超混沌Lorenz系统的脉冲控制与修正投影同步

考虑超混沌Lorenz系统的脉冲控制与修正投影同步,基于脉冲控制系统的稳定性理论,给出了脉冲控制与修正投影同步的充分条件,并通过数值仿真验证了所给充分条件的有效性.由定理4易知当同步因子α_1,α_2,α_3,α_4满足α_1~2=1,α_2=α_1α_3=α_4时所给同步方法无需控制器,因此方法可以看做是脉冲完全同步的推广.     

Lorenz系统混沌轨道的概率分布特性

利用概率统计方法分析了Lorenz系统混沌轨道的概率分布特性.为研究混沌轨道在系统平衡点处概率分布特性,通过在平衡点处建立超平面,把系统混沌轨道转换为超平面上一系列不动点,然后求得轨道分量的条件概率分布.研究表明混沌轨道在相空间中并不是杂乱无章分布的,在超平面上这些轨道序列主要分布在平衡点两侧,这些轨道点可作为一些混沌控制算法的初始点,有助于提高其收敛效率。     

用负的状态反馈量控制和同步Lorenz系统

本文研究了Lorenz系统的控制与同步问题.利用负状态反馈的方法和Lyapunov稳定性理论,得到了能保证系统渐近稳定和同步的有关反馈增益的一些充分条件.最后,数值实验证实了理论分析的结果.     

用参数调整控制超混沌

对于一类两参数平面映射族,给出了一种稳定嵌入在超混沌中不只有稳定流形的不稳定不动点的方法。这种方法是通过在每一步迭代中调节两个参数来实现。不仅得到了参数调节的显示,并且给出了方法收效性的数学证明。     

一个四维超混沌Lorenz系统的Hopf分岔分析

运用非线性动力学理论,对一类四维混沌Lorenz系统在平衡点的稳定性问题和Hopf分岔的存在性进行了研究.利用第一Lyapunov系数法给出系统Hopf分岔周期解的稳定性条件.最后,通过数值仿真验证了理论推导的正确性.     

粘弹性板混沌振动的输出变量反馈线性化控制

研究了粘弹性板混沌振动的控制问题·　应用非线性系统精确线性化控制理论导出了一类非仿射控制系统的非线性反馈控制律·　建立了描述材料非线性的粘弹性板运动的数学模型并利用Ｃａｌｅｒｋｉｎ 方法进行简化·　采用相空间曲线和频率谱密度函数说明了在特定参数条件下系统将出现混沌振动,并以位移为输出变量将混沌振动控制为给定的周期运动·     

三个耦合的非扩散Lorenz系统的全局混沌同步

以Lyapunov稳定性理论和矩阵论为基础,针对非扩散Lorenz系统,提出了一种三个耦合的恒等系统的全局混沌同步方案.该方案的关键是耦合参数的选取.通过选择适当的耦合参数,使得三个系统的状态变量达到同步,并利用Mathematic软件进行数值仿真.理论分析和仿真结果都表明了该方法的有效性.     

一类Lorenz型高维混沌系统的分析

利用微分方程与动力系统的基本理论与方法,首先从解析上推导出一类高维混沌模型的全局吸引域和最终界,然后对这个理论结果进行仿真.理论分析及数值仿真结果表明:高维混沌模型理论研究的结果是正确的.同时,的研究结果为该混沌系统李雅普诺夫吸引子维数的估计提供了理论依据.     

卫星系统中的混沌控制

对于非线性扰动系统对指令信号的跟踪问题,提出解析条件和实现方法.对在反馈中包含线性动力和非线性两部份的非线性扰动设备进行了研究,设备的非线性部份和扰动是未知的但是有界的.提出控制卫星天平动角的算法,用图示对该算法作了说明.     

利用部分线性化方法控制Lü-系统

提出利用部分线性化的方法来控制混沌Lü-系统．通过部分消除系统各状态间的耦合项的办法,进而实现了被控系统的稳定化,该方法简单且易于实现,同时也证明了对于此不确定系统的鲁棒性．最后还对所取得的结果给出了数值模拟,进一步说明了该方法的可行性与有效性．     

Chaos control of new Ikeda–Lorenz systems by GYC partial region stability theory

A new strategy to achieve chaos control by GYC partial region stability theory is proposed. By using the GYC partial region stability theory, the Lyapunov function is a simple linear homogeneous function of error states, the controllers are more simple and have less simulation error because they are in lower degree than that of traditional controllers. Simulation results for a new Ikeda–Lorenz system show the effectiveness of this strategy. Copyright © 2008 John Wiley & Sons, Ltd.     

