International audienceWe consider discrete time optimal control problems with finite horizon involving continuous states and possibly both continuous and discrete controls, subject to non-stationary linear dynamics and convex costs. In this general framework, we present a stochastic algorithm which generates monotone approximations of the value functions as a pointwise supremum or infimum of basic functions (for example affine or quadratic) which are randomly selected. We give sufficient conditions on the way basic functions are selected in order to ensure almost sure convergence of the approximations to the value function on a set of interest. Then we study a linear-quadratic optimal control problem with one control constraint. On this toy...
The paper suggests a possible cooperation between stochastic programming and optimal control for the...
A general class of large-scale, nonconvex, and non-smooth optimization problems is introduced. It ha...
AbstractA numerical scheme for stochastic differential equations with convex constraints is consider...
International audienceWe consider discrete time optimal control problems with finite horizon involvi...
Several attempt to dampen the curse of dimensionnality problem of the Dynamic Programming approach f...
Discrete-time stochastic optimal control problems are stated over a finite number of decision stages...
This chapter addresses discrete-time deterministic problems, where optimal controls have to be gener...
This work introduces a sequential convex programming framework for non-linear, finitedimensional sto...
The Stochastic Dual Dynamic Programming (SDDP) algorithm has become one of the main tools to address...
Multistage stochastic optimization aims at finding optimal decision strategies in situations where t...
International audienceWe investigate constrained optimal control problems for linear stochastic dyna...
We consider the numerical solution of discrete-time, stationary, infinite horizon, discounted stocha...
A general class of large-scale, nonconvex, and non-smooth optimization problems is introduced. It ha...
The paper suggests a possible cooperation between stochastic programming and optimal control for the...
A general class of large-scale, nonconvex, and non-smooth optimization problems is introduced. It ha...
AbstractA numerical scheme for stochastic differential equations with convex constraints is consider...
International audienceWe consider discrete time optimal control problems with finite horizon involvi...
Several attempt to dampen the curse of dimensionnality problem of the Dynamic Programming approach f...
Discrete-time stochastic optimal control problems are stated over a finite number of decision stages...
This chapter addresses discrete-time deterministic problems, where optimal controls have to be gener...
This work introduces a sequential convex programming framework for non-linear, finitedimensional sto...
The Stochastic Dual Dynamic Programming (SDDP) algorithm has become one of the main tools to address...
Multistage stochastic optimization aims at finding optimal decision strategies in situations where t...
International audienceWe investigate constrained optimal control problems for linear stochastic dyna...
We consider the numerical solution of discrete-time, stationary, infinite horizon, discounted stocha...
A general class of large-scale, nonconvex, and non-smooth optimization problems is introduced. It ha...
The paper suggests a possible cooperation between stochastic programming and optimal control for the...
A general class of large-scale, nonconvex, and non-smooth optimization problems is introduced. It ha...
AbstractA numerical scheme for stochastic differential equations with convex constraints is consider...