International audienceIn this paper, we establish a certain number of results for abstraction of a class of incrementally stable dynamical systems, in the framework of approximate bisimulation. Our approach does not rely on a discretization of the state space, it is therefore applicable indifferently to finite dimensional systems such as those modeled by differential equations, or infinite dimensional systems, such as those modeled by time-delay or partial differential equations. Our first result states that the sampled dynamics of an incrementally stable dynamical system is approximately bisimilar to a family of finite dimensional systems; this is of particular interest for infinite dimensional dynamical systems. The second result shows th...
Abstract. This paper addresses the design of approximately bisimilar finite abstractions of systems ...
Abstract: Optimal control and reachability analysis of continuous-state systems often require comput...
The reduction of dynamical systems has a rich history, with many important applications related to s...
International audienceIn this paper, we establish a certain number of results for abstraction of a c...
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...
International audienceThe use of bisimilar finite abstractions of continuous and hybrid systems, gre...
A general notion of bisimulation is defined for linear input-state-output systems, using analogies w...
Finite abstractions of infinite state models have been critical in enabling and applying formal and ...
The notion of exact bisimulation equivalence for nondeterministic discrete systems has recently resu...
The notion of bisimulation plays a very important role in theoretical computer science where it prov...
Simulation and bisimulation relations define pre-orders on processes which serve as the basis for ap...
For finite-dimensional systems the class of balanced realisations is defined as that whose controlla...
AbstractIn this paper we propose a new equivalence relation for dynamical and control systems called...
International audienceControl systems are usually modeled by differential equations describing how p...
Abstract. This paper addresses the design of approximately bisimilar finite abstractions of systems ...
Abstract: Optimal control and reachability analysis of continuous-state systems often require comput...
The reduction of dynamical systems has a rich history, with many important applications related to s...
International audienceIn this paper, we establish a certain number of results for abstraction of a c...
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...
A general notion of bisimulation is studied for dynamical systems. An algebraic characterization of ...
International audienceThe use of bisimilar finite abstractions of continuous and hybrid systems, gre...
A general notion of bisimulation is defined for linear input-state-output systems, using analogies w...
Finite abstractions of infinite state models have been critical in enabling and applying formal and ...
The notion of exact bisimulation equivalence for nondeterministic discrete systems has recently resu...
The notion of bisimulation plays a very important role in theoretical computer science where it prov...
Simulation and bisimulation relations define pre-orders on processes which serve as the basis for ap...
For finite-dimensional systems the class of balanced realisations is defined as that whose controlla...
AbstractIn this paper we propose a new equivalence relation for dynamical and control systems called...
International audienceControl systems are usually modeled by differential equations describing how p...
Abstract. This paper addresses the design of approximately bisimilar finite abstractions of systems ...
Abstract: Optimal control and reachability analysis of continuous-state systems often require comput...
The reduction of dynamical systems has a rich history, with many important applications related to s...