模糊需求下时间依赖型车辆路径优化

范厚明; 李荡; 孔靓; 任晓雪

引用本文:	范厚明,李荡,孔靓,任晓雪.模糊需求下时间依赖型车辆路径优化[J].控制理论与应用,2020,37(5):950~960.[点击复制]
	FAN Hou-ming,LI Dang,KONG Liang,REN Xiao-xue.Optimization for time dependent vehicle routing problem with fuzzy demand[J].Control Theory and Technology,2020,37(5):950~960.[点击复制]

模糊需求下时间依赖型车辆路径优化

Optimization for time dependent vehicle routing problem with fuzzy demand

摘要点击 1582 全文点击 736 投稿时间：2019-05-09 修订日期：2019-09-13

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DOI编号 10.7641/CTA.2019.90330

2020,37(5):950-960

中文关键词车辆路径问题模糊需求时间依赖自适应大规模邻域搜索算法

英文关键词 vehicle routing problem fuzzy demand time dependent adaptive large neighborhood search algorithm

基金项目国家自然科学基金项目(61473053), 辽宁省重点研发计划指导计划项目(2018401002)资助.

作者	单位	E-mail
范厚明^*	大连海事大学交通运输工程学院	fhm468@163.com
李荡	大连海事大学交通运输工程学院
孔靓	大连海事大学交通运输工程学院
任晓雪	大连海事大学交通运输工程学院

中文摘要

针对客户需求模糊且有时间窗约束的时间依赖型车辆路径问题(TDVRP), 基于先预优化后重调度的思想构建模型. 在预优化阶段, 依据可信性理论构建模糊机会约束优化模型处理客户点模糊需求; 针对不同时间段道路的交通情况, 采用Ichoua速度时间依赖函数表征车辆的行驶速度, 并设计自适应大规模邻域搜索算法(ALNS)对其求解. 在重调度阶段, 应用随机模拟算法模拟客户点的真实需求, 采用点重调度策略对预优化方案进行调整. 通过改进的Solomon算例实验验证模型和算法的有效性. 研究成果可丰富TDVRP问题的相关研究, 为现实配送方案的优化决策提供理论依据.

英文摘要

The time dependent vehicle routing problem (TDVRP) with fuzzy demand and time window is solved according to the idea of pre-optimization and re-dispatch in this paper. In the pre-optimization stage, the fuzzy chance constrained optimization model was constructed on the basis of fuzzy credibility theory, the model insures that fuzzy demand of customers can participate in optimization. Besides, Ichoua speed time-dependent function was used to represent the driving speed of vehicles in different traffic conditions of roads and time periods in the problem formulation, an adaptive large neighborhood search algorithm (ALNS) is designed to obtain the pre-optimization scheme. In the re-dispatch stage, stochastic simulation algorithm was used to simulate the real demand of customer and re-dispatch strategy was adopted to adjust the pre-optimization scheme. The effectiveness of the model and algorithm is verified by an improved Solomon example. The research results can enrich the related research of TDVRP problem and provide theoretical basis for the optimization decision of realistic distribution scheme.