Optimal low-rank QR decomposition with an application on RP-TSOD

Haiyan Yu; Jianfeng Ren; Ruibin Bai; Linlin Shen

doi:10.1007/978-981-99-8181-6_35

Optimal low-rank QR decomposition with an application on RP-TSOD

Haiyan Yu, Jianfeng Ren, Ruibin Bai, Linlin Shen

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

Abstract

Low-rank matrix approximation has many applications, e.g., denoising, recommender systems and image reconstruction. Recently, a Randomized Pivoted Two-Sided Orthogonal Decomposition (RP-TSOD) was developed to exploit the randomization in approximating a high-dimensional matrix using QR decomposition. Instead of random projection, we propose to optimize the projection matrix for low-rank QR decomposition with the target of minimizing the approximation error. A method based on gradient descent is developed to derive optimal projections. The developed techniques can be used in not only RP-TSOD, but also other decompositions. Experimental results on both synthetic data and real data show that the proposed method could more accurately approximate a high-dimensional matrix than RP-TSOD.

Original language	English
Title of host publication	Neural Information Processing
Subtitle of host publication	30th International Conference, ICONIP 2023, Changsha, China, November 20–23, 2023, Proceedings, Part XIV
Editors	Biao Luo, Long Cheng, Zheng-Guang Wu, Hongyi Li, Chaojie Li
Place of Publication	Singapore
Publisher	Springer Nature Singapore
Pages	462-473
ISBN (Electronic)	9789819981816
DOIs	https://doi.org/10.1007/978-981-99-8181-6_35
Publication status	Published - 27 Nov 2023

Publication series

Name	Communications in Computer and Information Science
Volume	1968

Keywords

Low-rank matrix approximation
optimal projection
QR decomposition
RP-TSOD

Access to Document

10.1007/978-981-99-8181-6_35

Cite this

Yu, H., Ren, J., Bai, R., & Shen, L. (2023). Optimal low-rank QR decomposition with an application on RP-TSOD. In B. Luo, L. Cheng, Z.-G. Wu, H. Li, & C. Li (Eds.), Neural Information Processing: 30th International Conference, ICONIP 2023, Changsha, China, November 20–23, 2023, Proceedings, Part XIV (pp. 462-473). (Communications in Computer and Information Science; Vol. 1968). Springer Nature Singapore. https://doi.org/10.1007/978-981-99-8181-6_35

Yu, Haiyan ; Ren, Jianfeng ; Bai, Ruibin et al. / Optimal low-rank QR decomposition with an application on RP-TSOD. Neural Information Processing: 30th International Conference, ICONIP 2023, Changsha, China, November 20–23, 2023, Proceedings, Part XIV. editor / Biao Luo ; Long Cheng ; Zheng-Guang Wu ; Hongyi Li ; Chaojie Li. Singapore : Springer Nature Singapore, 2023. pp. 462-473 (Communications in Computer and Information Science).

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title = "Optimal low-rank QR decomposition with an application on RP-TSOD",

abstract = "Low-rank matrix approximation has many applications, e.g., denoising, recommender systems and image reconstruction. Recently, a Randomized Pivoted Two-Sided Orthogonal Decomposition (RP-TSOD) was developed to exploit the randomization in approximating a high-dimensional matrix using QR decomposition. Instead of random projection, we propose to optimize the projection matrix for low-rank QR decomposition with the target of minimizing the approximation error. A method based on gradient descent is developed to derive optimal projections. The developed techniques can be used in not only RP-TSOD, but also other decompositions. Experimental results on both synthetic data and real data show that the proposed method could more accurately approximate a high-dimensional matrix than RP-TSOD.",

keywords = "Low-rank matrix approximation, optimal projection, QR decomposition, RP-TSOD",

author = "Haiyan Yu and Jianfeng Ren and Ruibin Bai and Linlin Shen",

year = "2023",

month = nov,

day = "27",

doi = "10.1007/978-981-99-8181-6_35",

language = "English",

series = "Communications in Computer and Information Science",

publisher = "Springer Nature Singapore",

pages = "462--473",

editor = "Biao Luo and Cheng, {Long } and Wu, {Zheng-Guang } and Li, {Hongyi } and Li, {Chaojie }",

booktitle = "Neural Information Processing",

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Yu, H , Ren, J , Bai, R & Shen, L 2023, Optimal low-rank QR decomposition with an application on RP-TSOD. in B Luo, L Cheng, Z-G Wu, H Li & C Li (eds), Neural Information Processing: 30th International Conference, ICONIP 2023, Changsha, China, November 20–23, 2023, Proceedings, Part XIV. Communications in Computer and Information Science, vol. 1968, Springer Nature Singapore, Singapore, pp. 462-473. https://doi.org/10.1007/978-981-99-8181-6_35

Optimal low-rank QR decomposition with an application on RP-TSOD. / Yu, Haiyan ; Ren, Jianfeng ; Bai, Ruibin et al.
Neural Information Processing: 30th International Conference, ICONIP 2023, Changsha, China, November 20–23, 2023, Proceedings, Part XIV. ed. / Biao Luo; Long Cheng; Zheng-Guang Wu; Hongyi Li; Chaojie Li. Singapore: Springer Nature Singapore, 2023. p. 462-473 (Communications in Computer and Information Science; Vol. 1968).

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

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T1 - Optimal low-rank QR decomposition with an application on RP-TSOD

AU - Yu, Haiyan

AU - Ren, Jianfeng

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AU - Shen, Linlin

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Y1 - 2023/11/27

N2 - Low-rank matrix approximation has many applications, e.g., denoising, recommender systems and image reconstruction. Recently, a Randomized Pivoted Two-Sided Orthogonal Decomposition (RP-TSOD) was developed to exploit the randomization in approximating a high-dimensional matrix using QR decomposition. Instead of random projection, we propose to optimize the projection matrix for low-rank QR decomposition with the target of minimizing the approximation error. A method based on gradient descent is developed to derive optimal projections. The developed techniques can be used in not only RP-TSOD, but also other decompositions. Experimental results on both synthetic data and real data show that the proposed method could more accurately approximate a high-dimensional matrix than RP-TSOD.

AB - Low-rank matrix approximation has many applications, e.g., denoising, recommender systems and image reconstruction. Recently, a Randomized Pivoted Two-Sided Orthogonal Decomposition (RP-TSOD) was developed to exploit the randomization in approximating a high-dimensional matrix using QR decomposition. Instead of random projection, we propose to optimize the projection matrix for low-rank QR decomposition with the target of minimizing the approximation error. A method based on gradient descent is developed to derive optimal projections. The developed techniques can be used in not only RP-TSOD, but also other decompositions. Experimental results on both synthetic data and real data show that the proposed method could more accurately approximate a high-dimensional matrix than RP-TSOD.

KW - Low-rank matrix approximation

KW - optimal projection

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KW - RP-TSOD

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Yu H , Ren J , Bai R , Shen L. Optimal low-rank QR decomposition with an application on RP-TSOD. In Luo B, Cheng L, Wu ZG, Li H, Li C, editors, Neural Information Processing: 30th International Conference, ICONIP 2023, Changsha, China, November 20–23, 2023, Proceedings, Part XIV. Singapore: Springer Nature Singapore. 2023. p. 462-473. (Communications in Computer and Information Science). doi: 10.1007/978-981-99-8181-6_35

Optimal low-rank QR decomposition with an application on RP-TSOD

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