This paper presents a new (geometrical) approach to the computation of polyhedral positively invariant sets for general (possibly discontinuous) nonlinear systems, possibly affected by disturbances. Given a beta-contractive ellipsoidal set E, the key idea is to construct a polyhedral set that lies between the ellipsoidal sets betaE and E. A proof that the resulting polyhedral set is positively invariant (and contractive under an additional assumption) is given, and a new algorithm is developed to construct the desired polyhedral set. An advantage of the proposed method is that the problem of computing polyhedral invariant sets is formulated as a number of quadratic programming (QP) problems. The number of QP problems is guaranteed to be fin...
Given an asymptotically stabilizing linear MPC controller, this paper proposes an algorithm to const...
Abstract — This paper deals with the computation of polyhe-dral positive invariant sets for polynomi...
This work presents a general theory for the construction of a polyhedral outer approximation of the ...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
Positively invariant sets play an important role in the theory and applications of dynamical systems...
In this paper we formulate necessary and sufficient conditions for an arbitrary polyhedral set to be...
Computing control invariant sets is paramount in many applications. The families of sets commonly us...
Computing control invariant sets is paramount in many applications. The families of sets commonly us...
International audienceThis paper deals with the computation of polyhedral positive invariant sets fo...
Abstract: This paper proposes a geometrical analysis of the polyhedral feasible domains for the pred...
International audienceAutomated program verification often proceeds by exhibiting inductive invarian...
Given an asymptotically stabilizing linear MPC controller, this paper proposes an algorithm to const...
Abstract — This paper deals with the computation of polyhe-dral positive invariant sets for polynomi...
This work presents a general theory for the construction of a polyhedral outer approximation of the ...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
This paper presents a new (geometrical) approach to the computation of polyhedral positively invaria...
Positively invariant sets play an important role in the theory and applications of dynamical systems...
In this paper we formulate necessary and sufficient conditions for an arbitrary polyhedral set to be...
Computing control invariant sets is paramount in many applications. The families of sets commonly us...
Computing control invariant sets is paramount in many applications. The families of sets commonly us...
International audienceThis paper deals with the computation of polyhedral positive invariant sets fo...
Abstract: This paper proposes a geometrical analysis of the polyhedral feasible domains for the pred...
International audienceAutomated program verification often proceeds by exhibiting inductive invarian...
Given an asymptotically stabilizing linear MPC controller, this paper proposes an algorithm to const...
Abstract — This paper deals with the computation of polyhe-dral positive invariant sets for polynomi...
This work presents a general theory for the construction of a polyhedral outer approximation of the ...