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The Bulletin of Irkutsk State University. Series Mathematics, 2014, Volume 7, Pages 104–123 (Mi iigum49)  

This article is cited in 3 scientific papers (total in 3 papers)

Monotonicity of Lyapunov Type Functions for Impulsive Control Systems

O. Samsonyukab

a Irkutsk State University, 1, K. Marx st., Irkutsk, 664003
b Institute for System Dynamics and Control Theory of Siberian Branch of Russian Academy of Sciences, 134, Lermontov st., Irkutsk, 664033

Abstract: The paper is devoted to the study of impulsive dynamical systems with trajectories of bounded variation and impulsive controls (regular vector measures). A new concept of solutions for these systems is introduced. According to this concept, the solution is an upper semicontinuous set-valued mapping. The relationship between the new solution concept and conventional one is established. We prove that the set of solutions is a closure of the set of the absolutely continuous solutions. Here, the closure is understood in the sense of the convergence in Hausdorff metric for graphs of the supplemented absolutely continuous trajectories. In this paper, we focus mainly on the study of some monotonicity properties of a continuous function with respect to a nonlinear impulsive control system with trajectories of bounded variation. Definitions of strong and weak monotonicity and $V$-monotonicity are proposed and discussed. The set of conventional variables $t$ and $x$ of Lyapunov type functions is now supplemented with the variable $V,$ which, on the one hand, is responsible for the impulsive dynamics of the system and has the property of the time variable and, on the other hand, characterizes some resource of the impulsive control. We show that such double interpretation of variable $V$ leads to different definitions of monotonicity, which are called monotonicity and $V$-monotonicity. For smooth Lyapunov type functions, infinitesimal conditions of monotonicity in the form of Hamilton–Jacobi differential inequalities are presented.

Keywords: measure-driven impulsive control system, trajectories of bounded variation, monotonicity of Lyapunov type functions.

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UDC: 517.977.5

Citation: O. Samsonyuk, “Monotonicity of Lyapunov Type Functions for Impulsive Control Systems”, The Bulletin of Irkutsk State University. Series Mathematics, 7 (2014), 104–123

Citation in format AMSBIB
\Bibitem{Sam14}
\by O.~Samsonyuk
\paper Monotonicity of Lyapunov Type Functions for Impulsive Control Systems
\jour The Bulletin of Irkutsk State University. Series Mathematics
\yr 2014
\vol 7
\pages 104--123
\mathnet{http://mi.mathnet.ru/iigum49}


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    Citing articles on Google Scholar: Russian citations, English citations
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    This publication is cited in the following articles:
    1. O. N. Samsonyuk, “Prilozheniya funktsii tipa Lyapunova k zadacham optimizatsii v impulsnykh upravlyaemykh sistemakh”, Izvestiya Irkutskogo gosudarstvennogo universiteta. Seriya Matematika, 14 (2015), 64–81  mathnet
    2. D. V. Apanovich, V. A. Voronov, O. N. Samsonyuk, “Postroenie mnozhestva dostizhimosti dvumernoi impulsnoi upravlyaemoi sistemy s bilineinoi strukturoi”, Izvestiya Irkutskogo gosudarstvennogo universiteta. Seriya Matematika, 15 (2016), 3–16  mathnet
    3. V. A. Dykhta, O. N. Samsonyuk, “Pozitsionnyi printsip minimuma dlya impulsnykh protsessov”, Izvestiya Irkutskogo gosudarstvennogo universiteta. Seriya Matematika, 25 (2018), 46–62  mathnet  crossref
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