Factor Group-Sparse Regularization for Efficient Low-Rank Matrix Recovery
Abstract
This paper develops a new class of nonconvex regularizers for low-rank matrix recovery. Many regularizers are motivated as convex relaxations of the matrix rank function. Our new factor group-sparse regularizers are motivated as a relaxation of the number of nonzero columns in a factorization of the matrix. These nonconvex regularizers are sharper than the nuclear norm; indeed, we show they are related to Schatten- norms with arbitrarily small . Moreover, these factor group-sparse regularizers can be written in a factored form that enables efficient and effective nonconvex optimization; notably, the method does not use singular value decomposition. We provide generalization error bounds for low-rank matrix completion which show improved upper bounds for Schatten- norm reglarization as decreases. Compared to the max norm and the factored formulation of the nuclear norm, factor group-sparse regularizers are more efficient, accurate, and robust to the initial guess of rank. Experiments show promising performance of factor group-sparse regularization for low-rank matrix completion and robust principal component analysis.
Cite
@article{arxiv.1911.05774,
title = {Factor Group-Sparse Regularization for Efficient Low-Rank Matrix Recovery},
author = {Jicong Fan and Lijun Ding and Yudong Chen and Madeleine Udell},
journal= {arXiv preprint arXiv:1911.05774},
year = {2019}
}
Comments
Accepted by NeurIPS 2019. The supplementary material is at https://github.com/jicongfan/Supplementary-material-of-conference-papers