Adjustable Robust Optimization via Fourier-Motzkin Elimination
成果类型:
Article
署名作者:
Zhen, Jianzhe; den Hertog, Dick; Sim, Melvyn
署名单位:
Tilburg University; National University of Singapore
刊物名称:
OPERATIONS RESEARCH
ISSN/ISSBN:
0030-364X
DOI:
10.1287/opre.2017.1714
发表日期:
2018
页码:
1086-1100
关键词:
deriving robust
affine policies
Decision rules
uncertainty
counterparts
sums
摘要:
We demonstrate how adjustable robust optimization (ARO) problems with fixed recourse can be cast as static robust optimization problems via Fourier-Motzkin elimination (FME). Through the lens of FME, we characterize the structures of the optimal decision rules for a broad class of ARO problems. A scheme based on a blending of classical FME and a simple linear programming technique that can efficiently remove redundant constraints is developed to reformulate ARO problems. This generic reformulation technique enhances the classical approximation scheme via decision rules, and it enables us to solve adjustable optimization problems to optimality. We show via numerical experiments that, for small-sized ARO problems, our novel approach finds the optimal solution. For moderate- or large-sized instances, we eliminate a subset of the adjustable variables, which improves the solutions obtained from linear decision rules.
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