有资源约束和无资源约束联合补给问题的数学启发式

IF 4.4 3区 管理学 Q1 OPERATIONS RESEARCH & MANAGEMENT SCIENCE Annals of Operations Research Pub Date : 2024-08-30 DOI:10.1007/s10479-024-06230-y
Milad Elyasi, Ali Ekici, Başak Altan, Okan Örsan Özener
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引用次数: 0

摘要

我们研究了联合补货问题(Joint Replenishment Problem,JRP),该问题产生于对共享共同固定成本的多个物品进行协调补货的需求。即使在基本情况下,确定最优补货计划也是一个 NP-Hard(近乎苛刻)的问题。我们分析了间接分组策略下的联合补货计划,以及其带有运输能力、预算能力和物品运输兼容性等限制条件的变体。此外,我们还考虑了相关文献研究中强调的不确定性特征,如不完善的物品质量。我们提出了一种新颖的数学启发式方法,在使用线性整数模型解决固定周期时间问题的同时,确定最佳基本周期时间。所提出的方法非常灵活,能有效处理现实生活中的其他约束条件。基于广泛的计算研究,我们得出结论:对于间接分组策略下的基本设置,所提出的算法比文献中的基准算法平均高出 0.3%。对于附加限制的更复杂设置,我们提出的算法平均比基准算法优胜约 5%。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

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A matheuristic for the joint replenishment problem with and without resource constraints

We study the Joint Replenishment Problem (JRP), which arises from the need for coordinating the replenishment of multiple items that share a common fixed cost. Even in the basic setting, determining the optimal replenishment plan is an NP-Hard problem. We analyze both the JRP under indirect grouping policy and its variant with restrictions like transportation capacity, budget capacity, and item transportation compatibility. Additionally, we consider uncertainty characteristics such as imperfect item quality, as highlighted in related literature studies. We propose a novel matheuristic method that determines the best basic cycle time while addressing the problem with a fixed cycle time using a linear integer model. The proposed method is quite versatile to handle additional real-life constraints effectively. Based on an extensive computational study, we conclude that for the basic setting under indirect grouping policy, the proposed algorithm outperforms the benchmark algorithms in the literature by 0.3% on average. For more complicated settings with additional restrictions, our proposed algorithm outperforms the benchmark algorithm by around 5% on average.

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来源期刊
Annals of Operations Research
Annals of Operations Research 管理科学-运筹学与管理科学
CiteScore
7.90
自引率
16.70%
发文量
596
审稿时长
8.4 months
期刊介绍: The Annals of Operations Research publishes peer-reviewed original articles dealing with key aspects of operations research, including theory, practice, and computation. The journal publishes full-length research articles, short notes, expositions and surveys, reports on computational studies, and case studies that present new and innovative practical applications. In addition to regular issues, the journal publishes periodic special volumes that focus on defined fields of operations research, ranging from the highly theoretical to the algorithmic and the applied. These volumes have one or more Guest Editors who are responsible for collecting the papers and overseeing the refereeing process.
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