XIE Guang-ming, WANG Long, YE Qing-kai. Controllability of a Class of Hybrid Dynamic Systems(Ⅰ)—Basic Properties and Preliminary Results[J]. Applied Mathematics and Mechanics, 2003, 24(9): 919-928.
Citation: XIE Guang-ming, WANG Long, YE Qing-kai. Controllability of a Class of Hybrid Dynamic Systems(Ⅰ)—Basic Properties and Preliminary Results[J]. Applied Mathematics and Mechanics, 2003, 24(9): 919-928.

Controllability of a Class of Hybrid Dynamic Systems(Ⅰ)—Basic Properties and Preliminary Results

  • Received Date: 2002-01-29
  • Rev Recd Date: 2003-03-25
  • Publish Date: 2003-09-15
  • The controllability for switched linear system with time-delay in controls was first investigated. The whole work contains three parts. This is the first part, including problem formulation and some preliminaries. First, the mathematical model of switched linear systems with time-delay in control functions was presented. Secondly, the concept of column space, cyclic invariant subspace and generalized cyclic invariant subspace were introduced. And some basic properties, such as separation lemma, were presented. Finally, a basic lemma was given to reveal the relation between the solution set of a centain integral equations and the generalized cyclic invariant subspace. This lemma will play an important role in the determination of controllability. All these definitoins and lemmas are necessary research tools for controllability analysis.
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  • [1]
    Liberzon A B,Morse A S.Basic problems 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 systems[J].Int J Control,1989,49(6):2045-2055.
    [3]
    SUN Zheng-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.一类混杂系统的能控性与能达性[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 for controllability of switched linear systems[A].In:American Automatic Control Counci Ed.Proceedings of the Americal 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 Contr Lett,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 the American Control Conference 1991[C].USA:IEEE Service Center,1991,1679-1684.
    [22]
    Chyung D H.Oh the controllability of linear systems with delay in control[J].IEEE Trans Autom Contr,1970,15(2):694-695.
    [23]
    Chyung D H.Controllability of linear systems with multiple delays in control[J].IEEE Trans Automat Contr,1970,15(6):694-695.
    [24]
    黄琳.系统与控制中的线性代数[M].北京:科学出版社,1984.
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