Applied Mathematical Sciences Volume 38 - Link.springer

Applied Mathematical SciencesVolume 38Edit orsF. JohnJ.E . MarsdenL. SirovichAdvisorsM. G hil J.K. Hale J. Ke llerK. Kirchgassne r BJ . MatkowskyJ.T. Stuart A. Weinstein

Applied Mathematical 18.19.20.21.22.23.24 .25.26 3.44.45.46.47 .48.49.50.51.John : Partial Differential Equations, 4th ed.Sirovich : Techniques of Asymptotic Analysis.Hale : Theory of Functional Differential Equations, 2nd ed.Percus : Combinatorial Methods.von Mises/Friedrichs: Fluid Dynamics.Fre iberger/Grenander: A Short Course in Computational Probability and Statistics.Pipkin : Lectures on Viscoelasticity Theory.Giacoglia: Perturbation Methods in Non-linear Systems.Fr iedrichs : Spectral Theory of Operators in Hilbert Space.Stroud : Numerical Quadrature and Solution of Ordinary Differential Equations.Wolovich: Linear Multivariable Systems.Berkovitz: Optimal Control Theory.Bluman/Cole: Similarity Methods for Differential Equations.Yoshizawa: Stability Theory and the Existence of Periodic Solution and Almost Periodic Solutions .Braun : Differential Equations and Their Applications, 3rd ed,Lefschetz: Applications of Algebraic Topology.Collatz /Wetterling: Optimization Problems.Grenander: Pattern Synthesis: Lectures in Pattern Theory, Vol. I.Marsden/McCracken : Hopf Bifurcation and Its Applications.Driver: Ordinary and Delay Differential Equations.Courant/Friedrichs: Supersonic Flow and Shock Waves.Rouchelliabetsll.aloy: Stability Theory by Liapunov 's Direct Method.Lamperti: Stochastic Processes: A Survey of the Mathematical Theory.Grenander: Pattern Analysis: Lectures in Pattern Theory, Vol. II.Dav ies: Integral Transforms and Their Applications, 2nd ed.Kushner/Clark : Stochastic Approximation Methods for Constrained and Unconstrained Systems.de Boor: A Practical Guide to Splines.Keilson: Markov Chain Models-Rarity and Exponemiality.de Veubeke : A Course in Elasticity.Shiatycki: Geometric Quantization and Quantum Mechanics.Reid: Sturmian Theory for Ordinary Differential Equations.Me is/Markowitz: Numerical Solution of Partial Differential Equations.Grenander: Regular Structures: Lectures in Pattern Theory, Vol. III.Kevorkian/Cole: Perturbation Methods in Applied Mathematics.Carr : Applications of Centre Manifold Theory.Bengtsson/Ghil/Klillen: Dynamic Meteorology: Data Assimilation Methods.Saperstone: Semidynamical Systems in Infinite Dimensional Spaces.Lichtenberg/Lieberman : Regular and Chaotic Dynamics, 2nd ed.Piccini/Stampacch iaiVidossi ch: Ordinary Differential Equations in R' .Naylor/Sell : Linear Operator Theory in Engineering and Science.Sparrow: The Lorenz Equations: Bifurcations, Chaos, and Strange Attractors.Guckenheimerlliolmes: Nonlinear Oscillations, Dynamical Systems and Bifurcations of Vector Fields.Ockend on/Taylor: Inviscid Fluid Flows.Pazy: Semigroups of Linear Operators and Applications to Partial Differential Equations.Glashoff/Gustafson: Linear Operations and Approximation : An Introduction to the Theoretical Analysisand Numerical Treatment of Semi-Infinite Programs.Wilcox: Scattering Theory for Diffraction Gratings.Hale et al: An Introduction to Infinite Dimensional Dynamical Systems-Geometric Theory.Murray : Asymptotic Analysis.Ladyzhenskaya: The Boundary-Value Problems of Mathematical Physics.Wilcox: Sound Propagation in Stratified Fluids.Golub itskyischaeffer: Bifurcation and Groups in Bifurcation Theory, Vol. I.(continued following index)

A.J. LichtenbergM.A. LiebermanRegular andChaotic DynamicsSecond EditionWith 225 FiguresSpringer Science Business Media, LLC

A.J. LichtenbergM.A. LiebermanDepartment of Electrical Engineeringand Computer SciencesUniver sity of Californi aBerkeley, CA 94720USAEditorsF.JohnCourant Institute ofM athematical SciencesNew York UniversityNew York, NY 10012USAJ.E. MarsdenD epa rtment ofMathematicsU niversity of CaliforniaBerkele y, CA 94720USAL. Sirov ichDivision ofApplied MathematicsBrown UniversityProvidence, RI 02912USAMathematics Subject Classification (1991): 70Kxx; 60Hxx; 34Cxx; 35BxxLibrary of Congress Cataloging in Publication DataLichtenberg, Allan J.Regular and chaotic dynamics/ AJ. Lichtenberg, M.A. Lieberman .2nd ed.p. cm.-(Applied mathematical sciences; v. 38)Includes bibliographical reference s a nd index .1. Nonlinear oscillations. 2. Stochastic processes.3. Hamiltonian systems . 1. Lieberman, M.A. (Michael A.)II. Title . III. Series: Applied mathematical sciences (SpringerVerlag New York Inc.); v. 38.QAI.A647 vol. 38 1992[QA867.5]510 s---dc20[531'.32]91-39849This book is the second revised and expanded edition of "Regular and Stochastic Motion,"which was published in the Applied Mathematical Sciences series Vol. 38 by Springer-Verlagin 1983.Printed on acid-free paper.1983, 1992 Springer Science Business Media New YorkOriginally published by Springer-Verlag New York, Inc in 1992.Softcover reprint of the hardcover 2nd edition 1992 All right s reserved. This work may not be translated or copied in whole or in part with out thewritten permission of the publisher Springer Science Business Media, LLCexcept for brief excerpts in connection with reviews or schola rlyanalysis. Use in connection with any form of information storage and retrieval, electronicadaptation, computer software, or by similar or dissimilar methodology now known or hereafterdeveloped is forbidden.The use of general descriptive names, trade names, trademarks, etc., in this publication, even ifthe former a re not especially identified, is not to be taken as a sign that such names, asunderstood by the Trade Marks and Merchandise Marks Act, may accordingly be used freelyby a nyone.Production managed by Francine Sikorski; manufacturing supervised by Robert Paella.Typeset by Integral T ypesetting, Norfolk, UK.9 8 7 654 3 2 IISBN 978-1-4419-3100-9ISBN 978-1-4757-2184-3 (eBook)DOI 10.1007 /978-1-4757-2184-3

