Nonlinear Dynamics and Chaos With Applications to Physics, Biology, Chemistry, and Engineering 3rd Edition

Description 

The goal of this third edition of Nonlinear Dynamics and Chaos: With Applications to Physics, Biology, Chemistry, and Engineering is the same as previous editions: to provide a good foundation – and a joyful experience – for anyone who’d like to learn about nonlinear dynamics and chaos from an applied perspective.

The presentation stresses analytical methods, concrete examples, and geometric intuition. The theory is developed systematically, starting with first-order differential equations and their bifurcations, followed by phase plane analysis, limit cycles and their bifurcations, and culminating with the Lorenz equations, chaos, iterated maps, period doubling, renormalization, fractals, and strange attractors.

The prerequisites are comfort with multivariable calculus and linear algebra, as well as a first course in physics. Ideas from probability, complex analysis, and Fourier analysis are invoked, but they’re either worked out from scratch or can be safely skipped (or accepted on faith).

Changes to this edition include substantial exercises about conceptual models of climate change, an updated treatment of the SIR model of epidemics, and amendments (based on recent research) about the Selkov model of oscillatory glycolysis. Equations, diagrams, and every word has been reconsidered and often revised. There are also about 50 new references, many of them from the recent literature.

The most notable change is a new chapter. Chapter 13 is about the Kuramoto model.

The Kuramoto model is an icon of nonlinear dynamics. Introduced in 1975 by the Japanese physicist Yoshiki Kuramoto, his elegant model is one of the rare examples of a high-dimensional nonlinear system that can be solved by elementary means.

Students and teachers have embraced the book in the past, its general approach and framework continue to be sound.

 

About the Author

Steven Strogatz is the Schurman Professor of Applied Mathematics at Cornell University. His honors include MIT’s highest teaching prize, a lifetime achievement award for the communication of mathematics to the general public, and membership in the American Academy of Arts and Sciences. His research on a wide variety of nonlinear systems from synchronized fireflies to small-world networks has been featured in the pages of Scientific American, Nature, Discover, Business Week, and The New York Times.

 

Table of Contents

Chapter 1       Overview

Part I             One-Dimensional Flows

Chapter 2       Flows on the Line

Chapter 3       Bifurcations

Chapter 4       Flows on the Circle

Part II           Two-Dimensional Flows

Chapter 5       Linear Systems

Chapter 6       Phase Plane

Chapter 7       Limit Cycles

Chapter 8       Bifurcations Revisited

Part III          Chaos

Chapter 9       Lorenz Equations

Chapter 10     One-Dimensional Maps

Chapter 11     Fractals

Chapter 12     Strange Attractors

Part IV          Collective Behavior

Chapter 13     Kuramoto Model

 

Answers to Selected Exercises

References

Author Index

Subject Index