高维非线性系统的隐藏吸引子
全新正版 极速发货
¥ 57.24 6.4折 ¥ 89 全新
库存4件
广东广州
认证卖家担保交易快速发货售后保障
作者魏周超,张伟,姚明辉 编著
出版社科学出版社
ISBN9787030547224
出版时间2018-01
装帧平装
开本16开
定价89元
货号1201629791
上书时间2024-06-09
商品详情
- 品相描述:全新
- 商品描述
-
目录
Preface
Chapter 1 Basic geometrical point of view of dynamical systems 1
1.1 Self-excited and hidden attractors 1
1.2 Hidden oscillations in Hilberts 16th problem and applied models 3
1.3 The main contents of this book 6
Reference 9
Chapter 2 Hidden attractors without equilibria 12
2.1 Hidden chaos without equilibria in three-dimensional autonomous system 12
2.1.1 The proposed system 13
2.1.2 Forming mechanism of the new chaotic attractors 17
2.1.3 Conclusion 22
2.2 Hidden hyperchaos without equilibria in four-dimensional autonomous system 23
2.2.1 The hyperchaotic system from generalized di.usionless Lorenz equations 25
2.2.2 Dynamical structure of the proposed hyperchaotic system 29
2.3 Conclusion 35
Reference 35
Chapter 3 Hidden hyperchaotic attractors in a modi-ed Lorenz-Stenflo system 39
3.1 Introduction 39
3.2 The hyperchaotic system from Lorenz-Stenflo system 40
3.2.1 Formulation of the system 40
3.2.2 Hidden hyperchaotic attractors with only one stable equilibrium 42
3.2.3 Non-equivalence with existing hyperchaotic systems 45
3.3 Some basic properties and bifurcation analysis 45
3.3.1 Symmetry and invariance and dissipativity 45
3.3.2 Equilibria and stability 46
3.3.3 Bifurcation analysis 48
3.4 The ultimate bound and positively invariant set 52
3.4.1 Four dimensional hyperelliptic estimate of the ultimate bound and positively invariant set 52
3.4.2 Two dimensional cylindrical estimate of the ultimate bound and positively invariant set 55
3.5 Conclusion 57
Reference 60
Chapter 4 Hidden attractors, multiple limit cycles and boundedness in the generalized 4D Rabinovich system 63
4.1 Introduction 63
4.2 The proposed system and hidden hyperchaos 65
4.2.1 Formulation of the system 65
4.2.2 Hidden hyperchaotic attractors with a unique stable equilibrium 66
4.2.3 Initial conditions and coexisting attractors 69
4.3 Generation of hidden attractors 70
4.4 Local bifurcation in the generalized hyperchaotic Rabinovich system 71
4.4.1 Equilibrium and stability 71
4.4.2 Hopf bifurcation 72
4.5 Boundedness of motion for the hyperchaotic system 76
4.6 Conclusion 79
Reference 80
Chapter 5 On the periodic orbit bifurcating from one single non-hyperbolic equibrium 84
5.1 Introduction 84
5.2 The proposed system and chaotic attractors 85
5.3 The averaging theory for periodic orbits 88
5.4 Statements of the main results 89
5.5 Conclusion 95
Reference 95
Chapter 6 Hidden attractors and dynamical behaviors in an extended Rikitake system 99
6.1 Introduction 99
6.2 Existence of equilibria 100
6.3 Hidden attractors that arise from stable equilibria 102
6.3.1 Coexistence of stable equilibria and hidden attractor 103
6.3.2 Finding hidden attractors by a simple linear transformation 104
6.4 Hopf bifurcation analysis 106
6.5 Dynamics analysis at in-nity 110
6.6 Conclusion 114
Reference 115
Chapter 7 Hidden chaotic regions and complex dynamics in 3D homopolar disc dynamo 118
7.1 Introduction 118
7.2 Description of the self-exciting homopolar disc dynamo and related problems 120
7.3 Study of hidden attractors from a simple linear transformation 125
7.4 Study of hidden attractors from Hopf bifurcation 127
7.4.1 An outline of the Hopf bifurcation methods 127
7.4.2 Hopf bifurcation analysis 129
7.4.3 Hidden attractors and numerical simulations 131
7.4.4 Unstable periodic orbits 131
7.5 Existence of homoclinic orbits 134
7.6 In-nity dynamics by Poincar.e compacti-cation 137
7.7 Conclusion 143
Reference 144
Chapter 8 Hidden hyperchaos and circuit application in 5D homopolar disc dynamo 147
8.1 Introduction 147
8.2 5D hyperchaotic self-exciting homopolar disc dynamo 148
8.3 Hidden attractors and multistability 152
8.3.1 Hidden attractors with two stable equilibria 153
8.3.2 Coexistence of point, periodic, quasi-periodic and hidden chaotic attractors 156
8.4 Electronic circuit implementation of the 5D hyperchaotic system 161
8.5 Conclusion 163
Reference 164
Chapter 9 Bifurcation and circuit realization for delayed system with hidden attractors 168
9.1 Introduction 168
9.2 Hopf bifurcation analysis with multiple delays 170
9.2.1 Stability of equilibrium 171
9.2.2 Existence of Hopf bifurcation with 72
9.2.3 Existence of Hopf bifurcation with 75
9.3 Direction, stability and numerical results of Hopf bifurcation with 77
9.3.1 Direction of Hopf bifurcations and stability of the bifurcating periodic orbits 177
9.3.2 Numerical simulations 186
9.4 Circuit implementation of the multiple time-delay system 190
9.5 Conclusion 192
Reference 193
Index 196
内容摘要
非线性动力系统是靠前上的前沿课题,目前的研究主要是以理论分析和数值模拟为主,但对于产生复杂现象的非线性本质以及它们的物理意义还缺乏实验方面和工程上的合理解释。近年来发现存在“隐藏混沌吸引子”与“隐藏超混沌吸引子”,使得高维非线性系统中的全局分析和混沌产生机理研究更加成为了一件十分具有诱惑力而有富有挑战性的事情。本书将用理论分析和数值模拟相结合的方法研究复杂混沌系统的隐藏吸引子的存在性及动力学特性,而且能够提高改进非线性系统的动力学的分析方法和实验手段;对高维非线性数学模型的全局分岔和隐藏混沌与超混沌吸引子进行研究与分析,从而更加清晰地揭示混沌及超混沌产生的机理和吸引子的结构,进一步拓展混沌吸引子在实际工程中的应用价值,具有重要的应用前景。
— 没有更多了 —
以下为对购买帮助不大的评价