Abstract
The CUR matrix decomposition is an important tool for low-rank matrix approximation. It approximates a data matrix though selecting a small number of columns and rows of the matrix. Those CUR algorithms with gap-dependent approximation bounds can obtain high approximation quality for matrices with good singular value spectrum decay, but they have impractically high time complexities. In this paper, we propose a novel CUR algorithm based on truncated LU factorization with an efficient variant of complete pivoting. Our algorithm has gap-dependent approximation bounds on both spectral and Frobenius norms while maintaining high efficiency. Numerical experiments demonstrate the effectiveness of our algorithm and verify our theoretical guarantees.
| Original language | English |
|---|---|
| Pages (from-to) | 766-775 |
| Number of pages | 10 |
| Journal | Proceedings of Machine Learning Research |
| Volume | 108 |
| State | Published - 2020 |
| Externally published | Yes |
| Event | 23rd International Conference on Artificial Intelligence and Statistics, AISTATS 2020 - Virtual, Online Duration: 26 Aug 2020 → 28 Aug 2020 |