两阶段混合整数追索权模型的收敛Benders分解算法

IF 0.7 4区管理学 Q3 Engineering

Military Operations Research Pub Date : 2023-05-12 DOI:10.1287/opre.2021.2223

N. van der Laan, Ward Romeijnders

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引用次数: 11

摘要

两阶段随机混合整数规划的适用性和应用已经得到了证实，因此需要有效的分解算法来求解这类规划。这种算法通常依赖于最优切割来从下面近似预期的第二阶段成本函数。在“混合整数追索权模型的收敛弯曲分解算法”中，van der Laan和Romeijnders导出了一个新的最优性切割族，它足够丰富，可以识别一般的两阶段随机混合整数规划的最优解。也就是说，两个阶段都允许使用一般的混合整数决策变量，并且允许所有数据元素都是随机的。此外，这些新的最优性切割需要按场景分解的计算，因此，它们可以有效地计算。Van der Laan和Romeijnders在一系列问题实例(包括SIPLIB中的DCAP实例)上展示了他们的方法的潜力。

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A Converging Benders’ Decomposition Algorithm for Two-Stage Mixed-Integer Recourse Models

Novel Optimality Cuts for Two-Stage Stochastic Mixed-Integer Programs The applicability and use of two-stage stochastic mixed-integer programs is well-established, thus calling for efficient decomposition algorithms to solve them. Such algorithms typically rely on optimality cuts to approximate the expected second stage cost function from below. In “A Converging Benders’ Decomposition Algorithm for Mixed-Integer Recourse Models,” van der Laan and Romeijnders derive a new family of optimality cuts that is sufficiently rich to identify the optimal solution of two-stage stochastic mixed-integer programs in general. That is, general mixed-integer decision variables are allowed in both stages, and all data elements are allowed to be random. Moreover, these new optimality cuts require computations that decompose by scenario, and thus, they can be computed efficiently. Van der Laan and Romeijnders demonstrate the potential of their approach on a range of problem instances, including the DCAP instances from SIPLIB.

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来源期刊

Military Operations Research 管理科学-运筹学与管理科学

CiteScore

1.00

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Military Operations Research is a peer-reviewed journal of high academic quality. The Journal publishes articles that describe operations research (OR) methodologies and theories used in key military and national security applications. Of particular interest are papers that present: Case studies showing innovative OR applications Apply OR to major policy issues Introduce interesting new problems areas Highlight education issues Document the history of military and national security OR.