非周期图
控制理论(社会学)
数学
有界函数
李雅普诺夫函数
不变(物理)
非线性系统
指数稳定性
理论(学习稳定性)
跳跃
采样(信号处理)
应用数学
计算机科学
控制(管理)
数学分析
滤波器(信号处理)
量子力学
组合数学
机器学习
物理
人工智能
数学物理
计算机视觉
作者
Daniel Denardi Huff,Mirko Fiacchini,J.M. Gomes da Silva
标识
DOI:10.1109/tac.2021.3064988
摘要
This article proposes a new method to deal with the stability analysis and stabilization of aperiodic sampled-data control systems subject to input saturation. An impulsive system representation is employed, with a linear flow and a nonlinear jump dynamics, such that the evolution of the system at the sampling instants can be modeled by a difference inclusion defined by two set-valued maps. We show that to ensure the asymptotic stability it is sufficient to verify that a Lyapunov function decreases by a certain amount only at a grid of possible values for the sampling interval, as long as the increase of the function in continuous-time is conveniently bounded. Simulation results compare our approach with other ones.
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