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On Lyapunov Methods for Nonlinear Discrete-Time Switching Systems With Dwell-Time Ranges

Pierdomenico Pepe

2021IEEE Transactions on Automatic Control22 citationsDOI

Abstract

A novel Lyapunov methodology for the stability check of nonlinear discrete-time switching systems, equipped with switches digraphs and nonuniform dwell-time ranges, is here presented. The novelty of the methodology consists in the following coexisting features: i) the global uniform (with respect to compact sets of initial conditions and switching signals) asymptotic stability is addressed; ii) the information on allowed switches and (nonuniform) dwell-time ranges is fully exploited; iii) no assumption is introduced on either stability or instability of the subsystems; iv) no assumption is introduced on the regularity of the functions describing the dynamics; v) the number of involved Lyapunov functions is always equal to the number of different modes; vi) a set of Lyapunov inequalities is uniquely defined coping with all scenarios of allowed switches and dwell-time ranges; vii) the provided Lyapunov conditions are necessary and sufficient for the global uniform asymptotic stability. Linear matrix inequalities obtained by this methodology are shown for the linear case.

Topics & Concepts

Dwell timeLyapunov functionMathematicsControl theory (sociology)Exponential stabilityLyapunov exponentNonlinear systemDiscrete time and continuous timeStability (learning theory)Lyapunov redesignApplied mathematicsComputer sciencePhysicsArtificial intelligenceStatisticsControl (management)Clinical psychologyMachine learningQuantum mechanicsMedicineStability and Control of Uncertain SystemsStability and Controllability of Differential EquationsControl and Stability of Dynamical Systems