• DocumentCode
    114614
  • Title

    Set theory conditions for stability of linear impulsive systems

  • Author

    Fiacchini, Mirko ; Morarescu, Irinel-Constantin

  • Author_Institution
    GIPSA-Lab., St. Martin d´Hères, France
  • fYear
    2014
  • fDate
    15-17 Dec. 2014
  • Firstpage
    1527
  • Lastpage
    1532
  • Abstract
    In this paper we give tractable necessary and sufficient condition for the global exponential stability of a linear impulsive system. The reset rule considered in the paper is quasi-periodic and the stability analysis is based on a standard tool in set theory that is Minkowski functional. Firstly, we reformulate the problem in term of discrete-time parametric uncertain system with the state matrix belonging to a compact but non-convex set. Secondly, we provide a tractable algorithm for testing the stability and computing the associated polyhedral Lyapunov function when the system is stable. The main result is an algorithm whose computational effort is analogous to that of classical algorithms for contractive polytopes computation for discrete-time parametric uncertain systems with the state matrix belonging to a polytopic set.
  • Keywords
    asymptotic stability; discrete time systems; linear systems; matrix algebra; set theory; uncertain systems; Minkowski functional; contractive polytopes computation; discrete time parametric uncertain system; global exponential stability analysis; linear impulsive systems; nonconvex set; polyhedral Lyapunov function; polytopic set; quasiperiodic reset rule; set theory conditions; state matrix; tractable algorithm; tractable necessary; Approximation methods; Lyapunov methods; Set theory; Stability criteria; Symmetric matrices; Uncertain systems; Reset systems; polyhedral Lyapunov functions; set theory; stability;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Decision and Control (CDC), 2014 IEEE 53rd Annual Conference on
  • Conference_Location
    Los Angeles, CA
  • Print_ISBN
    978-1-4799-7746-8
  • Type

    conf

  • DOI
    10.1109/CDC.2014.7039616
  • Filename
    7039616