Abstract
Matrix rank minimization problem is in general NP-hard. The nuclear norm is used to substitute the rank function in many recent studies. Nevertheless, the nuclear norm approximation adds all singular values together and the approximation error may depend heavily on the magnitudes of singular values. This might restrict its capability in dealing with many practical problems. In this paper, an arctangent function is used as a tighter approximation to the rank function. We use it on the challenging subspace clustering problem. For this nonconvex minimization problem, we develop an effective optimization procedure based on a type of augmented Lagrange multipliers (ALM) method. Extensive experiments on face clustering and motion segmentation show that the proposed method is effective for rank approximation.
| Original language | English |
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| Title of host publication | CIKM 2015 - Proceedings of the 24th ACM International Conference on Information and Knowledge Management |
| Pages | 393-401 |
| Number of pages | 9 |
| ISBN (Electronic) | 9781450337946 |
| DOIs | |
| State | Published - Oct 17 2015 |
| Event | 24th ACM International Conference on Information and Knowledge Management, CIKM 2015 - Melbourne, Australia Duration: Oct 19 2015 → Oct 23 2015 |
Publication series
| Name | International Conference on Information and Knowledge Management, Proceedings |
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| Volume | 19-23-Oct-2015 |
Conference
| Conference | 24th ACM International Conference on Information and Knowledge Management, CIKM 2015 |
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| Country/Territory | Australia |
| City | Melbourne |
| Period | 10/19/15 → 10/23/15 |
Bibliographical note
Publisher Copyright:© 2015 ACM.
Keywords
- Nonconvex optimization
- Nuclear norm
- Rank minimization
- Subspace clustering
ASJC Scopus subject areas
- General Decision Sciences
- General Business, Management and Accounting