\u3cp\u3eThis paper develops a new sampling-based method for stability verification of piecewise continuous nonlinear systems via Lyapunov functions. Depending on the nonlinear system dynamics, the candidate Lyapunov function and the set of states of interest, verifying stability requires solving complex, possibly non-convex or infeasible optimization problems. To avoid such problems, the proposed approach firstly distributes the verification of Lyapunov's inequality on a finite sampling of a bounded set of states of interest. Secondly, it extends the validity of Lyapunov's inequality to an infinite, bounded set of states by automatically exploiting local continuity properties. A sampling-based method for estimating the domain of attraction...
Abstract. In this chapter, we consider the problem of global stability of nonlinear sampled-data sys...
This paper is concerned with the stability of sampled-data systems with state quantization. A new pi...
Most stabilizing controllers designed for nonlinear systems are valid only within a specific region ...
This paper develops a new sampling-based method for stability verification of piecewise continuous n...
This paper considers a sampling-based approach to stability verification for piecewise continuous no...
This paper considers the problem of stability verification for discrete–time nonlinear systems via L...
The problem of constructing a Lyapunov function for continuous-time nonlinear dynamical systems is t...
This paper considers the problem of safety verification for discrete-time, possibly discontinuous dy...
We present a numerical technique for the computation of a Lyapunov function for nonlinear systems wi...
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...
Parallel sessionInternational audienceWe present a novel numerical technique for the computation of ...
Analyzing the stability of nonlinear systems, with or without external inputs, is still a very chall...
International audienceIn this chapter, we consider the problem of global stability of nonlinear samp...
The paper proposes a numerical algorithm for constructing Lyapunov spline functions for investigatin...
Abstract. In this chapter, we consider the problem of global stability of nonlinear sampled-data sys...
This paper is concerned with the stability of sampled-data systems with state quantization. A new pi...
Most stabilizing controllers designed for nonlinear systems are valid only within a specific region ...
This paper develops a new sampling-based method for stability verification of piecewise continuous n...
This paper considers a sampling-based approach to stability verification for piecewise continuous no...
This paper considers the problem of stability verification for discrete–time nonlinear systems via L...
The problem of constructing a Lyapunov function for continuous-time nonlinear dynamical systems is t...
This paper considers the problem of safety verification for discrete-time, possibly discontinuous dy...
We present a numerical technique for the computation of a Lyapunov function for nonlinear systems wi...
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...
Parallel sessionInternational audienceWe present a novel numerical technique for the computation of ...
Analyzing the stability of nonlinear systems, with or without external inputs, is still a very chall...
International audienceIn this chapter, we consider the problem of global stability of nonlinear samp...
The paper proposes a numerical algorithm for constructing Lyapunov spline functions for investigatin...
Abstract. In this chapter, we consider the problem of global stability of nonlinear sampled-data sys...
This paper is concerned with the stability of sampled-data systems with state quantization. A new pi...
Most stabilizing controllers designed for nonlinear systems are valid only within a specific region ...