论文信息 - Progressive hedging as a meta-heuristic applied to stochastic lot-sizing

Progressive hedging as a meta-heuristic applied to stochastic lot-sizing

Abstract In a great many situations, the data for optimization problems cannot be known with certainty and furthermore the decision process will take place in multiple time stages as the uncertainties are resolved. This gives rise to a need for stochastic programming (SP) methods that create solutions that are hedged against future uncertainty. The progressive hedging algorithm (PHA) of Rockafellar and Wets is a general method for SP. We cast the PHA in a meta-heuristic framework with the sub-problems generated for each scenario solved heuristically. Rather than using an approximate search algorithm for the exact problem as is typically the case in the meta-heuristic literature, we use an algorithm for sub-problems that is exact in its usual context but serves as a heuristic for our meta-heuristic. Computational results reported for stochastic lot-sizing problems demonstrate that the method is effective.

David L. Woodruff | Kjetil K. Haugen | Arne Løkketangen | D. L. Woodruff | A. Løkketangen

[1] Alan J. King,et al. A Standard Input Format for Multiperiod Stochastic Linear Programs , 1987 .

[2] F. J. Gould,et al. Extensions of the Planning Horizon Theorem in the Dynamic Lot Size Model , 1969 .

[3] W. Zangwill. A Deterministic Multi-Period Production Scheduling Model with Backlogging , 1966 .

[4] David L. Woodruff,et al. Progressive hedging and tabu search applied to mixed integer (0,1) multistage stochastic programming , 1996, J. Heuristics.

[5] W. Zangwill. A Backlogging Model and a Multi-Echelon Model of a Dynamic Economic Lot Size Production System---A Network Approach , 1969 .

[6] Hartmut Stadtler,et al. Improved rolling schedules for the dynamic single level lot sizing problem , 2000 .

[7] William W. Trigeiro,et al. Capacitated lot sizing with setup times , 1989 .

[8] Arthur F. Veinott,et al. Minimum Concave-Cost Solution of Leontief Substitution Models of Multi-Facility Inventory Systems , 1969, Oper. Res..

[9] R. Tyrrell Rockafellar,et al. Scenarios and Policy Aggregation in Optimization Under Uncertainty , 1991, Math. Oper. Res..

[10] W. Zangwill. Minimum Concave Cost Flows in Certain Networks , 1968 .

[11] John R. Birge,et al. Intelligent unified control of unit commitment and generation allocation , 1994 .

[12] Peter Kall,et al. Stochastic Programming , 1995 .