分数阶微积分在滑模控制中的应用研究

针对滑模控制所存在的抖振问题以及趋近问题,将分数阶微积分理论与滑模控制策略的优点相互结合,提出一种有效的分数阶趋近律.在控制器的设计过程中,将分数阶微积分引入到滑模控制中提出分数阶趋近律,并运用Lyapunov理论进行证明,从而确保系统的稳定性.将提出的控制方法应用于二关节机械臂上,进行仿真验证.结果表明:所提出的分数...     

分数阶混沌系统的主动滑模同步

结合主动控制和滑模控制原理,提出了一个同步分数阶混沌系统的主动滑模控制方法.该方法首先用分数阶积分对所有维状态分量设计一个滑模面,分数阶混沌系统在该滑模面上稳定.然后采用极点配置的方法获得主动滑模控制器中的增益矩阵.应用Lyapunov稳定性理论、分数阶系统稳定理论对所提的控制器的存在性和稳定性分别进行了分析.对分数阶Lorenz系统进行数值仿真,仿真结果验证了该方法的有效性.     

基于自适应模糊滑模控制的分数阶混沌系统的投影同步

基于模糊控制理论和滑模控制理论以及自适应控制理论,研究了一类含有外部扰动的不确定分数阶混沌系统的混合投影同步问题.提出了一种自适应模糊滑模控制的分数阶混沌系统投影同步方法.模糊逻辑系统用来逼近未知的非线性函数和外部扰动,并且对逼近误差采用了自适应控制,同时构造了一种具有较强鲁棒性的分数阶积分滑模面.应用分数阶Barbalat引理设计了自适应模糊滑模控制器和参数自适应律.最后数值仿真结果验证了所提控制方法的有效性.     

一类不确定分数阶混沌系统同步的自适应滑模控制方法

针对一类系统不确定及受外界干扰的分数阶混沌系统,本文首先将分数阶微积分应用到滑模控制中,构造了一个具有分数阶积分项的滑模面.针对系统不确定及外界干扰项,基于分数阶Lyapunov稳定性理论与自适应控制方法,设计了一种滑模控制器以及分数阶次的参数自适应律,实现了两不确定分数阶混沌系统的同步控制,并辨识出相应误差系统中不确定项及外界干扰项的边界.在分数阶系统稳定性分析中使用的分数阶Lyapunov稳定性理论及相关函数都可以很好地运用到其它分数阶系统同步控制方法中.最后数值仿真验证了所提控制方法的可行性与有效性.     

不确定扰动分数阶混沌系统自适应Terminal滑模同步

针对带扰动不确定分数阶混沌系统的同步问题,基于自适应Terminal滑模控制,设计了一种分数阶非奇异Terminal滑模面,保证误差系统沿着滑模面在有限时间内稳定至平衡点,在系统外部扰动和不确定性的边界事先未知的情况,设计了自适应控制率,在线估计未知边界,使得同步误差轨迹能到达滑模面。最后,以三维分数阶Chen系统和四维分数阶Lorenz超混沌系统为例,利用所设计的自适应Terminal滑模控制器进行同步仿真,验证了所给方法是有效性和可行性。     

具有未知参数的不确定分数阶Sprott-C系统的Terminal滑模同步

基于滑模控制的优良性能,探讨了利用Terminal滑模控制实现分数阶混沌系统的有限时间同步问题,给出了滑模控制实现具有未知参数和扰动的分数阶Sprott-C驱动—响应系统(阶数0<α<1)的同步结论。通过构造合适的滑动模态曲面,针对系统未知参数上界已知和未知两种情况,设计了合适的分数阶控制器和参数自适应率,结合分数阶微分方程相关理论和有限时间稳定性定理,证明了实现该系统的同步控制结论,并对未知参数和扰动上界进行了准确估计。最后选取适当参数,通过数值仿真,验证了所给结论的有效性和可行性。     

