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物流运输网络模糊最短路径的偏好解

韩世莲 李旭宏 刘新旺

韩世莲, 李旭宏, 刘新旺. 物流运输网络模糊最短路径的偏好解[J]. 交通运输工程学报, 2005, 5(2): 122-126.
引用本文: 韩世莲, 李旭宏, 刘新旺. 物流运输网络模糊最短路径的偏好解[J]. 交通运输工程学报, 2005, 5(2): 122-126.
HAN Shi-lian, LI Xu-hong, LIU Xin-wang. Preference solution of fuzzy shortest path in logistics transportation networks[J]. Journal of Traffic and Transportation Engineering, 2005, 5(2): 122-126.
Citation: HAN Shi-lian, LI Xu-hong, LIU Xin-wang. Preference solution of fuzzy shortest path in logistics transportation networks[J]. Journal of Traffic and Transportation Engineering, 2005, 5(2): 122-126.

物流运输网络模糊最短路径的偏好解

基金项目: 

国家自然科学基金项目 70301010

详细信息
    作者简介:

    韩世莲(1970-), 女, 山西祁县人, 东南大学博士研究生, 从事物流工程研究

  • 中图分类号: U491.1

Preference solution of fuzzy shortest path in logistics transportation networks

More Information
    Author Bio:

    Han Shi-lian(1970-), female, doctoral student, 86-25-83795284, hsl70@163.com

  • 摘要: 考虑到物流运输网络中存在的不确定性, 针对弧长为模糊数的最短路问题, 提出了基于加权函数重心法的模糊数排序方法, 根据标号法得到网络中从某一指定节点到其他节点的与偏好信息相一致的最短路。该排序方法提供了决策偏好信息的参数化表示, 决策者通过设定极大熵加权函数表示的悲观或乐观水平, 就可以得到与目前偏好结构相一致的模糊数排序结果, 以及相应的模糊最短路权值和选择方案。计算结果显示, 在不同的偏好参数下, 决策者得到的最短路方案是不同的, 而且计算结果与设定的偏好完全一致。

     

  • 图  1  模糊最短路

    Figure  1.  Fuzzy shortest path

    表  1  最短路计算过程

    Table  1.   Computational process of shortest paths

    K iGs jGu 全部距离Fj(i) Vf[Fj(i)] n个最近节点 最小距离Rj 最后连接
    1 O A (68, 88, 103) 86.33 B (52, 60, 70) OB
    O B (52, 60, 70) 60.67
    2 O A (68, 88, 103) 86.33 A (68, 88, 103) OA
    B C (97, 120, 148) 121.67
    B D (169, 205, 235) 203.00
    3 A C (88, 123, 153) 121.33 C (88, 123, 153) AC
    B C (97, 120, 148) 121.67
    B D (169, 205, 235) 203.00
    4 C D (158, 203, 241) 200.67 D (158, 203, 241) CD
    C T (218, 263, 308) 263.00
    B D (169, 205, 235) 203.00
    5 C T (218, 263, 308) 263.00 T (218, 263, 308) CT
    D T (222, 270, 316) 269.00
    下载: 导出CSV

    表  2  不同决策态度下的最短路计算结果

    Table  2.   Shortest paths with different decision attitudes

    Ωf 最短路距离 最短距离估计值 最短路径
    0.1 (213, 273, 321) 234.09 OACDT
    0.3 (218, 263, 308) 253.27 OACT
    0.5 (218, 263, 308) 263.00 OACT
    0.7 (227, 260, 303) 271.87 OBCT
    0.9 (227, 260, 303) 288.14 OBCT
    下载: 导出CSV
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出版历程
  • 收稿日期:  2004-12-02
  • 刊出日期:  2005-06-25

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