International audienceThis work presents a data-driven method for approximation of the maximum positively invariant (MPI) set and the maximum controlled invariant (MCI) set for nonlinear dynamical systems. The method only requires the knowledge of a finite collection of one-step transitions of the discrete-time dynamics, without the requirement of segments of trajectories or the control inputs that effected the transitions to be available. The approach uses a novel characterization of the MPI and MCI sets as the solution to an infinite-dimensional linear programming (LP) problem in the space of continuous functions, with the optimum being attained by a (Lipschitz) continuous function under mild assumptions. The infinite-dimensional LP is th...
A procedure and theoretical results are presented for the problem of determining a minimal robust po...
A convex formulation is derived for optimizing dynamic feedback laws for constrained linear systems ...
Non-convex discrete-time optimal control problems in, e.g., water or power systems, typically involv...
International audienceThis work presents a data-driven method for approximation of the maximum posit...
A shorter version focusing only on the discrete-time case and without the technical proofs appears i...
We characterize the maximum controlled invariant (MCI) set for discrete-time systems as the solution...
We propose a convex-optimization-based framework for computation of invariant measures of polynomial...
We consider the problem of computing the maximal invariant set of discrete-time linear systems subje...
We address the long-standing problem of computing the region of attraction (ROA) of a target set (e....
This article presents an approximation scheme for the infinite-dimensional linear programming formul...
Given an asymptotically stabilizing linear MPC controller, this paper proposes an algorithm to const...
We propose an algorithm based on online convex optimization for controlling discrete-time linear dyn...
A method is presented for determining invariant low-complexity polytopic sets and associated linear ...
It is well known that open dynamical systems can admit an un-countable number of (absolutely continu...
International audienceInvariant set theory has been recognized as an important tool for control desi...
A procedure and theoretical results are presented for the problem of determining a minimal robust po...
A convex formulation is derived for optimizing dynamic feedback laws for constrained linear systems ...
Non-convex discrete-time optimal control problems in, e.g., water or power systems, typically involv...
International audienceThis work presents a data-driven method for approximation of the maximum posit...
A shorter version focusing only on the discrete-time case and without the technical proofs appears i...
We characterize the maximum controlled invariant (MCI) set for discrete-time systems as the solution...
We propose a convex-optimization-based framework for computation of invariant measures of polynomial...
We consider the problem of computing the maximal invariant set of discrete-time linear systems subje...
We address the long-standing problem of computing the region of attraction (ROA) of a target set (e....
This article presents an approximation scheme for the infinite-dimensional linear programming formul...
Given an asymptotically stabilizing linear MPC controller, this paper proposes an algorithm to const...
We propose an algorithm based on online convex optimization for controlling discrete-time linear dyn...
A method is presented for determining invariant low-complexity polytopic sets and associated linear ...
It is well known that open dynamical systems can admit an un-countable number of (absolutely continu...
International audienceInvariant set theory has been recognized as an important tool for control desi...
A procedure and theoretical results are presented for the problem of determining a minimal robust po...
A convex formulation is derived for optimizing dynamic feedback laws for constrained linear systems ...
Non-convex discrete-time optimal control problems in, e.g., water or power systems, typically involv...