Using infeasible path cuts to solve Electric Vehicle Routing Problems with realistic charging functions exactly within a branch-and-cut framework

IF 2.1 Q2 OPERATIONS RESEARCH & MANAGEMENT SCIENCE
Arne Schulz
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引用次数: 0

Abstract

The paper investigates the Electric Vehicle Routing Problem with a non-linear concave and strictly monotonic increasing charging function. In the literature, the non-linear charging function is typically approximated by a piecewise linear charging function which does not overestimate the real charging function in any point. As the piecewise linear charging function underestimates the real state-of-charge in some points, such an approximation excludes feasible solutions from the solution space. To overcome this drawback we introduce a new method to determine a piecewise linear charging function overestimating the real charging function in a way that the area between both functions is minimized as well as an adaptation of a known linearization to include the piecewise linear charging function in a branch-and-cut approach. Thereby, we include infeasible solutions in the solution space. To declare them infeasible again we check every integer solution obtained in the branch-and-cut procedure and add an infeasible path cut if the solution is infeasible for the real charging function such that the procedure terminates with an optimal solution for the real charging function. Our approach is evaluated in a computational study in which instances with up to 100 customers were solved to optimality. Moreover, we evaluate the trade-off between a more complex model formulation due to more binary variables if the number of supporting points for the piecewise linear approximation is increased and the higher approximation error if fewer supporting points are used.

利用不可行路径切割,在分支切割框架内精确解决具有现实充电功能的电动汽车路由问题
本文研究了充电函数为非线性凹陷且严格单调递增的电动汽车路由问题。在文献中,非线性充电函数通常用片断线性充电函数来近似,该函数不会高估任何一点的实际充电函数。由于分片线性充电函数会低估某些点的实际充电状态,因此这种近似方法会将可行解排除在解空间之外。为了克服这一缺点,我们引入了一种新方法来确定一个高估实际充电函数的分片线性充电函数,使两个函数之间的面积最小,同时对已知的线性化方法进行调整,将分片线性充电函数纳入分支切割法中。因此,我们在求解空间中加入了不可行解。为了再次宣布它们不可行,我们会检查在分支-切割过程中获得的每个整数解,如果该解对实际充电函数不可行,则添加一个不可行路径切割,从而使该过程以实际充电函数的最优解结束。我们在一项计算研究中对我们的方法进行了评估,在这项研究中,多达 100 个客户的实例得到了最优解。此外,我们还评估了如果增加片断线性近似的支持点数量,由于二进制变量增多而导致模型表述更加复杂,以及如果使用较少的支持点,近似误差增大这两者之间的权衡。
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
CiteScore
4.60
自引率
0.00%
发文量
24
审稿时长
129 days
期刊介绍: The EURO Journal on Transportation and Logistics promotes the use of mathematics in general, and operations research in particular, in the context of transportation and logistics. It is a forum for the presentation of original mathematical models, methodologies and computational results, focussing on advanced applications in transportation and logistics. The journal publishes two types of document: (i) research articles and (ii) tutorials. A research article presents original methodological contributions to the field (e.g. new mathematical models, new algorithms, new simulation techniques). A tutorial provides an introduction to an advanced topic, designed to ease the use of the relevant methodology by researchers and practitioners.
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