research-article

Robust and Discriminative Concept Factorization for Image Representation

Authors:

Qiang LiuAuthors Info & Claims

ICMR '15: Proceedings of the 5th ACM on International Conference on Multimedia Retrieval

Pages 115 - 122

https://doi.org/10.1145/2671188.2749317

Published: 22 June 2015 Publication History

Abstract

Concept Factorization (CF), as a variant of Nonnegative Matrix Factorization (NMF), has been widely used for learning compact representation for images because of its psychological and physiological interpretation of naturally occurring data. And graph regularization has been incorporated into the objective function of CF to exploit the intrinsic low-dimensional manifold structure, leading to better performance. But some shortcomings are shared by existing CF methods. 1) The squared loss used to measure the data reconstruction quality is sensitive to noise in image data. 2) The graph regularization may lead to trivial solution and scale transfer problems for CF such that the learned representation is meaningless. 3) Existing methods mostly ignore the discriminative information in image data. In this paper, we propose a novel method, called Robust and Discriminative Concept Factorization (RDCF) for image representation. Specifically, RDCF explicitly considers the influence of noise by imposing a sparse error matrix, and exploits the discriminative information by approximate orthogonal constraints which can also lead to nontrivial solution. We propose an iterative multiplicative updating rule for the optimization of RDCF and prove the convergence. Experiments on 5 benchmark image datasets show that RDCF can significantly out-perform several state-of-the-art related methods, which validates the effectiveness of RDCF.

References

[1]

M. Belkin, P. Niyogi, and V. Sindhwani. Manifold regularization: A geometric framework for learning from labeled and unlabeled examples. JMLR, 2006.

Digital Library

[2]

D. Cai, X. He, and J. Han. Locally consistent concept factorization for document clustering. IEEE Transactions on Knowledge and Data Engineering, 2011.

Digital Library

[3]

D. Cai, X. He, J. Han, and T. S. Huang. Graph regularized nonnegative matrix factorization for data representation. IEEE Transaction Pattern Anal. Mach. Intell., 2011.

Digital Library

[4]

E. Cands, X. Li, Y. Ma, and J. Wright. Robust principal component analysis? JACM, 2011.

Digital Library

[5]

Y. Chen, J. Zhang, D. Cai, W. Liu, and X. He. Nonnegative local coordinate factorization for image representation. IEEE Transactions on Image Processing, 2013.

Digital Library

[6]

A. P. Dempster, N. M. Laird, and D. B. Rubin. Maximum likelihood from incomplete data via the em algorithm. Journal of the Royal Statistical Society. Series B (Methodological), 39(1):1--38, 1977.

[7]

G. Ding, Y. Guo, and J. Zhou. collective matrix factorization hashing for multimodal data. In IEEE Conference on Computer Vision and Pattern Recognition, CVPR, 2014.

Digital Library

[8]

R. O. Duda, P. Hart, and D. Stork. Pattern classification. In Wiley-Interscience, Hoboken, NJ, 2nd edition, 2000.

Digital Library

[9]

J. Fan, Y. Gao, and H. Luo. Integrating concept ontology and multitask learning to achieve more effective classifier training for multilevel image annotation. TIP, 2008.

Digital Library

[10]

Q. Gu, C. Ding, and J. Han. On trivial solution and scale transfer problems in graph regularized nmf. In Proc. of 22nd International Joint Conference on Artificial Intelligence, 2011.

Digital Library

[11]

Q. Gu and J. Zhou. Co-clustering on manifolds. In Proc. of ACM SIGKDD, 2009.

Digital Library

[12]

Y. Guo, G. Ding, X. Jin, and J. Wang. Learning predictable and discriminative attributes for visual recognition. In AAAI Conference on Artificial Intelligence, 2015.

[13]

X. He. Laplacian regularized d-optimal design for active learning and its application to image retrieval. TIP, 2010.

Digital Library

[14]

P. O. Hoyer. Non-negative matrix factorization with sparseness constraints. Journal of Machine Learning Research, 5:1457--1469, 2004.

Digital Library

[15]

D. Kong, C. Ding, and H. Huang. Robust nonnegative matrix factorization using l21-norm. In CIKM, 2011.

Digital Library

[16]

D. D. Lee and H. S. Seung. Learning the parts of objects by nonnegative matrix factorization. In Nature, 1999.

[17]

D. D. Lee and H. S. Seung. Learning the parts of objects by nonnegative matrix factorization. In Advances in Neural Information Processing Systems, 2001.

[18]

H. Liu, Z. Yang, J. Yang, Z. Wu, and X. Li. Local coordinate concept factorization for image representation. IEEE Trans. Neural Netw. Learning Syst., 2014.

