International audienceIn this paper, we show that a basic fixed point method used to enclose the greatest fixed point in a Kleene algebra will allow us to compute inner and outer approximations of invariant-based sets for continuous-time nonlinear dynamical systems. Our contribution is to provide the definitions and theorems that will allow us to make the link between the theory of invariant sets and the Kleene algebra. This link has never be done before and will allow us to compute rigorously sets that can be defined as a combination of positive invariant sets. Some illustrating examples show the nice properties of the approach
It is well known that finite square matrices over a Kleene algebra again form a Kleene algebra. Thi...
In this paper a new concept of set invariance, called D-invariance, is introduced for dynamical syst...
This paper deals with robust invariant sets construction for discrete-time linear time-invariant dyn...
International audienceIn this paper, we show that a basic fixed point method used to enclose the gre...
In this paper, we propose a method for computing invariant sets of discrete-time nonlinear systems b...
International audienceThis paper proposes an original interval-based method to compute an outer appr...
In this article, we present a geometric framework to study invariant sets of dynamical systems asso...
The Lasserre or moment-sum-of-square hierarchy of linear matrix inequality relaxations is used to co...
Dynamical systems model the time evolution of both natural and engineered processes. The automatic a...
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...
We propose to compute approximations to invariant sets in dynamical systems by minimizing an appropr...
International audienceThis contribution deals with the computational issues encountered in the const...
Synthesis methods for the construction of invariant sets for delay difference equations (DDEs) suffe...
Symmetries and Semi-invariants in the Analysis of Nonlinear Systems details the analysis of continuo...
It is well known that finite square matrices over a Kleene algebra again form a Kleene algebra. Thi...
In this paper a new concept of set invariance, called D-invariance, is introduced for dynamical syst...
This paper deals with robust invariant sets construction for discrete-time linear time-invariant dyn...
International audienceIn this paper, we show that a basic fixed point method used to enclose the gre...
In this paper, we propose a method for computing invariant sets of discrete-time nonlinear systems b...
International audienceThis paper proposes an original interval-based method to compute an outer appr...
In this article, we present a geometric framework to study invariant sets of dynamical systems asso...
The Lasserre or moment-sum-of-square hierarchy of linear matrix inequality relaxations is used to co...
Dynamical systems model the time evolution of both natural and engineered processes. The automatic a...
Continuous linear dynamical systems are used extensively in mathematics, computer science, physics, ...
We propose to compute approximations to invariant sets in dynamical systems by minimizing an appropr...
International audienceThis contribution deals with the computational issues encountered in the const...
Synthesis methods for the construction of invariant sets for delay difference equations (DDEs) suffe...
Symmetries and Semi-invariants in the Analysis of Nonlinear Systems details the analysis of continuo...
It is well known that finite square matrices over a Kleene algebra again form a Kleene algebra. Thi...
In this paper a new concept of set invariance, called D-invariance, is introduced for dynamical syst...
This paper deals with robust invariant sets construction for discrete-time linear time-invariant dyn...