English

A Generalized CUR decomposition for matrix pairs

Numerical Analysis 2021-11-04 v2 Numerical Analysis

Abstract

We propose a generalized CUR (GCUR) decomposition for matrix pairs (A,B)(A, B). Given matrices AA and BB with the same number of columns, such a decomposition provides low-rank approximations of both matrices simultaneously, in terms of some of their rows and columns. We obtain the indices for selecting the subset of rows and columns of the original matrices using the discrete empirical interpolation method (DEIM) on the generalized singular vectors. When BB is square and nonsingular, there are close connections between the GCUR of (A,B)(A, B) and the DEIM-induced CUR of AB1AB^{-1}. When BB is the identity, the GCUR decomposition of AA coincides with the DEIM-induced CUR decomposition of AA. We also show a similar connection between the GCUR of (A,B)(A, B) and the CUR of AB+AB^+ for a nonsquare but full-rank matrix BB, where B+B^+ denotes the Moore--Penrose pseudoinverse of BB. While a CUR decomposition acts on one data set, a GCUR factorization jointly decomposes two data sets. The algorithm may be suitable for applications where one is interested in extracting the most discriminative features from one data set relative to another data set. In numerical experiments, we demonstrate the advantages of the new method over the standard CUR approximation; for recovering data perturbed with colored noise and subgroup discovery.

Cite

@article{arxiv.2107.03126,
  title  = {A Generalized CUR decomposition for matrix pairs},
  author = {Perfect Y. Gidisu and Michiel E. Hochstenbach},
  journal= {arXiv preprint arXiv:2107.03126},
  year   = {2021}
}
R2 v1 2026-06-24T03:57:41.383Z