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运筹学学报 >

2015 , Vol. 19 >Issue 2: 29 - 36

DOI: https://doi.org/10.15960/j.cnki.issn.1007-6093.2015.02.003

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线性半向量二层规划问题的全局优化方法

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  • 1. 长江大学信息与数学学院, 湖北荆州 434023; 2. 武汉大学数学与统计学院, 武汉 430072

收稿日期: 2014-08-29

  网络出版日期: 2015-06-15

基金资助

国家自然科学基金(Nos. 11201039, 71171150, 61273179)

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A global optimization method for solving the linear semivectorial bilevel programming problem

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  • 1. School of Information and Mathematics, Yangtze University, Jingzhou 434023, Hubei, China; 2. School of Mathematics and Statistics, Wuhan University, Wuhan 430072, China

Received date: 2014-08-29

  Online published: 2015-06-15

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摘要

研究了线性半向量二层规划问题的全局优化方法. 利用下层问题的对偶间隙构造了线性半向量二层规划问题的罚问题, 通过分析原问题的最优解与罚问题可行域顶点之间的关系, 将线性半向量二层规划问题转化为有限个线性规划问题, 从而得到线性半向量二层规划问题的全局最优解. 数值结果表明所设计的全局优化方法对线性半向量二层规划问题是可行的.

关键词: 半向量二层规划; 对偶; 罚函数; 全局最优解

本文引用格式

吕一兵, 万仲平 . 线性半向量二层规划问题的全局优化方法[J]. 运筹学学报, 2015 , 19(2) : 29 -36 . DOI: 10.15960/j.cnki.issn.1007-6093.2015.02.003

Abstract

In this paper, we are concerned with global optimization approach for solving the linear semivectorial bilevel programming (LSBP) problem. Using the duality gap of the lower level programs, we construct the corresponding penalized problem. By analyzing the relationships between the optimal solutions of the original problem and the vertices of the feasible region of the penalized problem, we transform the LSBP problem to a series of linear programming problems. Then, the global optimal solution of the LSBP problem can be obtained by solving a series of linear programming problems. The numerical results show that the algorithm proposed is feasible to the LSBP problem.

Key words: semivectorial bilevel programming; duality; penalty function; global optimization solution

参考文献

滕春贤, 李智慧. 二层规划的理论与应用 [M]. 北京: 科学出版社, 2002.


Dempe S. Annotated bibliography on bilevel programming and mathematical programs with equilibrium constraints [J]. Optimization, 2003, 52: 333-359.
 
Colson B, Marcotte P, Savard G. An overview of bilevel optimization [J]. Annals of Operations Research, 2007, 153: 235-256.

王广民, 万仲平, 王先甲. 二(双)层规划综述 [J]. 数学进展, 2007, 36: 513-529.

黄正海, 林贵华, 修乃华. 变分不等式与互补问题、双层规划与平衡约束数学规划问题的若干进展 [J]. 运筹学学报, 2014, 18(1): 113-133.
 
Bonnel H. Optimality conditions for the semivectorial bilevel optimization problem [J]. Pacific Journal of Optimization, 2006, 2: 447-467.
 
Bonnel H, Morgan J. Semivectorial bilevel optimization problem: Penalty approach [J]. Journal of Optimization Theory and Applications, 2006, 131(3): 365-382.
 
Dempe S, Gadhi N, Zemkoho A B. New optimality condition for the semivectorial bilevel optimization problem [J]. Journal of Optimization Theory and Applications, 2013, 157: 54-74.
 
Ankhili Z, Mansouri A. An exact penalty on bilevel programs with linear vector optimization lower level [J]. European Journal of Operations Research, 2009, 197: 36-41.
 
Zheng Y, Wan Z. A solution method for semivectorial bilevel programming problem via penalty method [J]. Journal of Applied Mathematics and Computing, 2011, 37: 207-219.
 
吕一兵, 洪志明, 万仲平. 一类弱线性二层多目标规划问题的罚函数方法 [J]. 数学杂志, 2013, 33(3): 465-472.

Lv Y, Wan Z. A solution method for the optimistic linear semivectorial bilevel optimization problem [J]. Journal of Inequalities and Applications, 2014, 2014: 164.

Eichfelder G. Multiobjective bilevel optimization [J]. Mathematical Programming, 2010, 123: 419-449.

林锉云, 董加礼. 多目标优化的方法与理论 [M]. 长春: 吉林教育出版社, 1992.
 
Calvete H I, Gale C. On linear bilevel problems with multiple objectives at the lower level [J]. Omega, 2011, 39: 33-40.

 
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