Scalable Binary CUR Low-Rank Approximation Algorithm

Abstract

This paper proposes a scalable binary CUR low-rank approximation algorithm that leverages parallel selection of representative rows and columns within a deterministic framework. By employing a blockwise adaptive cross approximation strategy, the algorithm efficiently identifies dominant components in large-scale matrices, thereby reducing computational costs. Numerical experiments on 16,384 × 16,384 matrices demonstrate a good speed-up, with execution time decreasing from 12.37 seconds using 2 processes to 1.02 seconds using 64 processes. The tests on Hilbert matrices and synthetic low-rank matrices of different size across various sizes demonstrate an near-optimal reconstruction accuracy.

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