Stability and Stabilization of Discontinuous Systems and Nonsmooth Lyapunov Functions

Abstract

We study stability and stabilizability properties of systems with discontinuous right hand-side (with solutions intended in Filippov’s sense) by means of locally Lipschitz continuous and regular Lyapunov functions. The stability result is obtained in the more general context of differential inclusions. Concerning stabilizability, we focus on systems affine with respect to the input: we give some sufficient conditions for a system to be stabilized by means of a feedback law of the Jurdjevic-Quinn type.

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@inproceedings{Bacciotti1999StabilityAS, title={Stability and Stabilization of Discontinuous Systems and Nonsmooth Lyapunov Functions}, author={Andrea Bacciotti and Francesca Ceragioli}, year={1999} }