gestation period of these notes. This work was done with the financial support of the United States Army, Durham, under AROD DAAG 29-76-G0294. Jack Carr December 1980 TABLE OF CONTENTS Page CHAPTER 1. INTRODUCTION TO CENTRE MANIFOLD THEORY 1 1.1. Introduction . . • I 1. 2. Motivation •... 1 1. 3. Centre Manifolds . 3 1.4. Examples . . . . . 5 1. S. Bifurcation Theory . . • . 11 1.6. Comments on the Literature 13 CHAPTER 2. PROOFS OF THEOREMS 14 2.1. Introduction . . . l4 2.2. A Simple Example . . . • . . . 14 2.3. Existence of Centre Manifolds. 16 2.4. Reduction Principle . ....... . 19 2. S • Approximation of the Centre Manifold 2S 2.6. . Properties of Centre Manifolds . . . . 28 2.7. Global Invariant Manifolds for Singular Perturbation Problems. 30 2.8. Centre Manifold Theorems for Maps. 33 CHAPTER 3. EXAMPLES . . . . . . . . 37 3.1. Rate of Decay Estimates in Critical Cases. 37 3.2. Hopf Bifurcation . . . .• ...•. • 39 3.3. Hopf Bifurcation in a Singular Perturbation Problem .... .. ... . . . 44 3.4. Bifurcation of Maps ...... . 50 CHAPTER 4. BIFURCATIONS WITH TWO PARAMETERS IN TWO SPACE DIMENSIONS S4 4.1. Introduction . 54 4.2. Preliminaries. 57 4.3. Scaling. . . 64 4.4. The Case £1 > 0 64 4.5. The Case £ < 0 77 4.6. More Seal in! . . . . . . • • . . . 78 4.7. Completion of the Phase Portraits. 80 4.8. Remarks and Exercises ..... 81 4.9. Quadratic Nonlinearities • .. 83 CHAPTER 5. APPLICATION TO A PANEL FLUTTER PROBLEM 88 5.1. Introduction . 88 5.2. Reduction to a Second Order Equation 89 5.3. Calculation of Linear Terms. . 93 5.4. Calculation of the Nonlinear Terms . 95 Page CHAPTER 6. INFINITE DIMENSIONAL PROBLEMS. 97 6.1. Introduction . . 97 6.2. Semigroup Theory 97 6.3. Centre Manifolds 117 6.4. Examples 120 REFERENCES 136 INDEX ... 141 CHAPTER 1 INTRODUCTION TO CENTRE MANIFOLD THEORY 1.1. Introduction In this chapter we state the main results of centre manifold theory for finite dimensional systems and give some simple examples to illustrate their application. 1.2. Motivation To motivate the study of centre manifolds we first look at a simple example. Consider the system 3 x • ax (1.2.1) J where a is a constant. Since the equations are uncoupled we can easily show that the zero solution of (1.2.1) is asymptotically stable if and only if a < O. Suppose now that (1.2.2) Since the equations are coupled we cannot immediately decide if the zero solution of (1.2.2) is asymptotically stable, but we might suspect that it is if a < o. The key to understand ing the relation of equation (1.2.2) to equation (1.2.1) is 1

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