A PARAMETRIC APPROACH TO SOLVING BICRITERION SHORTEST-PATH PROBLEMS

被引:89
|
作者
MOTE, J
MURTHY, I
OLSON, DL
机构
[1] LOUISIANA STATE UNIV,DEPT QUANTITAT BUSINESS ANAL,BATON ROUGE,LA 70803
[2] TEXAS A&M UNIV SYST,DEPT BUSINESS ANAL,COLLEGE STN,TX 77843
来源
EUROPEAN JOURNAL OF OPERATIONAL RESEARCH | 1991年 / 53卷 / 01期
关键词
MULTIPLE OBJECTIVE; NETWORKS; SHORTEST PATH;
D O I
10.1016/0377-2217(91)90094-C
中图分类号
C93 [管理学];
学科分类号
12 ; 1201 ; 1202 ; 120202 ;
摘要
In this paper a new algorithm is developed to solve bicriterion shortest path problems (BSP). This algorithm first relaxes the integrality conditions and solves a simple bicriterion network problem. The bicriterion network problem is solved parametrically, exploiting properties associated with adjacent basis trees. Those Pareto-optimal paths not obtained by solving the LP relaxation are obtained using a label correcting procedure. Computational results comparing the parametric approach to the label setting approach and the K-th shortest path approach are also presented. They indicate that the parametric approach is orders of magnitude faster than the K-th shortest path approach for most problems tested. For problems with a positive correlation between the two cost coefficients, the parametric approach is seen to be significantly faster than the label setting approach.
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页码:81 / 92
页数:12
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