We discuss the almost-sure convergence of a broad class of sampling algorithms for multi-stage stochastic linear programs. We provide a convergence proof based on the finiteness of the set of distinct cutcoefficients. This differs from existing published proofs in that it does not require a restrictive assumption
The Stochastic Dual Dynamic Programming (SDDP) algorithm has become one of the main tools to address...
We introduce a class of algorithms, called Trajectory Following Dynamic Programming (TFDP) algorithm...
We consider risk-averse formulations of multistage stochastic linear programs. Forthese formulations...
We discuss the almost-sure convergence of a broad class of sampling algorithms for multi-stage stoch...
The paper presents a convergence proof for a broad class of sampling algorithms for multistage stoch...
International audienceWe prove the almost-sure convergence of a class of sampling-based nested decom...
Multi-stage stochastic programs (MSP) pose some of the more challenging optimizationproblems. Becaus...
We introduce a class of algorithms, called Trajectory Following Dynamic Programming (TFDP) algorithm...
In this dissertation, we focus on developing sampling-based algorithms for solving stochastic linear...
Several attempt to dampen the curse of dimensionnality problem of the Dynamic Programming approach f...
Outer linearization methods, such as Van Slyke and West's L-shaped method for stochastic linear prog...
2016-06-16Stochastic Programming (SP) has long been considered as a well-justified yet computational...
We consider a class of multistage stochastic linear programs in which at each stage a coherent risk ...
Stochastic optimal control addresses sequential decision-making under uncertainty. As applications l...
Abstract In this paper, we study multistage stochastic mixed-integer nonlinear programs...
The Stochastic Dual Dynamic Programming (SDDP) algorithm has become one of the main tools to address...
We introduce a class of algorithms, called Trajectory Following Dynamic Programming (TFDP) algorithm...
We consider risk-averse formulations of multistage stochastic linear programs. Forthese formulations...
We discuss the almost-sure convergence of a broad class of sampling algorithms for multi-stage stoch...
The paper presents a convergence proof for a broad class of sampling algorithms for multistage stoch...
International audienceWe prove the almost-sure convergence of a class of sampling-based nested decom...
Multi-stage stochastic programs (MSP) pose some of the more challenging optimizationproblems. Becaus...
We introduce a class of algorithms, called Trajectory Following Dynamic Programming (TFDP) algorithm...
In this dissertation, we focus on developing sampling-based algorithms for solving stochastic linear...
Several attempt to dampen the curse of dimensionnality problem of the Dynamic Programming approach f...
Outer linearization methods, such as Van Slyke and West's L-shaped method for stochastic linear prog...
2016-06-16Stochastic Programming (SP) has long been considered as a well-justified yet computational...
We consider a class of multistage stochastic linear programs in which at each stage a coherent risk ...
Stochastic optimal control addresses sequential decision-making under uncertainty. As applications l...
Abstract In this paper, we study multistage stochastic mixed-integer nonlinear programs...
The Stochastic Dual Dynamic Programming (SDDP) algorithm has become one of the main tools to address...
We introduce a class of algorithms, called Trajectory Following Dynamic Programming (TFDP) algorithm...
We consider risk-averse formulations of multistage stochastic linear programs. Forthese formulations...