Benders decomposition is one of the most applied methods to solve two-stage stochastic problems (TSSP) with a large number of scenarios. The main idea behind the Benders decomposition is to solve a large problem by replacing the values of the second-stage subproblems with individual variables, and progressively forcing those variables to reach the optimal value of the subproblems, dynamically inserting additional valid constraints, known as Benders cuts. Most traditional implementations add a cut for each scenario (multi-cut) or a single-cut that includes all scenarios. In this paper we present a novel Benders adaptive-cuts method, where the Benders cuts are aggregated according to a partition of the scenarios, which is dynamically refined ...
International audienceAdaptive Partition-based Methods (APM) are numerical methods to solve two-stag...
Dynamic multistage stochastic linear programming has many practical applications for problems whose ...
We introduce the two‐stage stochastic minimum s − t cut problem. Based on a classical linear 0‐1 pro...
This paper introduces a new exact algorithm to solve two-stage stochastic linear programs. Based on ...
This paper focuses on solving two-stage stochastic mixed integer programs (SMIPs) with general mixed...
summary:In this paper, we describe a decomposition algorithm suitable for two-stage convex stochasti...
We introduce the two-stage stochastic minimum s − t cut problem. Based on a classical linear 0-1 pro...
We consider two-stage stochastic programming problems with integer recourse. The L-shaped method of ...
The optimization of stochastic linear problems, via scenario analysis, based on Benders decompositio...
Adaptive Partition-based Methods (APM) are numerical methods to solve two-stage stochastic linear pr...
We develop scalable algorithms for two-stage stochastic program optimizations. We propose performanc...
A class of algorithms for solving multistage stochastic recourse problems is described. The scenario...
Many real-life optimization problems belong to the class of two-stage stochastic mixed-integer progr...
Benders decomposition entails a two-stage optimization approach to a mixed integer program: first-s...
Abstract We describe a decomposition algorithm that combines Benders and scenario-based Lagrangean d...
International audienceAdaptive Partition-based Methods (APM) are numerical methods to solve two-stag...
Dynamic multistage stochastic linear programming has many practical applications for problems whose ...
We introduce the two‐stage stochastic minimum s − t cut problem. Based on a classical linear 0‐1 pro...
This paper introduces a new exact algorithm to solve two-stage stochastic linear programs. Based on ...
This paper focuses on solving two-stage stochastic mixed integer programs (SMIPs) with general mixed...
summary:In this paper, we describe a decomposition algorithm suitable for two-stage convex stochasti...
We introduce the two-stage stochastic minimum s − t cut problem. Based on a classical linear 0-1 pro...
We consider two-stage stochastic programming problems with integer recourse. The L-shaped method of ...
The optimization of stochastic linear problems, via scenario analysis, based on Benders decompositio...
Adaptive Partition-based Methods (APM) are numerical methods to solve two-stage stochastic linear pr...
We develop scalable algorithms for two-stage stochastic program optimizations. We propose performanc...
A class of algorithms for solving multistage stochastic recourse problems is described. The scenario...
Many real-life optimization problems belong to the class of two-stage stochastic mixed-integer progr...
Benders decomposition entails a two-stage optimization approach to a mixed integer program: first-s...
Abstract We describe a decomposition algorithm that combines Benders and scenario-based Lagrangean d...
International audienceAdaptive Partition-based Methods (APM) are numerical methods to solve two-stag...
Dynamic multistage stochastic linear programming has many practical applications for problems whose ...
We introduce the two‐stage stochastic minimum s − t cut problem. Based on a classical linear 0‐1 pro...