Non-convex quadratic minimization problems with quadratic constraints: global optimality conditions

被引:0
作者
V. Jeyakumar
A. M. Rubinov
Z. Y. Wu
机构
[1] University of New South Wales,Department of Applied Mathematics
[2] University of Ballarat,School of Information Technology and Mathematical Sciences
[3] Chongqing Normal University,Department of Mathematics
来源
Mathematical Programming | 2007年 / 110卷
关键词
Non-convex quadratic minimization; Global optimality conditions; Lagrange multipliers; Quadratic inequality constraints; Binary constraints; 41A65; 41A29; 90C30;
D O I
暂无
中图分类号
学科分类号
摘要
In this paper, we first examine how global optimality of non-convex constrained optimization problems is related to Lagrange multiplier conditions. We then establish Lagrange multiplier conditions for global optimality of general quadratic minimization problems with quadratic constraints. We also obtain necessary global optimality conditions, which are different from the Lagrange multiplier conditions for special classes of quadratic optimization problems. These classes include weighted least squares with ellipsoidal constraints, and quadratic minimization with binary constraints. We discuss examples which demonstrate that our optimality conditions can effectively be used for identifying global minimizers of certain multi-extremal non-convex quadratic optimization problems.
引用
收藏
页码:521 / 541
页数:20
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