Randomized GCUR decompositions

IF 1.7 3区数学 Q2 MATHEMATICS, APPLIED

Advances in Computational Mathematics Pub Date : 2024-07-18 DOI:10.1007/s10444-024-10168-x

Zhengbang Cao, Yimin Wei, Pengpeng Xie

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引用次数: 0

Abstract

By exploiting the random sampling techniques, this paper derives an efficient randomized algorithm for computing a generalized CUR decomposition, which provides low-rank approximations of both matrices simultaneously in terms of some of their rows and columns. For large-scale data sets that are expensive to store and manipulate, a new variant of the discrete empirical interpolation method known as L-DEIM, which needs much lower cost and provides a significant acceleration in practice, is also combined with the random sampling approach to further improve the efficiency of our algorithm. Moreover, adopting the randomized algorithm to implement the truncation process of restricted singular value decomposition (RSVD), combined with the L-DEIM procedure, we propose a fast algorithm for computing an RSVD based CUR decomposition, which provides a coordinated low-rank approximation of the three matrices in a CUR-type format simultaneously and provides advantages over the standard CUR approximation for some applications. We establish detailed probabilistic error analysis for the algorithms and provide numerical results that show the promise of our approaches.

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随机 GCUR 分解

通过利用随机抽样技术，本文推导出了一种计算广义 CUR 分解的高效随机算法，该算法可同时根据两个矩阵的部分行和列提供低秩近似值。对于存储和处理成本高昂的大规模数据集，本文还将离散经验插值法的新变体 L-DEIM 与随机抽样方法相结合，进一步提高了算法的效率。此外，采用随机化算法实现受限奇异值分解（RSVD）的截断过程，并结合 L-DEIM 程序，我们提出了一种计算基于 RSVD 的 CUR 分解的快速算法，该算法可同时以 CUR 类型格式提供三个矩阵的协调低阶近似，在某些应用中比标准 CUR 近似更具优势。我们为算法建立了详细的概率误差分析，并提供了数值结果，展示了我们方法的前景。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Advances in Computational Mathematics 数学-应用数学

CiteScore

3.00

自引率

5.90%

发文量

审稿时长

3 months

期刊介绍： Advances in Computational Mathematics publishes high quality, accessible and original articles at the forefront of computational and applied mathematics, with a clear potential for impact across the sciences. The journal emphasizes three core areas: approximation theory and computational geometry; numerical analysis, modelling and simulation; imaging, signal processing and data analysis. This journal welcomes papers that are accessible to a broad audience in the mathematical sciences and that show either an advance in computational methodology or a novel scientific application area, or both. Methods papers should rely on rigorous analysis and/or convincing numerical studies.