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On reduction of duality gap in quadratic knapsack problems

机译:关于减少二次背包问题对偶间隙的研究

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摘要

We investigate in this paper the duality gap between quadratic knapsack problem and its Lagrangian dual or semidefinite programming relaxation. We characterize the duality gap by a distance measure from set {0, 1 }~n to certain polyhedral set and demonstrate that the duality gap can be reduced by an amount proportional to the square of the distance. We further discuss how to compute the distance measure via cell enumeration method and to derive the corresponding improved upper bound of the problem.
机译:我们在本文中研究二次背包问题与其拉格朗日对偶或半定规划松弛之间的对偶间隙。我们通过从集合{0,1}〜n到某些多面体集合的距离度量来表征对偶间隙,并证明对偶间隙可以减少与距离平方成正比的量。我们将进一步讨论如何通过单元枚举方法计算距离测度,以及如何得出问题的相应改进上限。

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  • 来源
    《Journal of Global Optimization》 |2012年第2期|p.325-339|共15页
  • 作者

    X. J. Zheng; X. L. Sun; D. Li; Y. F. Xu;

  • 作者单位

    School of Economics and Management, Tongji University, Shanghai 200092, People's Republic of China;

    Department of Management Science, School of Management, Fudan University, 670 Guoshun Road, Shanghai 200433, People's Republic of China;

    Department of Systems Engineering and Engineering Management, The Chinese University of Hong Kong, Shatin, NT, Hong Kong;

    Department of Management Science, School of Management, Fudan University, 670 Guoshun Road, Shanghai 200433, People's Republic of China;

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  • 正文语种 eng
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  • 关键词

    quadratic knapsack problem; lagrangian relaxation; SDP relaxation; duality gap; cell enumeration;

    机译:二次背包问题拉格朗日松弛SDP放松;二元性缺口单元枚举;

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