[19]

N. K. Logothetis and D. L. Sheinberg. Visual object recognition. Annual Review of Neuroscience, 19, 1996.

[20]

L. Lovasz and M. Plummer. Matching Theory, 1986.

[21]

D. Tao, X. Li, X. Wu, and S. J. Maybank. Geometric mean for subspace selection. TPAMI, 2009.

Digital Library

[22]

M. W. O. E. Wachsmuth and D. I. Perrett. Recognition of objects and their component parts: Responses of single units in the temporal cortex of the macaque. Cerebral Cortex, 4(5):509--522, 1994.

[23]

W. Xu and Y. Gong. Document clustering by concept factorization. In Proc. of ACM RDIR, 2004.

Digital Library

[24]

Y. Yang, H. Shen, F. Nie, R. Ji, and X. Zhou. Nonnegative spectral clustering with discriminative regularization. In Proc. of 25th AAAI, 2011.

[25]

Y. Yang, D. Xu, F. Nie, S. Yan, and Y. Zhuang. Image clustering using local discriminant models and global integration. IEEE Transactions on Image Processing, 2010.

Digital Library

[26]

J. Ye, Z. Zhao, and M. Wu. Discriminative k-means for clustering. In Advances in Neural Information Processing Systems, 2007.

[27]

K. Yu, T. Zhang, and Y. Gong. Nonlinear learning using local coordinate coding. In NIPS, 2009.

Cited By

Yang BWu JZhou YZhang XLin ZNie FChen B(2024)Robust spectral embedded bilateral orthogonal concept factorization for clusteringPattern Recognition10.1016/j.patcog.2024.110308150(110308)Online publication date: Jun-2024
https://doi.org/10.1016/j.patcog.2024.110308
Hu XXiong DChai L(2024)Robust Sparse Concept Factorization with Graph Regularization for Subspace LearningDigital Signal Processing10.1016/j.dsp.2024.104527(104527)Online publication date: Apr-2024
https://doi.org/10.1016/j.dsp.2024.104527
Hu XXiong DChai L(2024)Concept factorization with adaptive graph learning on Stiefel manifoldApplied Intelligence10.1007/s10489-024-05606-854:17-18(8224-8240)Online publication date: 1-Sep-2024
https://dl.acm.org/doi/10.1007/s10489-024-05606-8
Show More Cited By

Index Terms

Robust and Discriminative Concept Factorization for Image Representation
1. Information systems

Recommendations

Dual-graph regularized concept factorization for multi-view clustering
Abstract
Matrix factorization is an important technology that obtains the latent representation of data by mining the potential structure of data. As two popular matrix factorization techniques, concept factorization (CF) and non-negative matrix ...
Highlights
- We present a new multi-view concept factorization (CF) method for clustering.
- We elegantly extend the single-view CF to a multi-view version.
- We design a dual-graph strategy to mine the structural information of data.
- We ...
Graph-Regularized Local Coordinate Concept Factorization for Image Representation

Existing matrix factorization based techniques, such as nonnegative matrix factorization and concept factorization, have been widely applied for data representation. In order to make the obtained concepts to be as close to the original data points as ...
Adaptively local consistent concept factorization for multi-view clustering
Abstract
Many real-world datasets consist of multiple views of data items. The rough method of combining multiple views directly through feature concatenation cannot uncover the optimal latent structure shared by multiple views, which would benefit many ...

Comments

Please enable JavaScript to view thecomments powered by Disqus.

Information & Contributors

Information

Published In

cover image ACM Conferences

ICMR '15: Proceedings of the 5th ACM on International Conference on Multimedia Retrieval

June 2015

700 pages

ISBN:9781450332743

DOI:10.1145/2671188

General Chairs:
Alex Hauptmann
Carnegie Mellon University, USA
,
Chong-Wah Ngo
City University of Hong Kong, China
,
Xiangyang Xue
Fudan University, China
,
Program Chairs:
Yu-Gang Jiang
Fudan University, China
,
Cees Snoek
University of Amsterdam and Qualcomm Research Netherlands
,
Nuno Vasconcelos
University of California, San Diego, USA

Copyright © 2015 ACM.

Permission to make digital or hard copies of all or part of this work for personal or classroom use is granted without fee provided that copies are not made or distributed for profit or commercial advantage and that copies bear this notice and the full citation on the first page. Copyrights for components of this work owned by others than ACM must be honored. Abstracting with credit is permitted. To copy otherwise, or republish, to post on servers or to redistribute to lists, requires prior specific permission and/or a fee. Request permissions from [email protected]

Sponsors

SIGMM: ACM Special Interest Group on Multimedia

Publisher

Association for Computing Machinery

New York, NY, United States

Publication History

Published: 22 June 2015

Permissions

Request permissions for this article.

