時滯和同步的複雜系統

《時滯和同步的複雜系統》是2011年1月1日高等教育出版社出版的圖書,作者是羅朝俊,孫建橋。

基本介紹

  • 書名:時滯和同步的複雜系統
  • 作者:羅朝俊,孫建橋 
  • 原版名稱:Complex Systems:Fractionality,Time-delay and Synchronization
  • ISBN:9787040297102
  • 頁數:370
  • 出版社:高等教育出版社
  • 出版時間:2011年1月1日
  • 裝幀:精裝
  • 開本:16
  • 叢書名:非線性物理科學
內容簡介,目錄,

內容簡介

《具有分數維、時滯和同步的複雜系統(英文版)》內容簡介:Complex Systems Fractionality, Time-delay and Synchronization covers the most recent developments: and advances in the theory and application of complex Systems in these areas, Each chapter was written by scientists highly active in the field ofcomplexsystemS. ebook discusses a new treatise on fractional dynamics and control, as well as the new meth0ds f0r differential delay systems and control,Lastly, a theoretical framework for the complexity and synchronization ofcomplex system is presented.
The book is intended for researchers in the field of nonlinear dynamics in mathematics, physics and engineering, If can also Serve as a reference book for graduate students in applied mathematics, physics and engineering.

目錄

1 New Treatise in Fractional Dynamics
Dumitru Baleanu
1.1 Introduction
1.2 Basic definitions and properties of fractional derivatives and integrals
1.3 Fractional variational principles and their applications
1.3.1 Fractional Euler-Lagrange equations for discrete systems..
1.3.2 Fractional Hamiltonian formulation
1.3.3 Lagrangian formulation of field systems with fractional derivatives
1.4 Fractional optimal control formulation
1.4.1 Example
1.5 Fractional calculus in nuclear magnetic resonance
1.6 Fractional wavelet method and its applications in drug analysis
References
2 Realization of Fractional-Order Controllers: Analysis, Synthesis and Application to the Velocity Control of a Servo System
Ramiro S. Barbosa, Isabel S. Jesus, Manuel F. Silva,
J.A. Tenreiro Machado
2.1 Introduction
2.2 Fractional-order control systems
2.2.1 Basic theory
2.2.2 Fractional-Order controllers and their implementation
2.3 Oustaloup's frequency approximation method
2.4 The experimental modular servo system
2.5 Mathematical modelling and identification of the servo system
2.6 Fractional-order real-time control system
2.7 Ziegler-Nichols tuning rules
2.7.1 Ziegler-Nichols tuning rules: quarter decay ratio
2.7.2 Ziegler-Nichols tuning rules: oscillatory behavior
2.7.3 Comments on the results
2.8 A simple analytical method for tuning fractional-order controllers
2.8.1 The proposed analytical tuning method
2.9 Application of optimal fractional-order controllers
2.9.1 Tuning of the PID and PIz D controllers
2.10 Conclusions
References
3 Differential-Delay Equations
Richard Rand
3.1 Introduction
3.2 Stability of equilibrium
3.3 Lindstedt's method
3.4 Hopf bifurcation formula
3.4.1 Example 1
3.4.2 Derivation
3.4.3 Example 2
3.4.4 Discussion
3.5 Transient behavior
3.5.1 Example
3.5.2 Exact solution
3.5.3 Two variable expansion method (also known as multiple scales)
3.5.4 Approach to limit cycle
3.6 Center manifold analysis
3.6.1 Appendix: The adjoint operator A*
3.7 Application to gene expression
3.7.1 Stability of equilibrium
3.7.2 Lindstedt's method
3.7.3 Numerical example
3.8 Exercises
References
4 Analysis and Control of Deterministic and Stochastic Dynamical Systems with Time Delay
Jian-Qiao Sun, Bo Song
4.1 Introduction
4.1.1 Deterministic systems
4.1.2 Stochastic systems
4.1.3 Methods of solution
4.1.4 Outline of the chapter
4.2 Abstract Cauchy problem for DDE
4.2.1 Convergence with Chebyshev nodes
4.3 Method of semi-discretization
4.3.1 General time-varying systems
4.3.2 Feedback controls
4.3.3 Analysis of the method of semi-discretization
4.3.4 High order control
4.3.5 Optimal estimation
4.3.6 Comparison of semi-discretization and higher order control
4.4 Method of continuous time approximation
4.4.1 Control problem formulations
4.5 Spectral properties of the CTA method
4.5.1 A low-pass filter based CTA method
4.5.2 Example of a first order linear system
