Computing control invariant sets is paramount in many applications. The families of sets commonly used for computations are ellipsoids and polyhedra. However, searching for a control invariant set over the family of ellipsoids is conservative for systems more complex than unconstrained linear time invariant systems. Moreover, even if the control invariant set may be approximated arbitrarily closely by polyhedra, the complexity of the polyhedra may grow rapidly in certain directions. An attractive generalization of these two families are piecewise semi-ellipsoids. We provide in this paper a convex programming approach for computing control invariant sets of this family
The investigation of control and estimation problems under unknown but bounded errors and disturbanc...
We characterize the maximum controlled invariant (MCI) set for discrete-time systems as the solution...
This paper introduces a technique for solving the problem of control synthesis for linear systems wi...
Computing control invariant sets is paramount in many applications. The families of sets commonly us...
In this paper, we present a geometric approach for computing the controlled invariant set of a conti...
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 (robustly) positiv...
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...
A method for computing invariant sets of piecewise affine systems is presented. The method is based ...
In a multistage program without complete recourse, a solution, which is feasible at a particular sta...
Abstract—In a previous paper we showed how the continual reachability set can be numerically compute...
Given an asymptotically stabilizing linear MPC controller, this paper proposes an algorithm to const...
We present a new exact approach to the stable set problem, which avoids the pitfalls of existing app...
The investigation of control and estimation problems under unknown but bounded errors and disturbanc...
We characterize the maximum controlled invariant (MCI) set for discrete-time systems as the solution...
This paper introduces a technique for solving the problem of control synthesis for linear systems wi...
Computing control invariant sets is paramount in many applications. The families of sets commonly us...
In this paper, we present a geometric approach for computing the controlled invariant set of a conti...
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 (robustly) positiv...
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...
A method for computing invariant sets of piecewise affine systems is presented. The method is based ...
In a multistage program without complete recourse, a solution, which is feasible at a particular sta...
Abstract—In a previous paper we showed how the continual reachability set can be numerically compute...
Given an asymptotically stabilizing linear MPC controller, this paper proposes an algorithm to const...
We present a new exact approach to the stable set problem, which avoids the pitfalls of existing app...
The investigation of control and estimation problems under unknown but bounded errors and disturbanc...
We characterize the maximum controlled invariant (MCI) set for discrete-time systems as the solution...
This paper introduces a technique for solving the problem of control synthesis for linear systems wi...