Robust tensor factorization using maximum correntropy criterion

Miaohua Zhang; Yongsheng Gao; Changming Sun; John La Salle; Junli Liang

doi:10.1109/ICPR.2016.7900290

Robust tensor factorization using maximum correntropy criterion

Miaohua Zhang, Yongsheng Gao, Changming Sun, John La Salle, Junli Liang

School of Electronics and Information

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

5 Scopus citations

Abstract

Traditional tensor decomposition methods, e.g., two dimensional principle component analysis (2DPCA) and two dimensional singular value decomposition (2DSVD), minimize mean square errors (MSE) and are sensitive to outliers. In this paper, we propose a new robust tensor factorization method using maximum correntropy criterion (MCC) to improve the robustness of traditional tensor decomposition methods. A half-quadratic optimization algorithm is adopted to effectively optimize the correntropy objective function in an iterative manner. It can effectively improve the robustness of a tensor decomposition method to outliers without introducing any extra computational cost. Experimental results demonstrated that the proposed method significantly reduces the reconstruction error on face reconstruction and improves the accuracy rate on handwritten digit recognition.

Original language	English
Title of host publication	2016 23rd International Conference on Pattern Recognition, ICPR 2016
Publisher	Institute of Electrical and Electronics Engineers Inc.
Pages	4184-4189
Number of pages	6
ISBN (Electronic)	9781509048472
DOIs	https://doi.org/10.1109/ICPR.2016.7900290
State	Published - 1 Jan 2016
Event	23rd International Conference on Pattern Recognition, ICPR 2016 - Cancun, Mexico Duration: 4 Dec 2016 → 8 Dec 2016

Publication series

Name	Proceedings - International Conference on Pattern Recognition
Volume	0
ISSN (Print)	1051-4651

Conference

Conference	23rd International Conference on Pattern Recognition, ICPR 2016
Country/Territory	Mexico
City	Cancun
Period	4/12/16 → 8/12/16

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10.1109/ICPR.2016.7900290

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Zhang, M., Gao, Y., Sun, C., La Salle, J., & Liang, J. (2016). Robust tensor factorization using maximum correntropy criterion. In 2016 23rd International Conference on Pattern Recognition, ICPR 2016 (pp. 4184-4189). Article 7900290 (Proceedings - International Conference on Pattern Recognition; Vol. 0). Institute of Electrical and Electronics Engineers Inc.. https://doi.org/10.1109/ICPR.2016.7900290

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title = "Robust tensor factorization using maximum correntropy criterion",

abstract = "Traditional tensor decomposition methods, e.g., two dimensional principle component analysis (2DPCA) and two dimensional singular value decomposition (2DSVD), minimize mean square errors (MSE) and are sensitive to outliers. In this paper, we propose a new robust tensor factorization method using maximum correntropy criterion (MCC) to improve the robustness of traditional tensor decomposition methods. A half-quadratic optimization algorithm is adopted to effectively optimize the correntropy objective function in an iterative manner. It can effectively improve the robustness of a tensor decomposition method to outliers without introducing any extra computational cost. Experimental results demonstrated that the proposed method significantly reduces the reconstruction error on face reconstruction and improves the accuracy rate on handwritten digit recognition.",

author = "Miaohua Zhang and Yongsheng Gao and Changming Sun and {La Salle}, John and Junli Liang",

note = "Publisher Copyright: {\textcopyright} 2016 IEEE.; 23rd International Conference on Pattern Recognition, ICPR 2016 ; Conference date: 04-12-2016 Through 08-12-2016",

year = "2016",

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doi = "10.1109/ICPR.2016.7900290",

language = "英语",

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Zhang, M, Gao, Y, Sun, C, La Salle, J & Liang, J 2016, Robust tensor factorization using maximum correntropy criterion. in 2016 23rd International Conference on Pattern Recognition, ICPR 2016., 7900290, Proceedings - International Conference on Pattern Recognition, vol. 0, Institute of Electrical and Electronics Engineers Inc., pp. 4184-4189, 23rd International Conference on Pattern Recognition, ICPR 2016, Cancun, Mexico, 4/12/16. https://doi.org/10.1109/ICPR.2016.7900290

Robust tensor factorization using maximum correntropy criterion. / Zhang, Miaohua; Gao, Yongsheng; Sun, Changming et al.
2016 23rd International Conference on Pattern Recognition, ICPR 2016. Institute of Electrical and Electronics Engineers Inc., 2016. p. 4184-4189 7900290 (Proceedings - International Conference on Pattern Recognition; Vol. 0).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

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T1 - Robust tensor factorization using maximum correntropy criterion

AU - Zhang, Miaohua

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AU - La Salle, John

AU - Liang, Junli

PY - 2016/1/1

Y1 - 2016/1/1

N2 - Traditional tensor decomposition methods, e.g., two dimensional principle component analysis (2DPCA) and two dimensional singular value decomposition (2DSVD), minimize mean square errors (MSE) and are sensitive to outliers. In this paper, we propose a new robust tensor factorization method using maximum correntropy criterion (MCC) to improve the robustness of traditional tensor decomposition methods. A half-quadratic optimization algorithm is adopted to effectively optimize the correntropy objective function in an iterative manner. It can effectively improve the robustness of a tensor decomposition method to outliers without introducing any extra computational cost. Experimental results demonstrated that the proposed method significantly reduces the reconstruction error on face reconstruction and improves the accuracy rate on handwritten digit recognition.

AB - Traditional tensor decomposition methods, e.g., two dimensional principle component analysis (2DPCA) and two dimensional singular value decomposition (2DSVD), minimize mean square errors (MSE) and are sensitive to outliers. In this paper, we propose a new robust tensor factorization method using maximum correntropy criterion (MCC) to improve the robustness of traditional tensor decomposition methods. A half-quadratic optimization algorithm is adopted to effectively optimize the correntropy objective function in an iterative manner. It can effectively improve the robustness of a tensor decomposition method to outliers without introducing any extra computational cost. Experimental results demonstrated that the proposed method significantly reduces the reconstruction error on face reconstruction and improves the accuracy rate on handwritten digit recognition.

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ER -

Robust tensor factorization using maximum correntropy criterion

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