International audienceThis work considers the infinite-time discounted optimal control problem for continuous time input-affine polynomial dynamical systems subject to polynomial state and box input constraints. We propose a sequence of sum-of-squares (SOS) approximations of this problem obtained by first lifting the original problem into the space of measures with continuous densities and then restricting these densities to polynomials. These approximations are tightenings, rather than relaxations, of the original problem and provide a sequence of rational controllers with value functions associated to these controllers converging (under some technical assumptions) to the value function of the original problem. In addition, we describe a m...
The approximate optimal control problem via measurement feedback for input-affine nonlinear systems ...
We introduce an approximation method to solve an optimal control problem via the Lagrange dual of it...
Abstract—In this paper, we present an approach for designing feedback controllers for polynomial sys...
International audienceThis work considers the infinite-time discounted optimal control problem for c...
This thesis studies approximate optimal control of nonlinear systems. Particular attention is given ...
This work presents a method to obtain inner and outer approximations of the region of attraction of ...
The project considers the class of deterministic continuous-time optimal control problems (OCPs) wit...
Optimal control problems are prevalent in model-based control, state and parameter estimation, and e...
A shorter version focusing only on the discrete-time case and without the technical proofs appears i...
The problem of computing controllers to enlarge the domain of attraction (DA) of equilibrium points ...
Abstract — We describe an approximate dynamic program-ming method for stochastic control problems on...
International audienceWe study the convergence rate of moment-sum-of-squares hierarchies of semidefi...
A fast implementation of a given predictive controller for polynomial systems is introduced by appro...
The approximate optimal control problem via measurement feedback for input-affine nonlinear systems ...
Optimal control design and implementation for nonlinear systems is a topic of much interest. However...
The approximate optimal control problem via measurement feedback for input-affine nonlinear systems ...
We introduce an approximation method to solve an optimal control problem via the Lagrange dual of it...
Abstract—In this paper, we present an approach for designing feedback controllers for polynomial sys...
International audienceThis work considers the infinite-time discounted optimal control problem for c...
This thesis studies approximate optimal control of nonlinear systems. Particular attention is given ...
This work presents a method to obtain inner and outer approximations of the region of attraction of ...
The project considers the class of deterministic continuous-time optimal control problems (OCPs) wit...
Optimal control problems are prevalent in model-based control, state and parameter estimation, and e...
A shorter version focusing only on the discrete-time case and without the technical proofs appears i...
The problem of computing controllers to enlarge the domain of attraction (DA) of equilibrium points ...
Abstract — We describe an approximate dynamic program-ming method for stochastic control problems on...
International audienceWe study the convergence rate of moment-sum-of-squares hierarchies of semidefi...
A fast implementation of a given predictive controller for polynomial systems is introduced by appro...
The approximate optimal control problem via measurement feedback for input-affine nonlinear systems ...
Optimal control design and implementation for nonlinear systems is a topic of much interest. However...
The approximate optimal control problem via measurement feedback for input-affine nonlinear systems ...
We introduce an approximation method to solve an optimal control problem via the Lagrange dual of it...
Abstract—In this paper, we present an approach for designing feedback controllers for polynomial sys...