A robust algorithm for quadratic optimization under quadratic constraints

被引:15
|
作者
Tuy, Hoang [1 ]
Hoai-Phuong, N. T. [1 ]
机构
[1] Inst Math, Hanoi, Vietnam
来源
JOURNAL OF GLOBAL OPTIMIZATION | 2007年 / 37卷 / 04期
关键词
nonconvex global optimization; quadratic optimization under quadratic constraints; branch-reduce-and-bound successive incumbent transcending algorithm; essential optimal solution; robust solution;
D O I
10.1007/s10898-006-9063-7
中图分类号
C93 [管理学]; O22 [运筹学];
学科分类号
070105 ; 12 ; 1201 ; 1202 ; 120202 ;
摘要
Most existing methods of quadratically constrained quadratic optimization actually solve a refined linear or convex relaxation of the original problem. It turned out, however, that such an approach may sometimes provide an infeasible solution which cannot be accepted as an approximate optimal solution in any reasonable sense. To overcome these limitations a new approach is proposed that guarantees a more appropriate approximate optimal solution which is also stable under small perturbations of the constraints.
引用
收藏
页码:557 / 569
页数:13
相关论文
共 50 条
  • [41] Semidefinite relaxation approximation for multivariate bi-quadratic optimization with quadratic constraints
    Ling, Chen
    Zhang, Xinzhen
    Qi, Liqun
    NUMERICAL LINEAR ALGEBRA WITH APPLICATIONS, 2012, 19 (01) : 113 - 131
  • [42] A partial ellipsoidal approximation scheme for nonconvex homogeneous quadratic optimization with quadratic constraints
    Zhuoyi Xu
    Linbin Li
    Yong Xia
    Mathematical Methods of Operations Research, 2023, 98 : 93 - 109
  • [43] Semidefinite relaxation bounds for bi-quadratic optimization problems with quadratic constraints
    Xinzhen Zhang
    Chen Ling
    Liqun Qi
    Journal of Global Optimization, 2011, 49 : 293 - 311
  • [44] Semidefinite relaxation bounds for bi-quadratic optimization problems with quadratic constraints
    Zhang, Xinzhen
    Ling, Chen
    Qi, Liqun
    JOURNAL OF GLOBAL OPTIMIZATION, 2011, 49 (02) : 293 - 311
  • [45] A partial ellipsoidal approximation scheme for nonconvex homogeneous quadratic optimization with quadratic constraints
    Xu, Zhuoyi
    Li, Linbin
    Xia, Yong
    MATHEMATICAL METHODS OF OPERATIONS RESEARCH, 2023, 98 (01) : 93 - 109
  • [46] Control of a Selective Power Compensator by means of an optimization algorithm subject to quadratic constraints
    Alfonso-Gil, J. C.
    Arino, C.
    Perez, E.
    Beltran, H.
    REVISTA IBEROAMERICANA DE AUTOMATICA E INFORMATICA INDUSTRIAL, 2015, 12 (01): : 13 - 24
  • [47] CONVERGENCE RATE OF AN OPTIMIZATION ALGORITHM FOR MINIMIZING QUADRATIC FUNCTIONS WITH SEPARABLE CONVEX CONSTRAINTS
    Kucera, Radek
    SIAM JOURNAL ON OPTIMIZATION, 2008, 19 (02) : 846 - 862
  • [48] A Rigorous Global Filtering Algorithm for Quadratic Constraints*
    Yahia Lebbah
    Claude Michel
    Michel Rueher
    Constraints, 2005, 10 : 47 - 65
  • [49] A Pivoting Algorithm with Box for Quadratic Programs Constraints
    Chen, Jing
    Liu, Hua
    PROCEEDINGS OF 2009 INTERNATIONAL CONFERENCE OF MANAGEMENT ENGINEERING AND INFORMATION TECHNOLOGY, VOLS 1 AND 2, 2009, : 870 - 872
  • [50] A rigorous global filtering algorithm for quadratic constraints
    Lebbah, Y
    Michel, C
    Rueher, M
    CONSTRAINTS, 2005, 10 (01) : 47 - 65
12345