Two-Stage Robust Network Flow and Design Under Demand Uncertainty

We describe a two-stage robust optimization approach for solving network flow and design problems with uncertain demand. In two-stage network optimization, one defers a subset of the flow decisions until after the realization of the uncertain demand. Availability of such a recourse action allows one...

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Vydáno v:	Operations research Ročník 55; číslo 4; s. 662 - 673
Hlavní autoři:	Atamturk, Alper, Zhang, Muhong
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	Linthicum, MD INFORMS 01.07.2007 Institute for Operations Research and the Management Sciences
Témata:	applications Applied sciences Commodities Design optimization Evaluation Exact sciences and technology Flows in networks. Combinatorial problems integer Integer programming Integers Inventory control, production control. Distribution Linear programming Logistics Mathematical vectors Network flow problem Network management systems network/graphs Observational research Operational research and scientific management Operational research. Management science Optimization Optimization techniques programming Robust optimization Stochastic analysis Studies Transportation Transportation demand Transportation problem (Operations research) Uncertainty United States Availability Script Conservatism Probabilistic approach Network flow Lot sizing Random vector Separation principle Location problem Optimization Stochastic programming Integer programming Upper bound Uncertain system Transportation problem Network topology network/graphs: applications Multicommodity flow problem Minimax method Budget Bipartite graph programming: integer Infeasibility
ISSN:	0030-364X, 1526-5463
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Popis
Shrnutí:	We describe a two-stage robust optimization approach for solving network flow and design problems with uncertain demand. In two-stage network optimization, one defers a subset of the flow decisions until after the realization of the uncertain demand. Availability of such a recourse action allows one to come up with less conservative solutions compared to single-stage optimization. However, this advantage often comes at a price: two-stage optimization is, in general, significantly harder than single-stage optimization. For network flow and design under demand uncertainty, we give a characterization of the first-stage robust decisions with an exponential number of constraints and prove that the corresponding separation problem is -hard even for a network flow problem on a bipartite graph. We show, however, that if the second-stage network topology is totally ordered or an arborescence, then the separation problem is tractable. Unlike single-stage robust optimization under demand uncertainty, two-stage robust optimization allows one to control conservatism of the solutions by means of an allowed "budget for demand uncertainty." Using a budget of uncertainty, we provide an upper bound on the probability of infeasibility of a robust solution for a random demand vector. We generalize the approach to multicommodity network flow and design, and give applications to lot-sizing and location-transportation problems. By projecting out second-stage flow variables, we define an upper bounding problem for the two-stage min-max-min optimization problem. Finally, we present computational results comparing the proposed two-stage robust optimization approach with single-stage robust optimization as well as scenario-based two-stage stochastic optimization.
Bibliografie:	SourceType-Scholarly Journals-1 ObjectType-Feature-1 content type line 14
ISSN:	0030-364X 1526-5463
DOI:	10.1287/opre.1070.0428