4.6 Stability studies of time delay systems
4.6.1 Stability with Lyapunov-Krasovskii functional
4.6.2 Stability with Pad6 approximation
4.6.3 Stability with semi-discretization
4.6.4 Stability of a second order LTI system
4.7 Control of LTI systems
4.8 Control of the Mathieu system
4.9 An experimental validation
4.10 Supervisory control
4.10.1 Supervisory Control of the LTI System
4.10.2 Supervisory control of the periodic system
4.11 Method of semi-discretization for stochastic systems
4.11.1 Mathematical background
4.11.2 Stability analysis
4.12 Method of finite-dimensional markov process (FDMP)
4.12.1 Fokker-Planck-kolmogorov (FPK) equation
4.12.2 Moment equations
4.12.3 Reliability
4.12.4 First-passage time probability
4.12.5 Pontryagin-Vitt equations
4.13 Analysis of stochastic systems with time delay
4.13.1 Stability of second order stochastic systems
4.13.2 One Dimensional Nonlinear System
References
5 Synchronization of Dynamical Systems in Sense of Metric Functionals of Specific Constraints
Albert C.J. Luo
5.1 Introduction
5.2 System synchronization
5.2.1 Synchronization of slave and master systems
5.2.2 Generalized synchronization
5.2.3 Resultant dynamical systems
5.2.4 Metric functionals
5.3 Single-constraint synchronization
5.3.1 Synchronicity
5.3.2 Singularity to constraint
5.3.3 Synchronicity with singularity
5.3.4 Higher-order singularity
5.3.5 Synchronization to constraint
5.3.6 Desynchronization to constraint
5.3.7 Penetration to constraint
5.4 Multiple-constraint synchronization
5.4.1 Synchronicity to multiple-constraints
5.4.2 Singularity to constraints
5.4.3 Synchronicity with singularity to multiple constraints
5.4.4 Higher-order singularity to constraints
5.4.5 Synchronization to all constraints
5.4.6 Desynchronization to all constraints
5.4.7 Penetration to all constraints
5.4.8 Synchronization-desynchronization-penetration
5.5 Conclusions
References
6 The Complexity in Activity of Biological Neurons Yong Xie, Jian-Xue Xu
6.1 Complicated firing patterns in biological neurons
6.1.1 Time series of membrane potential
6.1.2 Firing patterns: spiking and bursting
6.2 Mathematical models
6.2.1 HH model
6.2.2 FitzHugh-Nagumo model
6.2.3 Hindmarsh-Rose model
6.3 Nonlinear mechanisms of firing patterns
6.3.1 Dynamical mechanisms underlying Type I excitability and Type II excitability
6.3.2 Dynamical mechanism for the onset of firing in the HH model
6.3.3 Type I excitability and Type II excitability displayed in the Morris-Lecar model
6.3.4 Change in types of neuronal excitability via bifurcation control
6.3.5 Bursting and its topological classification
6.3.6 Bifurcation, chaos and Crisis
6.4 Sensitive responsiveness of aperiodic firing neurons to external stimuli
6.4.1 Experimental phenomena
6.4.2 Nonlinear mechanisms
6.5 Synchronization between neurons
6.5.1 Significance of synchronization in the nervous system
6.5.2 Coupling: electrical coupling and chemical coupling
6.6 Role of noise in the nervous system
6.6.1 Constructive role: stochastic resonance and coherence resonance
6.6.2 Stochastic resonance: When does it not occur in neuronal models?
6.6.3 Global dynamics and stochastic resonance of the forced FitzHugh-Nagumo neuron model
6.6.4 A novel dynamical mechanism of neural excitability for integer multiple spiking
6.6.5 A Further Insight into Stochastic Resonance in an Integrate-and-fire Neuron with Noisy Periodic Input
6.6.6 Signal-to-noise ratio gain of a noisy neuron that transmits subthreshold periodic spike trains
6.6.7 Mechanism of bifurcation-dependent coherence resonance of Morris-Lecar Model
6.7 Analysis of time series of interspike intervals
6.7.1 Return map
6.7.2 Phase space reconstruction
6.7.3 Extraction of unstable periodic orbits
6.7.4 Nonlinear prediction and surrogate data methods
6.7.5 Nonlinear characteristic numbers
6.8 Application
6.9 Conclusions
References

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