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A FEASIBLE DIRECTION ALGORITHM WITHOUT LINE SEARCH FOR SOLVING MAX-BISECTION PROBLEMS 被引量:3

A FEASIBLE DIRECTION ALGORITHM WITHOUT LINE SEARCH FOR SOLVING MAX-BISECTION PROBLEMS
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摘要 This paper concerns the solution of the NP-hard max-bisection problems. NCP functions are employed to convert max-bisection problems into continuous nonlinear programming problems. Solving the resulting continuous nonlinear programming problem generates a solution that gives an upper bound on the optimal value of the max-bisection problem. From the solution, the greedy strategy is used to generate a satisfactory approximate solution of the max-bisection problem. A feasible direction method without line searches is proposed to solve the resulting continuous nonlinear programming, and the convergence of the algorithm to KKT point of the resulting problem is proved. Numerical experiments and comparisons on well-known test problems, and on randomly generated test problems show that the proposed method is robust, and very efficient. This paper concerns the solution of the NP-hard max-bisection problems. NCP functions are employed to convert max-bisection problems into continuous nonlinear programming problems. Solving the resulting continuous nonlinear programming problem generates a solution that gives an upper bound on the optimal value of the max-bisection problem. From the solution, the greedy strategy is used to generate a satisfactory approximate solution of the max-bisection problem. A feasible direction method without line searches is proposed to solve the resulting continuous nonlinear programming, and the convergence of the algorithm to KKT point of the resulting problem is proved. Numerical experiments and comparisons on well-known test problems, and on randomly generated test problems show that the proposed method is robust, and very efficient.
作者 Feng-min Xu Cheng-xian Xu Hong-gang Xue
机构地区 Department of Mathematics of Faculty of Science
出处 《Journal of Computational Mathematics》 SCIE EI CSCD 2005年第6期619-634,共16页 计算数学(英文)
关键词 Max-Bisection problem Feasible direction algorithm NCP function CONVERGENCE Max-Bisection problem, Feasible direction algorithm, NCP function, Convergence
分类号 O221.2 [理学—运筹学与控制论]
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参考文献15

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同被引文献17

  • 1于力,刘三阳,王新辉.非负权图的最大二等分问题的0.488算法[J].工程数学学报,2005,22(6):1137-1140. 被引量:3
  • 2Frieze A, Jerrum M. Improved approximation algorithm for max k-cut and max-bisection[J]. Algorithmica, 1997, 18:67-81.
  • 3Goemans M X, Williamson D P. Improved approximation algorithms for maximum cut and satisfiability problems using semidefinite programming[J]. J Assoc Comput Math, 1995, 42(6): 1115-1145.
  • 4Ye Y. A 0.699-approximation algorithm for max-bisection[J]. Mathematical Programming, 2001, 90: 101- 111.
  • 5穆学文,刘红卫,刘三阳.图的最大二等分问题的低秩可行方向算法[J].系统科学与数学,2007,27(5):780-790. 被引量:3
  • 6Murty K G,Kabadi S N.Some NP-complete problems in quadratic and nonlinear programming[J].Mathematical Programming,1987,39(2):117-129.
  • 7Frieze A,Jerrum M.Improved approximation algorithm for max k-cut and max-bisection[J].Algorithmica,1997,18 (1):67-81.
  • 8Ye Y Y.A.699-approximation algorithm for max-bisection[J].Math Program,2001,90(1):101-111.
  • 9Halperin E,Zwick U.A unified framework for obtaining improved approximation algorithms for maximum graph bisection problems[J].Random Structures and Algorithms,2002,20 (3):382-402.
  • 10Ling A F,Xu C X,Tang L.A modified VNS metaheuristic for max-bisection problems[J].Journal of Computational and Applied Mathematics,2008,220(1/2):413-421.

引证文献3

二级引证文献1

Journal of Computational Mathematics
2005年 第6期

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