Having a finite bisimulation is a good feature for a dynamical system, since it can lead to the decidability of the verification of reachability properties. We investigate a new class of o-minimal dynamical systems with very general flows, where the classical restrictions on trajectory intersections are partly lifted. We identify conditions, that we call Finite and Uniform Crossing: When Finite Crossing holds, the time-abstract bisimulation is computable and, under the stronger Uniform Crossing assumption, this bisimulation is finite and definable
AbstractIt is shown that bisimulation equivalence is decidable for the processes generated by (nonde...
Abstract. It is well known that in an o-minimal hybrid system the continuous and discrete components...
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...
International audienceHaving a finite bisimulation is a good feature for a dynamical system, since i...
In this paper we study a class of dynamical systems defined by Pfaffian maps. It is a sub-class of o...
Finite abstractions of infinite state models have been critical in enabling and applying formal and ...
. One of the most important analysis problems of hybrid systems is the reachability problem. State o...
We study finite bisimulations of dynamical systems in ℝn defined by Pfaffian maps. The pure existenc...
Abstract. In this paper we study a class of dynamical systems defined by Pfaffian maps. It is a sub-...
In this paper we study bisimulations on dynamical systems through a given partition. Our aim is to ...
In this paper we study bisimulations on dynamical systems through a given partition. Our aim is to g...
AbstractIn this paper we consider a class of hybrid systems, namely dynamical systems with piecewise...
Abstract. In this paper we study bisimulations on dynamical systems through a given partition. Our a...
We consider the class of o-minimally definable hybrid automata with a bounded discrete-transition ho...
Abstract. Within hybrid systems theory, o-minimal automata are often considered on the border betwee...
AbstractIt is shown that bisimulation equivalence is decidable for the processes generated by (nonde...
Abstract. It is well known that in an o-minimal hybrid system the continuous and discrete components...
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...
International audienceHaving a finite bisimulation is a good feature for a dynamical system, since i...
In this paper we study a class of dynamical systems defined by Pfaffian maps. It is a sub-class of o...
Finite abstractions of infinite state models have been critical in enabling and applying formal and ...
. One of the most important analysis problems of hybrid systems is the reachability problem. State o...
We study finite bisimulations of dynamical systems in ℝn defined by Pfaffian maps. The pure existenc...
Abstract. In this paper we study a class of dynamical systems defined by Pfaffian maps. It is a sub-...
In this paper we study bisimulations on dynamical systems through a given partition. Our aim is to ...
In this paper we study bisimulations on dynamical systems through a given partition. Our aim is to g...
AbstractIn this paper we consider a class of hybrid systems, namely dynamical systems with piecewise...
Abstract. In this paper we study bisimulations on dynamical systems through a given partition. Our a...
We consider the class of o-minimally definable hybrid automata with a bounded discrete-transition ho...
Abstract. Within hybrid systems theory, o-minimal automata are often considered on the border betwee...
AbstractIt is shown that bisimulation equivalence is decidable for the processes generated by (nonde...
Abstract. It is well known that in an o-minimal hybrid system the continuous and discrete components...
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...