数学优化
稳健优化
分段线性函数
线性规划
计算机科学
集合(抽象数据类型)
光学(聚焦)
最优化问题
正多边形
凸优化
数学
几何学
光学
物理
程序设计语言
出处
期刊:Operations Research
[Institute for Operations Research and the Management Sciences]
日期:2010-04-24
卷期号:58 (4-part-1): 902-917
被引量:647
标识
DOI:10.1287/opre.1090.0795
摘要
In this paper we focus on a linear optimization problem with uncertainties, having expectations in the objective and in the set of constraints. We present a modular framework to obtain an approximate solution to the problem that is distributionally robust and more flexible than the standard technique of using linear rules. Our framework begins by first affinely extending the set of primitive uncertainties to generate new linear decision rules of larger dimensions and is therefore more flexible. Next, we develop new piecewise-linear decision rules that allow a more flexible reformulation of the original problem. The reformulated problem will generally contain terms with expectations on the positive parts of the recourse variables. Finally, we convert the uncertain linear program into a deterministic convex program by constructing distributionally robust bounds on these expectations. These bounds are constructed by first using different pieces of information on the distribution of the underlying uncertainties to develop separate bounds and next integrating them into a combined bound that is better than each of the individual bounds.
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