Also Preprint arXiv:2304.10342International audienceWe introduce a new numerical method to approximate the solution of a finite horizon deterministic optimal control problem. We exploit two Hamilton-Jacobi-Bellman PDE, arising by considering the dynamics in forward and backward time. This allows us to compute a neighborhood of the set of optimal trajectories, in order to reduce the search space. The solutions of both PDE are successively approximated by max-plus linear combinations of appropriate basis functions, using a hierarchy of finer and finer grids. We show that the sequence of approximate value functions obtained in this way does converge to the viscosity solution of the HJB equation in a neighborhood of optimal trajectories. Then, ...
In the dynamic programming approach to optimal control problems a crucial role is played by the valu...
In this paper we develop a new version of the semi-Lagrangian algorithm for first order Hamilton–Jac...
The approximation of feedback control via the Dynamic Programming approach is a challenging problem....
International audienceWe introduce a new numerical method to approximate the solutions of a class of...
The classical dynamic programming (DP) approach to optimal control problems is based on the characte...
Abstract We consider the general continuous time finite-dimensional deterministic system under a fin...
Dynamic programming is one of the main approaches to solve optimal control problems. It reduces the ...
In previous work of the first author and others, max-plus methods have been explored for solution of...
© 2014 IEEE. McEneaney introduced the curse of dimensionality free method for the special class of i...
We consider the approximation of some optimal control problems for the Navier-Stokes equation via a ...
In this work we deal with the numerical solution of a Hamilton-Jacobi-Bellman (HJB) equation with in...
An approximation of the Hamilton-Jacobi-Bellman equation connected with the infinite horizon optimal...
This is the first of two papers on boundary optimal control problems with linear state equation and ...
A one-dimensional in¯nite horizon deterministic singular optimal control problem with controls takin...
In the dynamic programming approach to optimal control problems a crucial role is played by the valu...
In this paper we develop a new version of the semi-Lagrangian algorithm for first order Hamilton–Jac...
The approximation of feedback control via the Dynamic Programming approach is a challenging problem....
International audienceWe introduce a new numerical method to approximate the solutions of a class of...
The classical dynamic programming (DP) approach to optimal control problems is based on the characte...
Abstract We consider the general continuous time finite-dimensional deterministic system under a fin...
Dynamic programming is one of the main approaches to solve optimal control problems. It reduces the ...
In previous work of the first author and others, max-plus methods have been explored for solution of...
© 2014 IEEE. McEneaney introduced the curse of dimensionality free method for the special class of i...
We consider the approximation of some optimal control problems for the Navier-Stokes equation via a ...
In this work we deal with the numerical solution of a Hamilton-Jacobi-Bellman (HJB) equation with in...
An approximation of the Hamilton-Jacobi-Bellman equation connected with the infinite horizon optimal...
This is the first of two papers on boundary optimal control problems with linear state equation and ...
A one-dimensional in¯nite horizon deterministic singular optimal control problem with controls takin...
In the dynamic programming approach to optimal control problems a crucial role is played by the valu...
In this paper we develop a new version of the semi-Lagrangian algorithm for first order Hamilton–Jac...
The approximation of feedback control via the Dynamic Programming approach is a challenging problem....