一类分数阶非线性混沌系统的同步控制

在分数阶非线性系统同步控制的研究中,针对一类分数阶非线性混沌系统,研究了基于分数阶控制器的同步方法.利用状态反馈方法和分数阶微积分定义,设计了分数阶混沌系统同步控制器.进一步,根据分数阶非线性系统稳定性理论、Mittag-Leffler函数、Laplace变换以及Gronwall不等式,证明了同步控制器的有效性.最后,通过数值仿真,实现了初始值不同的两个分数阶非线性混沌系统同步.误差响应曲线表明研究的分数阶非线性系统同步响应速度快,控制精度高,验证了本文所设计的混沌同步控制方案的可行性.     

集成神经网络与自适应算法的分数阶滑模控制

针对被控对象的参数时变和外部扰动问题,本文融合神经网络的万能逼近能力和自适应控制技术,并结合分数阶微积分理论,提出了基于神经网络和自适应控制算法的分数阶滑模控制策略.本文采用等效控制的方法设计滑模控制律,并利用神经网络的万能逼近能力估测控制律的变化,结合自适应控制算法和分数阶微积分理论抑制传统滑模控制系统的抖震,同时根据Lyapunov稳定性理论分析了系统的稳定性,最后给出了实验结果.实验结果表明,本文提出的基于神经网络和自适应控制算法的分数阶滑模控制系统,能保持滑模控制器对系统外部扰动和参数变化鲁棒性的同时,也能有效地抑制抖震,使得系统获得较高的控制性能.     

分数阶与整数阶混沌系统的同步与反同步

为了建立起整数阶与分数阶系统的桥梁,推进分数阶系统的应用,本文采用了滑模控制理论研究了一类整数阶与分数阶混沌系统的同步与反同步.文中,设计了一个新的滑模控制器,该控制器适用于一类系统,具有较好的鲁棒性,并且给出了严格的数学证明.本文实现了整数阶Sprott系统和分数阶Chen系统的同步和整数阶吕系统和分数阶Liu系统的反同步.这两个例子有效的证明了所提理论的可行性和正确性.同时,也将同步与反同步的概念统一在一起.     

基于分数阶滑模观测器的永磁同步电机无传感器矢量控制

为解决基于传统滑模观测器的永磁同步电机转速和位置估计精度不高以及抖振过大等问题,设计了一种分数阶滑模观测器。首先根据分数阶理论提出一种分数阶滑模趋近律,并证明其稳定性;然后将永磁同步电机的定子实际电流与估计电流的差值作为滑模面,利用分数阶滑模趋近律设计滑模观测器的控制律,获取反电动势后采用锁相环提取转速和位置;最后建立了永磁同步电机无传感器矢量控制的仿真模型。仿真结果显示新型分数阶滑模观测器不仅静态性能好,而且与基于指数趋近律设计的滑模观测器相比,具有动态跟踪速度快、观测精度高、抖振小等优点。     

Fractional order predictive sliding-mode control for a class of nonlinear input-delay systems: singular and non-singular approach

Nonlinear models of physical systems usually suffer from input delay and external disturbances. Moreover, when a delayed state is in the input signal gain, it can be non-singular or singular. So, designing a robust controller in a nonlinear system with input and state delay, suitable for non-singular and singular input signal gain, is imperative. The main contribution of our study is to design a new state feedback fractional order predictive sliding mode control (FOPSMC) procedure which not only guarantees the stability of a nonlinear system with known constant input and state delay but also controls the output signal to the desired value. Firstly, a predictor is designed for the system to achieve an input-delay-free one. Then, a state feedback FOPSMC is proposed based on a fractional order sliding signal for a nonlinear system with non-singular control gain. Also, a state feedback FOPSMC and a fractional order sliding mode observer (FOSMO) for the virtual disturbance are designed for singular control gain situation. It is proved analytically, through the Lyapunov stability criteria, that both control procedures can stabilise the system and can control the output signal to the desired value, effectively. Finally, the simulation results verify the effectiveness of the analytical achievements.     