To Elizabeth and Marlene

Preface to the Second EditionWhat's in a name? The original title of our book, Regular and StochasticMotion, was chosen to emphasize Hamiltonian dynamics and the physicalmotion of bodies. The new edition is more evenhanded, with considerablymore discussion of dissipative systems and dynamics not involving physicalmotion. To reflect this partial change of emphasis, we have substituted themore general terms in our title. The common usage of the new terms clarifiesthe emphasis of the book.The main change in the book has been to expand the sections ondissipative dynamics, including discussion of renormalization, circle maps,intermittancy, crises, transient chaos, multifractals, reconstruction, andcoupled mapping systems. These topics were either mainly in the mathematical literature or essentially unstudied when our first edition was written. Thevolume of work in these areas has surpassed that in Hamiltonian dynamicswithin the past few years.We have also made changes in the Hamiltonian sections, adding many newtopics such as more general transformation and stability theory, connectedstochasticity in two-dimensional maps , converse KAM theory, new topicsin diffusion theory, and an approach to equilibrium in many dimensions.Other sections such as mapping models have been revised to take intoaccount new perspectives. We have also corrected a number of misprintsand clarified various arguments with the help of colleagues and students,some of whom we acknowledge below. We have again chosen not to treatquantum chaos, partly due to our own lack of acquaintance with the subject.Since writing the first edition, a number of monographs and texts haveappeared that are complementary to ours, covering material with a differentemphasis, or covering material not covered at all in our book. In writingthe sections on dissipative dynamics, we benefited from monographs byGuckenheimer and Holmes (1983) and by Schuster (1988) : The former isdetailed and mathematically oriented with somewhat limited scope; the lattercovers some of the topics we have added, at a similar level. New books onvii

viiiPreface to the Second EditionHamiltonian mechanics have recently appeared; one, a concise treatment butincluding quantum chaos and a detailed treatment of integrability by Tabor(1989), and another, a thorough account relating Hamiltonian chaos toplasma and wave problems by Sagdeev et al. (1988). There is also a recentgeneral text by Jackson (1989) and an account of numerical methods byChua and Parker (1989). The above list is by no means exhaustive.There are many colleagues whose assistance was helpful in preparation ofthis new edition. We thank Per Bak, David Bruwiler, Jim Crutchfield, CelsoGrebogi, and Jerrold Marsden for reading sections of the manuscript relevantto their work; Chris Goedde for supplying material not yet published fromhis thesis; and Jim Howard, Chris Silva, and M. Nambu for carefully readingportions of the original edition and pointing out a number of misprints andminor errors. Particular thanks go to Boris Chirikov and associates whotranslated the original edition into Russian . Besides bringing misprints to ourattention, more substantive points were addressed. Once again, we gratefullyacknowledge our research support in the dynamics area from the NationalScience Foundation, the Office of Naval Research, and the Department ofEnergy. This continuing support has been essent ial for our developing manyof the topics that we treat in the new edition.

Preface to the First EditionThis book treats stochastic motion in nonlinear oscillator systems. Itdescribes a rapidly growing field of nonlinear mechanics with applicationsto a number of areas in science and engineering, including astronomy, plasmaphysics, statistical mechanics, and hydrodynamics. The main emphasis is onintrinsic stochasticity in Hamiltonian systems, where the stochastic motionis generated by the dynamics itself and not by external noise. However, theeffects of noise in modifying the intrinsic motion are also considered. Athorough introduction to chaotic motion in dissipative systems is given inthe final chapter.Although the roots of the field are old, dating back to the last century whenPoincare and others attempted to formulate a theory for nonlinear perturbations of planetary orbits, it was new mathematical results obtained in the1960s, together with computational results obtained using high-speed computers, that facilitated our new treatment of the subject. Since the newmethods partly originated in mathematical advances, there have been twoor three mathematical monographs exposing these developments. However,these monographs employ methods and language that are not readilyaccessible to scientists and engineers, and also do not give explicit techniquesfor making practical calculations.In our treatment of the material, we emphasize physical insight rather thanmathematic al rigor. We present practical methods for describing the motion,for determining the transition from regular to stoch astic behavior, and forcharacterizing the stochasticity. We rely heavily on numerical computationsto illustrate the methods and to validate them .The book is intended to be a self-contained text for physical scientists andengineers who wish to enter the field, and a reference for those researchersalready familiar with the methods. It may also be used as an advancedgraduate textbook in mechanics . We assume that the reader has the usualundergraduate mathematics and physics background, including a mechanicscourse at the junior or senior level in which the basic elements of Hamiltoniantheory have been covered . Some familiarity with Hamiltonian mechanics atix