Expected shortest paths in dynamic and stochastic traffic networks

被引:199
作者
Fu, LP [1 ]
Rilett, LR
机构
[1] Univ Waterloo, Dept Civil Engn, Waterloo, ON N2L 3G1, Canada
[2] Texas A&M Univ, Dept Civil Engn, College Stn, TX 77843 USA
关键词
shortest path problem; dynamic and stochastic network; k-shortest path problem; traffic network; Intelligent Transportation Systems; Route Guidance Systems;
D O I
10.1016/S0191-2615(98)00016-2
中图分类号
F [经济];
学科分类号
02 ;
摘要
The dynamic and stochastic shortest path problem (DSSPP) is defined as finding the expected shortest path in a traffic network where the link travel times are modeled as a continuous-time stochastic process. The objective of this paper is to examine the properties of the problem and to identify a technique that can be used to solve the DSSPP given information that will be available in networks with Intelligent Transportation System (ITS) capabilities. The paper first identifies a set of relationships between the mean and variance of the travel time of a given path and the mean and variance of the dynamic and stochastic link travel times on these networks. Based on these relationships it is shown that the DSSPP is computationally intractable and traditional shortest path algorithms cannot guarantee an optimal solution. A heuristic algorithm based on the k-shortest path algorithm is subsequently proposed to solve the problem. Lastly, the trade-off between solution quality and computational efficiency of the proposed algorithm is demonstrated on a realistic network from Edmonton, Alberta. (C) 1998 Elsevier Science Ltd. All rights reserved.
引用
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页码:499 / 516
页数:18
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