一类不确定分数阶混沌系统的同步控制

针对一类参数未知,状态不能全部测量的分数阶混沌系统的同步控制问题,结合状态观测器和自适应方法,提出了一种更符合工程实际的新的控制方案,利用分数阶微积分稳定性理论,给出了基于状态观测器的控制律和自适应律。该同步方法理论严格,没有强加在系统上的限制条件,适用范围比较宽,便于实现,并且保留了非线性项,达到同步的时间短。以分数阶R~ssler系统为研究对象,实现了参数未知,状态不能全部测量的分数阶混沌系统同步。理论分析与计算机仿真结果证实了该方法的有效性。     

分数阶混沌系统的延迟同步

基于分数阶线性系统的稳定性理论，结合反馈控制和主动控制方法，提出了实现分数阶混沌系统的延迟同步的一种新方法．该方案通过设计合适的控制器将分数阶混沌系统的延迟同步问题转化为分数阶线性误差系统在原点的渐近稳定性问题．分数阶Chen系统的数值模拟结果验证了该方案的有效性．     

Fractional‐Order Dynamic Output Feedback Sliding Mode Control Design for Robust Stabilization of Uncertain Fractional‐Order Nonlinear Systems

A robust fractional‐order dynamic output feedback sliding mode control (DOF‐SMC) technique is introduced in this paper for uncertain fractional‐order nonlinear systems. The control law consists of two parts: a linear part and a nonlinear part. The former is generated by the fractional‐order dynamics of the controller and the latter is related to the switching control component. The proposed DOF‐SMC ensures the asymptotical stability of the fractional‐order closed‐loop system whilst it is guaranteed that the system states hit the switching manifold in finite time. Finally, numerical simulation results are presented to illustrate the effectiveness of the proposed method.     

Hybrid control of synchronization of fractional order nonlinear systems

Under the existence of model uncertainties and external disturbance, finite‐time projective synchronization between two identical complex and two identical real fractional‐order (FO) chaotic systems are achieved by employing FO sliding mode control approach. In this paper, to ensure the occurrence of synchronization and asymptotic stability of the proposed methods, a sliding surface is designed and the Lyapunov direct method is used. By using integer and FO derivatives of a Lyapunov function, three different FO real and complex control laws are derived. A hybrid controller based on a switching law is designed. Its behavior is more efficient that if the individual controllers were designed based on the minimization of an appropriate cost function. Numerical simulations are implemented for verifying the effectiveness of the methods.     

A Sufficient Condition for Checking the Attractiveness of a Sliding Manifold in Fractional Order Sliding Mode Control

Stability issues of fractional order sliding mode control laws are analyzed in this paper. For differentiation orders less than unity, it is shown that a stable reaching law in the fractional order case corresponds to a stable reaching law in the integer order case. The contribution of the current study is to explain the stability of the closed loop by the use of the Caputo and Riemann‐Liouville definitions of fractional order differentiation. Copyright © 2011 John Wiley and Sons Asia Pte Ltd and Chinese Automatic Control Society     

Design of a chatter-free terminal sliding mode controller for nonlinear fractional-order dynamical systems

This paper investigates the problem of robust control of nonlinear fractional-order dynamical systems in the presence of uncertainties. First, a novel switching surface is proposed and its finite-time stability to the origin is proved. Subsequently, using the sliding mode theory, a robust fractional control law is proposed to ensure the existence of the sliding motion in finite time. We use a fractional Lyapunov stability theory to prove the stability of the system in a given finite time. In order to avoid the chattering, which is inherent in conventional sliding mode controllers, we transfer the sign function of the control input into the fractional derivative of the control signal. The proposed chattering-free sliding mode technique is then applied for stabilisation of a broad class of three-dimensional fractional-order chaotic systems via a single variable driving control input. Simulation results reveal that the proposed fractional sliding mode controller works well for chaos control of fractional-order hyperchaotic Chen, chaotic Lorenz and chaotic Arneodo systems with no-chatter control inputs.