Multistage stochastic optimization problems are, by essence, complex as their solutions are indexed both by stages and by uncertainties. Their large scale nature makes decomposition methods appealing, like dynamic programming which is a sequential decomposition using a state variable defined at all stages. In this paper, we introduce the notion of state reduction by time blocks, that is, at stages that are not necessarily all the original stages. Then, we prove a reduced dynamic programming equation. We position our result with respect to the most well-known mathematical frameworks for dynamic programming. We illustrate our contribution by showing its potential for applied problems with two time scales
Several attempt to dampen the curse of dimensionnality problem of the Dynamic Programming approach f...
Summary. In this paper it is demonstrated how necessary and sufficient conditions for optimality of ...
The focus of the present volume is stochastic optimization of dynamical systems in discrete time whe...
Multistage stochastic optimization problems are, by essence, complex because their solutions are ind...
Multistage stochastic optimization aims at finding optimal decision strategies in situations where t...
The paper suggests a possible cooperation between stochastic programming\ud and optimal control for ...
International audienceWe consider multistage stochastic optimization problems involving multiple uni...
We consider sequences-indexed by time (discrete stages)-of families of multistage stochastic optimiz...
In this contribution we propose an approach to solve a multistage stochastic programming problem whi...
In this dissertation, we focus on developing sampling-based algorithms for solving stochastic linear...
It is common that strategic investment decisions are made at a slow time-scale, whereasoperational d...
In this contribution we present a time and nodal decomposition approach to solve a rather general mu...
We provide a method to decompose multistage stochastic optimization problems by time blocks. This me...
Several attempt to dampen the curse of dimensionnality problem of the Dynamic Programming approach f...
Summary. In this paper it is demonstrated how necessary and sufficient conditions for optimality of ...
The focus of the present volume is stochastic optimization of dynamical systems in discrete time whe...
Multistage stochastic optimization problems are, by essence, complex because their solutions are ind...
Multistage stochastic optimization aims at finding optimal decision strategies in situations where t...
The paper suggests a possible cooperation between stochastic programming\ud and optimal control for ...
International audienceWe consider multistage stochastic optimization problems involving multiple uni...
We consider sequences-indexed by time (discrete stages)-of families of multistage stochastic optimiz...
In this contribution we propose an approach to solve a multistage stochastic programming problem whi...
In this dissertation, we focus on developing sampling-based algorithms for solving stochastic linear...
It is common that strategic investment decisions are made at a slow time-scale, whereasoperational d...
In this contribution we present a time and nodal decomposition approach to solve a rather general mu...
We provide a method to decompose multistage stochastic optimization problems by time blocks. This me...
Several attempt to dampen the curse of dimensionnality problem of the Dynamic Programming approach f...
Summary. In this paper it is demonstrated how necessary and sufficient conditions for optimality of ...
The focus of the present volume is stochastic optimization of dynamical systems in discrete time whe...