International audienceWe propose a class of locally Lipschitz functions with piecewise structure for use as Lyapunov functions for hybrid dynamical systems. Subject to some regularity of the dynamics, we show that Lyapunov inequalities can be checked only on a dense set and thus we avoid checking them at points of nondifferentiability of the Lyapunov function. Connections to other classes of locally Lipschitz or piecewise regular functions are also discussed and applications to hybrid dynamical systems are included
We provide explicit closed form expressions for strict Lyapunov functions for time-varying discrete ...
In this paper we will extend the input-to-state stability (ISS) framework to continuous-time discont...
For a class of homogeneous hybrid systems we present a generalization to the hybrid systems framewor...
International audienceWe introduce a class of locally Lipschitz continuous functions to establish st...
National audienceModeling of many phenomena in nature escape the rather common frameworks of continu...
Lyapunov functions are an important tool to determine the basin of attraction of exponentially stabl...
This paper provides a first example of constructing Lyapunov functions in a class of piecewise linea...
International audienceWe provide explicit closed form expressions for strict Lyapunov functions for ...
We explicitly construct strict input-to-state stable Lyapunov functions for time varying hybrid syst...
International audienceWe explicitly construct strict input-to-state stable Lyapunov functions for ti...
Pointwise asymptotic stability is a property of a set of equilibria of a dynamical system, where eve...
International audienceThe construction of strict Lyapunov functions is a challenging problem that is...
This paper is concerned with piecewise-linear functions as Lyapunov function candidates for stabilit...
For a class of homogeneous hybrid systems we present a set of annular Lyapunov-like conditions for i...
International audienceA smooth patchy control Lyapunov function for a nonlinear system consists of a...
We provide explicit closed form expressions for strict Lyapunov functions for time-varying discrete ...
In this paper we will extend the input-to-state stability (ISS) framework to continuous-time discont...
For a class of homogeneous hybrid systems we present a generalization to the hybrid systems framewor...
International audienceWe introduce a class of locally Lipschitz continuous functions to establish st...
National audienceModeling of many phenomena in nature escape the rather common frameworks of continu...
Lyapunov functions are an important tool to determine the basin of attraction of exponentially stabl...
This paper provides a first example of constructing Lyapunov functions in a class of piecewise linea...
International audienceWe provide explicit closed form expressions for strict Lyapunov functions for ...
We explicitly construct strict input-to-state stable Lyapunov functions for time varying hybrid syst...
International audienceWe explicitly construct strict input-to-state stable Lyapunov functions for ti...
Pointwise asymptotic stability is a property of a set of equilibria of a dynamical system, where eve...
International audienceThe construction of strict Lyapunov functions is a challenging problem that is...
This paper is concerned with piecewise-linear functions as Lyapunov function candidates for stabilit...
For a class of homogeneous hybrid systems we present a set of annular Lyapunov-like conditions for i...
International audienceA smooth patchy control Lyapunov function for a nonlinear system consists of a...
We provide explicit closed form expressions for strict Lyapunov functions for time-varying discrete ...
In this paper we will extend the input-to-state stability (ISS) framework to continuous-time discont...
For a class of homogeneous hybrid systems we present a generalization to the hybrid systems framewor...