Formulations and branch-and-cut algorithms for the heterogeneous fleet vehicle routing problem with soft time deadlines

IF 5.8 1区 工程技术 Q1 ECONOMICS
Yulin Han, Hande Yaman
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引用次数: 0

Abstract

This paper investigates a variant of the heterogeneous fleet vehicle routing problem (HVRP) that incorporates soft time deadlines for customers and allows for tardiness at penalty costs. Distinct vehicle types feature varying fixed usage costs and utilize different road networks, resulting in differences in both travel times and travel costs. The objective is to optimize fleet assignment and vehicle service routes to minimize the total fixed vehicle usage costs, routing variable costs, and tardiness costs, while ensuring each customer is visited exactly once and respecting route duration limits. To address this problem, we introduce three compact formulations: the Miller-Tucker-Zemlin formulation (MTZF), single-commodity flow formulation (SCFF), and two-commodity flow formulation (TCFF), comparing their linear programming (LP) relaxations. Additionally, we propose two new families of valid inequalities, in conjunction with generalized subtour elimination constraints, to strengthen these LP relaxations, integrating them into branch-and-cut solution schemes. The theoretical results on the comparison of formulations and the validity of the proposed inequalities hold also for other HVRPs with limited route duration. Computational experiments demonstrate the superior performance of SCFF and TCFF over MTZF, the effectiveness of the proposed valid inequalities in tightening formulations, and the enhanced computational efficiency achieved by incorporating them. Finally, we explore the impact of depot relocation, varying degrees of urgency in customer requests, and varying fixed vehicle usage costs on optimal solutions.
具有软时间期限的异构车队车辆路由问题的公式和分支切割算法
本文研究了异构车队车辆路由选择问题(HVRP)的一种变体,它包含了客户的软时间期限,并允许迟到者支付罚金。不同类型的车辆具有不同的固定使用成本,并使用不同的道路网络,从而导致旅行时间和旅行成本的差异。我们的目标是优化车队分配和车辆服务路线,使车辆固定使用成本、路线可变成本和迟到成本的总和最小化,同时确保每个客户只访问一次,并遵守路线持续时间限制。为解决这一问题,我们引入了三种紧凑型公式:米勒-塔克-泽姆林公式(MTZF)、单商品流公式(SCFF)和双商品流公式(TCFF),并比较了它们的线性规划(LP)松弛。此外,我们还提出了两个新的有效不等式系列,结合广义子路消除约束来加强这些 LP 放松,并将它们集成到分支切割求解方案中。关于公式比较和所提不等式有效性的理论结果同样适用于其他具有有限路径持续时间的 HVRP。计算实验证明了 SCFF 和 TCFF 比 MTZF 更优越的性能、所提出的有效不等式在收紧公式方面的有效性,以及通过将它们纳入公式所实现的更高计算效率。最后,我们探讨了车厂搬迁、客户请求的不同紧急程度以及不同的固定车辆使用成本对最优解的影响。
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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来源期刊
Transportation Research Part B-Methodological
Transportation Research Part B-Methodological 工程技术-工程:土木
CiteScore
12.40
自引率
8.80%
发文量
143
审稿时长
14.1 weeks
期刊介绍: Transportation Research: Part B publishes papers on all methodological aspects of the subject, particularly those that require mathematical analysis. The general theme of the journal is the development and solution of problems that are adequately motivated to deal with important aspects of the design and/or analysis of transportation systems. Areas covered include: traffic flow; design and analysis of transportation networks; control and scheduling; optimization; queuing theory; logistics; supply chains; development and application of statistical, econometric and mathematical models to address transportation problems; cost models; pricing and/or investment; traveler or shipper behavior; cost-benefit methodologies.
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