Tensor principal component analysis
Tensor principal component analysis (PCA) has attracted increasing attention recently because of its effectiveness in multiway or tensor data analysis. This chapter introduces tensor PCA [1], [2] and its variants, including robust tensor PCA (R-TPCA) [2], tensor low-rank representation (TLRR) [3], a...
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sg-smu-ink.sis_research-100532024-07-25T07:00:04Z Tensor principal component analysis ZHOU, Pan LU, Canyi LIN, Zhouchen Tensor principal component analysis (PCA) has attracted increasing attention recently because of its effectiveness in multiway or tensor data analysis. This chapter introduces tensor PCA [1], [2] and its variants, including robust tensor PCA (R-TPCA) [2], tensor low-rank representation (TLRR) [3], and outlier robust tensor PCA (OR-TPCA) [4], for handling three kinds of data, namely, (i) Gaussian-noisy tensor data, (ii) sparsely corrupted tensor data, and (iii) outlier-corrupted tensor data. All these methods can exactly recover the clean data of intrinsic low-rank structure in the presence of noise in one setting, with provable performance guarantees. For example, for low-rank tensor data with sparse corruptions, R-TPCA and TLRR can exactly recover the clean data under mild conditions, while TLRR can exactly retrieve their true tensor subspaces and hence cluster them accurately. Besides, the objective function of these methods can be optimized via efficient convex programming with convergence guarantees. Finally, we also evaluate these methods on real applications, such as image/video recovery, outlier detection, and face clustering and classification. 2022-01-21T08:00:00Z text https://ink.library.smu.edu.sg/sis_research/9050 info:doi/10.1016/B978-0-12-824447-0.00012-1 Research Collection School Of Computing and Information Systems eng Institutional Knowledge at Singapore Management University Databases and Information Systems |
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Databases and Information Systems ZHOU, Pan LU, Canyi LIN, Zhouchen Tensor principal component analysis |
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Tensor principal component analysis (PCA) has attracted increasing attention recently because of its effectiveness in multiway or tensor data analysis. This chapter introduces tensor PCA [1], [2] and its variants, including robust tensor PCA (R-TPCA) [2], tensor low-rank representation (TLRR) [3], and outlier robust tensor PCA (OR-TPCA) [4], for handling three kinds of data, namely, (i) Gaussian-noisy tensor data, (ii) sparsely corrupted tensor data, and (iii) outlier-corrupted tensor data. All these methods can exactly recover the clean data of intrinsic low-rank structure in the presence of noise in one setting, with provable performance guarantees. For example, for low-rank tensor data with sparse corruptions, R-TPCA and TLRR can exactly recover the clean data under mild conditions, while TLRR can exactly retrieve their true tensor subspaces and hence cluster them accurately. Besides, the objective function of these methods can be optimized via efficient convex programming with convergence guarantees. Finally, we also evaluate these methods on real applications, such as image/video recovery, outlier detection, and face clustering and classification. |
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text |
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ZHOU, Pan LU, Canyi LIN, Zhouchen |
| author_facet |
ZHOU, Pan LU, Canyi LIN, Zhouchen |
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ZHOU, Pan |
| title |
Tensor principal component analysis |
| title_short |
Tensor principal component analysis |
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Tensor principal component analysis |
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Tensor principal component analysis |
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Tensor principal component analysis |
| title_sort |
tensor principal component analysis |
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Institutional Knowledge at Singapore Management University |
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2022 |
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https://ink.library.smu.edu.sg/sis_research/9050 |
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