Lagrangian Dual Decision Rules for Multistage Stochastic Mixed-Integer Programming

IF 0.7 4区 管理学 Q3 Engineering
Maryam Daryalal, Merve Bodur, James R. Luedtke
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引用次数: 5

Abstract

On Decision Rules for Multistage Stochastic Programs with Mixed-Integer Decisions Multistage stochastic programming is a field of stochastic optimization for addressing sequential decision-making problems defined over a stochastic process with a given probability distribution. The solution to such a problem is a decision rule (policy) that maps the history of observations to the decisions. Design of the decision rules in the presence of mixed-integer decisions is quite challenging. In “Lagrangian Dual Decision Rules for Multistage Stochastic Mixed-Integer Programming,” Daryalal, Bodur, and Luedtke introduce Lagrangian dual decision rules, where linear decision rules are applied to dual multipliers associated with Lagrangian duals of a multistage stochastic mixed-integer programming (MSMIP) model. The restricted decisions are then used in the development of new primal- and dual-bounding methods. This yields a new general-purpose approximation approach for MSMIP, free of strong assumptions made in the literature, such as stagewise independence or existence of a tractable-sized scenario-tree representation.
多阶段随机混合整数规划的拉格朗日对偶决策规则
多阶段随机规划是解决具有给定概率分布的随机过程所定义的顺序决策问题的一个随机优化领域。此类问题的解决方案是将观察历史映射到决策的决策规则(策略)。混合整数决策的决策规则设计是一项具有挑战性的工作。在“多阶段随机混合整数规划的拉格朗日对偶决策规则”一文中,Daryalal, Bodur和Luedtke介绍了拉格朗日对偶决策规则,其中线性决策规则应用于与多阶段随机混合整数规划(MSMIP)模型的拉格朗日对偶相关的对偶乘数。限制决策然后用于开发新的原边界和双边界方法。这为MSMIP提供了一种新的通用近似方法,不需要在文献中做出强假设,例如阶段独立性或存在可处理大小的场景树表示。
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来源期刊
Military Operations Research
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
0
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.
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