English

Semidefnite Relaxation Bounds for Indefinite Homogeneous Quadratic Optimization

Optimization and Control 2007-05-23 v1 Numerical Analysis

Abstract

In this paper we study the relationship between the optimal value of a homogeneous quadratic optimization problem and that of its Semidefinite Programming (SDP) relaxation. We consider two quadratic optimization models: (1) min{xCxxAkx1,xFn,k=0,1,...,m}\min \{x^* C x \mid x^* A_k x \ge 1, x\in\mathbb{F}^n, k=0,1,...,m\}; and (2) max{xCxxAkx1,xFn,k=0,1,...,m}\max \{x^* C x \mid x^* A_k x \le 1, x\in\mathbb{F}^n, k=0,1,...,m\}. If \emph{one} of AkA_k's is indefinite while others and CC are positive semidefinite, we prove that the ratio between the optimal value of (1) and its SDP relaxation is upper bounded by O(m2)O(m^2) when F\mathbb{F} is the real line R\mathbb{R}, and by O(m)O(m) when F\mathbb{F} is the complex plane C\mathbb{C}. This result is an extension of the recent work of Luo {\em et al.} \cite{LSTZ}. For (2), we show that the same ratio is bounded from below by O(1/logm)O(1/\log m) for both the real and complex case, whenever all but one of AkA_k's are positive semidefinite while CC can be indefinite. This result improves the so-called approximate S-Lemma of Ben-Tal {\em et al.} \cite{BNR02}. We also consider (2) with multiple indefinite quadratic constraints and derive a general bound in terms of the problem data and the SDP solution. Throughout the paper, we present examples showing that all of our results are essentially tight.

Keywords

Cite

@article{arxiv.math/0701070,
  title  = {Semidefnite Relaxation Bounds for Indefinite Homogeneous Quadratic Optimization},
  author = {Simai He and Zhi-Quan Luo and Jiawang Nie and Shuzhong Zhang},
  journal= {arXiv preprint arXiv:math/0701070},
  year   = {2007}
}