Request Permissions

Check for updates

Author Tags

Qualifiers

Research-article

Funding Sources

National HeGaoJi Key Project
National Natural Science Foundation of China

Conference

ICMR '15

Sponsor:

SIGMM

ICMR '15: International Conference on Multimedia Retrieval

June 23 - 26, 2015

Shanghai, China

Acceptance Rates

ICMR '15 Paper Acceptance Rate 48 of 127 submissions, 38%;

Overall Acceptance Rate 254 of 830 submissions, 31%

Contributors

Other Metrics

View Article Metrics

Bibliometrics & Citations

Bibliometrics

Article Metrics

14
Total Citations
View Citations
171
Total Downloads

Downloads (Last 12 months)8
Downloads (Last 6 weeks)0

Reflects downloads up to 14 Dec 2024

Other Metrics

View Author Metrics

Citations

Cited By

Yang BWu JZhou YZhang XLin ZNie FChen B(2024)Robust spectral embedded bilateral orthogonal concept factorization for clusteringPattern Recognition10.1016/j.patcog.2024.110308150(110308)Online publication date: Jun-2024
https://doi.org/10.1016/j.patcog.2024.110308
Hu XXiong DChai L(2024)Robust Sparse Concept Factorization with Graph Regularization for Subspace LearningDigital Signal Processing10.1016/j.dsp.2024.104527(104527)Online publication date: Apr-2024
https://doi.org/10.1016/j.dsp.2024.104527
Hu XXiong DChai L(2024)Concept factorization with adaptive graph learning on Stiefel manifoldApplied Intelligence10.1007/s10489-024-05606-854:17-18(8224-8240)Online publication date: 1-Sep-2024
https://dl.acm.org/doi/10.1007/s10489-024-05606-8
Zhou NChoi KChen BDu YLiu JXu Y(2023)Correntropy-Based Low-Rank Matrix Factorization With Constraint Graph Learning for Image ClusteringIEEE Transactions on Neural Networks and Learning Systems10.1109/TNNLS.2022.316693134:12(10433-10446)Online publication date: Dec-2023
https://doi.org/10.1109/TNNLS.2022.3166931
Yang BZhang XNie FChen BWang FNan ZZheng N(2023)ECCA: Efficient Correntropy-Based Clustering Algorithm With Orthogonal Concept FactorizationIEEE Transactions on Neural Networks and Learning Systems10.1109/TNNLS.2022.314280634:10(7377-7390)Online publication date: Oct-2023
https://doi.org/10.1109/TNNLS.2022.3142806
Jin GGao JTan L(2022)Robust large-scale clustering based on correntropyPLOS ONE10.1371/journal.pone.027701217:11(e0277012)Online publication date: 4-Nov-2022
https://doi.org/10.1371/journal.pone.0277012
Zhou NDu YLiu JHuang XShen XChoi K(2022)Robust semi-supervised data representation and imputation by correntropy based constraint nonnegative matrix factorizationApplied Intelligence10.1007/s10489-022-03884-853:10(11599-11617)Online publication date: 8-Sep-2022
https://dl.acm.org/doi/10.1007/s10489-022-03884-8
Zhou NChen BDu YJiang TLiu JXu Y(2020)Maximum Correntropy Criterion-Based Robust Semisupervised Concept Factorization for Image RepresentationIEEE Transactions on Neural Networks and Learning Systems10.1109/TNNLS.2019.294715631:10(3877-3891)Online publication date: Oct-2020
https://doi.org/10.1109/TNNLS.2019.2947156
Yahya ATan JSu BLiu KHadi A(2019)Image noise reduction based on adaptive thresholding and clusteringMultimedia Tools and Applications10.1007/s11042-018-6955-878:11(15545-15573)Online publication date: 1-Jun-2019
https://dl.acm.org/doi/10.1007/s11042-018-6955-8
Guo YDing GHan J(2018)Robust Quantization for General Similarity SearchIEEE Transactions on Image Processing10.1109/TIP.2017.276644527:2(949-963)Online publication date: 1-Feb-2018
https://dl.acm.org/doi/10.1109/TIP.2017.2766445
Show More Cited By

View Options

Login options

Check if you have access through your login credentials or your institution to get full access on this article.

Full Access

Get this Publication

View options

PDF

View or Download as a PDF file.

eReader

View online with eReader.

Media

Figures

Other

Tables

View Table of Contents