Bifurcations and synchronization of the fractional-order simplified Lorenz hyperchaotic systems

In this paper, dynamics of the fractional-order simplied Lorenz hyperchaotic system is investigated. Modied Adams-Bashforth-Moulton method is applied for numerical simulation. Chaotic regions and periodic windows are identied. Dierent types of motions are shown along the routes to chaos by means of phase portraits, bifurcation diagrams, and the largest Lyapunov exponent. The lowest fractional order to generate chaos is 3.8584. Synchronization between two fractional-order simplied Lorenz hyperchaotic systems is achieved by using active control method. The synchronization performances are studied by changing the fractional order, eigenvalues and eigenvalue standard deviation of the error system.     

Numerical stabilization of the Lorenz system by a small external perturbation

The Lorenz system perturbed by noise and its invariant measure whose density obeys the stationary Fokker-Planck equation are analyzed numerically. A linear functional of the invariant measure is considered, and its variation caused by a variation in the right-hand side of the Lorenz system is calculated. A small (in modulus) external perturbation is calculated under which the strange attractor of the Lorenz system degenerates into a stable fixed point.     

Dynamics and bifurcation study on an extended Lorenz system

In this paper, we study dynamics and bifurcation of limit cycles in a recently developed new chaotic system, called extended Lorenz system. A complete analysis is provided for the existence of limit cycles bifurcating from Hopf critical points. The system has three equilibrium solutions: a zero one at the origin and two non-zero ones at two symmetric points. It is shown that the system can either have one limit cycle around the origin, or three limit cycles enclosing each of the two symmetric equilibria, giving a total six limit cycles. It is not possible for the system to have limit cycles simultaneously bifurcating from all the three equilibria. Simulations are given to verify the analytical predictions.     

Dynamical analysis of the hyperchaos Lorenz system

This article deals with the ultimate bound on the trajectories of the hyperchaos Lorenz system based on Lyapunov stability theory. The innovation of this article lies in that the method of constructing Lyapunov functions applied to the former chaotic systems is not applicable to this hyperchaos system, and moreover, one Lyapunov function can not estimate the bounds of this hyperchaos Lorenz system. We successfully estimate the bounds of this hyperchaos system by constructing three generalized Lyapunov functions step by step. Some computer simulations are also given to show the effectiveness of the proposed scheme. © 2016 Wiley Periodicals, Inc. Complexity 21: 440–445, 2016     

仿射非线性控制系统基于精确线性化下的多重子空间迭代解法

研究仿射非线性控制系统的最优控制问题．基于微分几何理论,在反馈精确线性化后,利用计算结构力学与最优控制之间模拟关系,沿用多重子结构法来解决线性化后的最优控制问题,最终实现对原非线性系统的求解．相比于经典的Taylor展开线性化方法,减小了误差会随使用区域的扩大而扩大的弊端．     

New estimate the bounds for the generalized Lorenz system

The bound of a chaotic system is important for chaos control, chaos synchronization, and other applications. In the present paper, the bounds of the generalized Lorenz system are studied, based on the Lyapunov function theory and the Lagrange multiplier method. We obtain a precise bound for the generalized Lorenz system. The rate of the trajectories is also obtained. Furthermore, we perform the numerical simulations. Numerical simulations are presented to show the effectiveness of the proposed scheme. Copyright © 2014 John Wiley & Sons, Ltd.     

关于区间上的Lorenz映射

本文引进了变换ζ．首先，用比文［４］简捷的方法证明了Ｌｏｒｅｎｚ映射的Ｓａｒｋｏｖｓｋｉ定理并更正了文［４］中的一个错误，还得到了扩张的Ｌｏｒｅｎｚ映射中周期点的存在性与其扩张常数之间的关系．其次，证明了Ｌｏｒｅｎｚ映射与其在变换ζ的像具有相等的捏制行列式．此外，给出了广义的Ｌｏｒｅｎｚ映射的周期点的存在性适合Ｓａｒｋｏｖｓｋｉ序关系的一个充分条件     

Logistic混沌系统分形特性研究

对Logistic序列进行研究,利用Matlab数值模拟,通过计算不同初值、不同参数对应的混沌序列的计盒维数,得出结论:只要在数据充分的情况下,Logistic系统的分形维数基本由参数λ决定,与系统初值无关;同时计盒维数并非像熵一样随Logistic系统的参数λ增大而增大.