控制理论(社会学)
仿射变换
跟踪误差
自适应控制
超调(微波通信)
李雅普诺夫函数
非线性系统
控制器(灌溉)
鲁棒控制
数学
趋同(经济学)
转化(遗传学)
残余物
计算机科学
控制(管理)
算法
人工智能
农学
纯数学
化学
经济
物理
基因
生物
电信
量子力学
生物化学
经济增长
作者
Charalampos P. Bechlioulis,George A. Rovithakis
标识
DOI:10.1109/tac.2010.2042508
摘要
We consider the tracking problem of unknown, robustly stabilizable, multi-input multi-output (MIMO), affine in the control, nonlinear systems with guaranteed prescribed performance. By prescribed performance we mean that the tracking error converges to a predefined arbitrarily small residual set, with convergence rate no less than a prespecified value, exhibiting maximum overshoot as well as undershoot less than some sufficiently small preassigned constants. Utilizing an output error transformation, we obtain a transformed system whose robust stabilization is proven necessary and sufficient to achieve prescribed performance guarantees for the output tracking error of the original system, provided that initially the transformed system is well defined. Consequently, a switching robust control Lyapunov function (RCLF)-based adaptive, state feedback controller is designed, to solve the stated problem. The proposed controller is continuous and successfully overcomes the problem of computing the control law when the approximation model becomes uncontrollable. Simulations illustrate the approach.
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