Exact Solutions of Some Nonconvex Quadratic Optimization Problems via SDP and SOCP Relaxations

被引：0

作者：

Sunyoung Kim

Masakazu Kojima

机构：

[1] Ewha Women's University,Department of Mathematics

[2] Tokyo Institute of Technology,Department of Mathematical and Computing Sciences

来源：

Computational Optimization and Applications | 2003年 / 26卷

关键词：

nonconvex quadratic optimization problem; semidefinite programming relaxation; second order cone programming relaxation; sparsity;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

We show that SDP (semidefinite programming) and SOCP (second order cone programming) relaxations provide exact optimal solutions for a class of nonconvex quadratic optimization problems. It is a generalization of the results by S. Zhang for a subclass of quadratic maximization problems that have nonnegative off-diagonal coefficient matrices of quadratic objective functions and diagonal coefficient matrices of quadratic constraint functions. A new SOCP relaxation is proposed for the class of nonconvex quadratic optimization problems by extracting valid quadratic inequalities for positive semidefinite cones. Its effectiveness to obtain optimal values is shown to be the same as the SDP relaxation theoretically. Numerical results are presented to demonstrate that the SOCP relaxation is much more efficient than the SDP relaxation.

引用

页码：143 / 154

页数：11

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