Numerical Bifurcation Analysis of Maps:
β Kuznetsov, Yuri A. ;Meijer, Hil G. E.
π Library
π
2019
π Cambridge University Press
β¦ LIBER β¦
π
Numerical bifurcation analysis of maps: from theory to software
β Scribed by Kuznetsov Yu.A., Meijer H.G.E
- Publisher
- Cambridge University Press
- Year
- 2019
- Tongue
- English
- Leaves
- 424
- Series
- Cambridge monographs on applied and computational mathematics 34
- Category
- Library
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No coin nor oath required. For personal study only.
β¦ Synopsis
This book combines a comprehensive state-of-the-art analysis of bifurcations of discrete-time dynamical systems with concrete instruction on implementations (and example applications) in the free MATLAB (R) software MatContM developed by the authors. While self-contained and suitable for independent study, the book is also written with users in mind and is an invaluable reference for practitioners. Part I focuses on theory, providing a systematic presentation of bifurcations of fixed points and cycles of finite-dimensional maps, up to and including cases with two control parameters. Several complementary methods, including Lyapunov exponents, invariant manifolds and homoclinic structures, and parts of chaos theory, are presented. Part II introduces MatContM through step-by-step tutorials on how to use the general numerical methods described in Part I for simple dynamical models defined by one- and two-dimensional maps. Further examples in Part III show how MatContM can be used to analyze more complicated models from modern engineering, ecology, and economics.
β¦ Table of Contents
Cover......Page 1
Front Matter......Page 3
Numerical Bifurcation Analysis of Maps:From Theory to Software......Page 5
Copyright......Page 6
Dedication......Page 7
Contents......Page 9
Preface......Page 13
Part One: Theory......Page 17
1 Analytical Methods......Page 19
2 One-Parameter Bifurcations of Maps......Page 46
3 Two-Parameter Local Bifurcations of Maps......Page 66
4 Center Manifold Reduction for LocalBifurcations......Page 201
Part Two: Software......Page 233
5 Numerical Methods and Algorithms......Page 235
6 Features and Functionality of MatcontM......Page 259
7 MatcontM Tutorials......Page 274
Part Three: Applications......Page 335
8 The Generalized HΒ΄enon Map......Page 337
9 Adaptive Control Map......Page 370
10 Duopoly Model of Kopel......Page 378
11 The SEIR Epidemic Model......Page 401
References......Page 405
Index......Page 416
β¦ Subjects
Bifurcation theory;Cartography--Mathematical models;Cartography -- Mathematical models
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