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一类混杂动态系统的能控性(Ⅲ)——含多时滞的情形

谢广明 王龙 叶庆凯

谢广明, 王龙, 叶庆凯. 一类混杂动态系统的能控性(Ⅲ)——含多时滞的情形[J]. 应用数学和力学, 2003, 24(9): 940-950.
引用本文: 谢广明, 王龙, 叶庆凯. 一类混杂动态系统的能控性(Ⅲ)——含多时滞的情形[J]. 应用数学和力学, 2003, 24(9): 940-950.
XIE Guang-ming, WANG Long, YE Qing-kai. Controllability of a Class of Hybrid Dynamic Systems(Ⅲ)—Multiple Time-Delay Case[J]. Applied Mathematics and Mechanics, 2003, 24(9): 940-950.
Citation: XIE Guang-ming, WANG Long, YE Qing-kai. Controllability of a Class of Hybrid Dynamic Systems(Ⅲ)—Multiple Time-Delay Case[J]. Applied Mathematics and Mechanics, 2003, 24(9): 940-950.

一类混杂动态系统的能控性(Ⅲ)——含多时滞的情形

基金项目: 国家杰出青年科学基金资助项目(69925307,60274001);国家重点基础研究与发展计划基金资助项目(2002CB312200);中国博士后基金资助项目
详细信息
    作者简介:

    谢广明(1972- ),男,北京人,博士(后),研究方向为混杂切换系统、广义系统、时滞系统和网络控制系统(E-mail:xiegming@mech.pku.edu.cn).

  • 中图分类号: TP13;TP273;O317

Controllability of a Class of Hybrid Dynamic Systems(Ⅲ)—Multiple Time-Delay Case

  • 摘要: 首次将时滞现象引入到线性切换系统的模型中,研究含有时滞线性切换系统的能控性及其判定条件。全部工作由三部分组成。第Ⅲ部分,主要研究含多时滞的线性切换系统的能控性及其判定规则。首先给出周期型系统的单周能控性和多周期能控性的定义和充要条件,其次给出非周期系统的能控性的定义和充要条件。最后,研究时滞大小不一致的情形,指出能控性与时滞大小无关。
  • [1] Liberzon A S,Morse A S.Basic problms in stability and design of switched systems[J].IEEE Contr Syst Mag,1999,19(5):59-70.
    [2] Ezzine J.Haddad A H.Controllability and observability of hybrid system[J].Int J Control,1989,49(6):2045-2055.
    [3] SUN Zhen-dong,ZHENG Da-zhong.On reachability and stabilization of switched linear systems[J].IEEE Trans Automat Contr,2001,46(2):291-295.
    [4] 谢广明,郑大钟.On the controllability and reachability of a class of hybrid dynamical systems[A].见:秦化淑编.19届中国控制会议[C].香港:香港工程师协会,2000,114-117.
    [5] XIE Guang-ming,WANG Long.Necessary and sufficient conditions or controllability of switched linear systems[A].In:American Automatic Control Counci Ed.Proceedings of the American Control Conference 2002[C].USA:IEEE Service Center,2002,1897-1902.
    [6] XU Xu-ping,Antsaklis P J.On the reachability of a class of second-order switched systems[A].In:American Automatic Control Counci Ed.Proceedings of the American Control Conference 1999[C].USA:IEEE Service Center,1999,2955-2959.
    [7] Ishii H,Francis B A.Stabilization with control networks[J].Automatica,2002,38(10):1745-1751.
    [8] Ishii H,Francis B A.Stabilizing a linear system by switching control with dwell time[A].In:American Automatic Control Counci Ed.Proceedings of the American Control Conference 2001[C].USA:IEEE Service Center,2001,1876-1881.
    [9] Morse A S.Supervisory control of families of linear set-point controllers-Part1:Exact matching[J].IEEE Trans Automat Contr,1996,41(7):1413-1431.
    [10] Liberzon D,Hespanha J P,Morse A S.stability of switched systems:a Lie-algebraic condition[J].Systems and Control Letters,1999,37(3):117-122.
    [11] Hespanha J P,Morse A S.Stability of switched systems with average dwell-time[A].In:IEEE Control Systems Society Ed.Proceedings of the 38th Conference on Decesion and Control[C].USA:IEEE Customer Service,1999,2655-2660.
    [12] Narendra K S,Balakrishnan J.A common Lyapunov function for stable LTI systems with commuting A-matrices[J].IEEE Trans Automat Contr,1994,39(12):2469-2471.
    [13] Narendra K S,Balakrishnan J.Adaptive control using multiple models[J].IEEE Trans Automat Contr,1997,42(1):171-187.
    [14] Petterson S,Lennartson B.Stability and robustness for hybrid systems[A].In:IEEE Control Systems Society Ed.Proceedings of the 35th Conference on Decesion and Control[C].USA:IEEE Customer Service,1996,1202-1207.
    [15] YE Hong,Michel A N,HOU Ling.Stability theory for hybrid dynamical systems[J].IEEE Trans Automat Contr,1998,43(4):461-474.
    [16] HU Bo,XU Xu-ping,Antsaklis P J,et al.Robust stabilizing control laws for a class of second-order switched systems[J].Systems and Control Letters,1999,38(2):197-207.
    [17] Branicky M S.Multiple Lyapunov functions and other analysis tools for switched and hybrid systems[J].IEEE Trans Automat Contr,1998,43(4):475-482.
    [18] Shorten R N,Narendra K S.On the stability and existence of common Lyapunov functions for stable linear switching systems[A].In:IEEE Control Systems Society Ed.Proceedings of the 37th Conference on Decesion and Control[C].USA:IEEE Customer Service,1998,3723-3724.
    [19] Johansson M,Rantzer A.Computation of piecewise quadratic Lyapunov funtions for hybrid systems[J].IEEE Trans Automat Contr,1998,43(4):555-559.
    [20] Wicks M A,Peleties P,DeCarlo R A.Construction of piecewise Lyapunov funtions for stabilizing switched systems[A].In:IEEE Control Systems Society Ed.Proceedings of the 33th Conference on Decesion and Control[C].USA:IEEE Customer Service,1994,3492-3497.
    [21] Peleties P,DeCarlo R A.Asymptotic stability of m-switched systems using Lyapunov-like functions[A].In:American Automatic Control Counci Ed.Proceedings of American Control Conference 1991[C].USA:IEEE Service Centet,1991,1679-1684.
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出版历程
  • 收稿日期:  2002-01-29
  • 修回日期:  2003-05-28
  • 刊出日期:  2003-09-15

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