Probabilistic Set Covering Location Problem in Congested Networks

Robert Aboolian, O. Berman, Majidreza Karimi
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引用次数: 1

Abstract

This paper focuses on designing a facility network, taking into account that the system may be congested. The objective is to minimize the overall fixed and service capacity costs, subject to the constraints that for any demand the disutility from travel and waiting times (measured as the weighted sum of the travel time from a demand to the facility serving that demand and the average waiting time at the facility) cannot exceed a predefined maximum allowed level (measured in units of time). We develop an analytical framework for the problem that determines the optimal set of facilities and assigns each facility a service rate (service capacity). In our setting, the consumers would like to maximize their utility (minimize their disutility) when choosing which facility to patronize. Therefore, the eventual choice of facilities is a user-equilibrium problem, where at equilibrium, consumers do not have any incentive to change their choices. The problem is formulated as a nonlinear mixed-integer program. We show how to linearize the nonlinear constraints and solve instead a mixed-integer linear problem, which can be solved efficiently.
拥塞网络中的概率集覆盖定位问题
考虑到系统可能出现拥塞的情况,设计了一个设施网络。目标是使总固定容量和服务容量成本最小化,但要受到以下约束:对于任何需求,旅行和等待时间的负效用(以从需求到服务该需求的设施的旅行时间和在该设施的平均等待时间的加权总和来衡量)不能超过预定义的最大允许水平(以时间单位衡量)。我们为这个问题开发了一个分析框架,确定了最优的设施集合,并为每个设施分配了一个服务率(服务能力)。在我们的设置中,消费者希望在选择光顾哪个设施时最大化他们的效用(最小化他们的负效用)。因此,设施的最终选择是一个用户均衡问题,在均衡状态下,消费者没有任何动机去改变他们的选择。该问题被表述为一个非线性混合整数规划。我们展示了如何将非线性约束线性化,而不是求解一个混合整数线性问题,这可以有效地解决。
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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