Half thresholding eigenvalue algorithm for semidefinite matrix completion

The semidefinite matrix completion（SMC） problem is to recover a low-rank positive semidefinite matrix from a small subset of its entries. It is well known but NP-hard in general. We first show that under some cases, SMC problem and S1/2relaxation model share a unique solution. Then we prove that the...

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Vydáno v:	Science China. Mathematics Ročník 58; číslo 9; s. 2015 - 2032
Hlavní autoři:	Chen, YongQiang, Luo, ZiYan, Xiu, NaiHua
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	Beijing Science China Press 01.09.2015
Témata:	Algorithms Applications of Mathematics Convergence Eigenvalues Iterative methods Mathematical models Mathematics Mathematics and Statistics Optimization Regularization Robustness 全局最优解半正定矩阵参赛作品对称矩阵收敛性分析特征值算法阈值 semidefinite matrix completion convergence relaxation 90C06 half thresholding eigenvalue algorithm 90C26 90C59
ISSN:	1674-7283, 1869-1862
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Shrnutí:	The semidefinite matrix completion（SMC） problem is to recover a low-rank positive semidefinite matrix from a small subset of its entries. It is well known but NP-hard in general. We first show that under some cases, SMC problem and S1/2relaxation model share a unique solution. Then we prove that the global optimal solutions of S1/2regularization model are fixed points of a symmetric matrix half thresholding operator. We give an iterative scheme for solving S1/2regularization model and state convergence analysis of the iterative sequence.Through the optimal regularization parameter setting together with truncation techniques, we develop an HTE algorithm for S1/2regularization model, and numerical experiments confirm the efficiency and robustness of the proposed algorithm.
Bibliografie:	semidefinite matrix completion;S1/2relaxation;half thresholding eigenvalue algorithm;conver-gence 11-5837/O1 The semidefinite matrix completion（SMC） problem is to recover a low-rank positive semidefinite matrix from a small subset of its entries. It is well known but NP-hard in general. We first show that under some cases, SMC problem and S1/2relaxation model share a unique solution. Then we prove that the global optimal solutions of S1/2regularization model are fixed points of a symmetric matrix half thresholding operator. We give an iterative scheme for solving S1/2regularization model and state convergence analysis of the iterative sequence.Through the optimal regularization parameter setting together with truncation techniques, we develop an HTE algorithm for S1/2regularization model, and numerical experiments confirm the efficiency and robustness of the proposed algorithm. ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 23
ISSN:	1674-7283 1869-1862
DOI:	10.1007/s11425-015-5052-y