Estimation of Simultaneously Sparse and Low Rank Matrices
Abstract
The paper introduces a penalized matrix estimation procedure aiming at solutions which are sparse and low-rank at the same time. Such structures arise in the context of social networks or protein interactions where underlying graphs have adjacency matrices which are block-diagonal in the appropriate basis. We introduce a convex mixed penalty which involves l1-norm and trace norm simultaneously. We obtain an oracle inequality which indicates how the two effects interact according to the nature of the target matrix. We bound generalization error in the link prediction problem. We also develop proximal descent strategies to solve the optimization problem efficiently and evaluate performance on synthetic and real data sets.
Cite
Text
Savalle et al. "Estimation of Simultaneously Sparse and Low Rank Matrices." International Conference on Machine Learning, 2012.Markdown
[Savalle et al. "Estimation of Simultaneously Sparse and Low Rank Matrices." International Conference on Machine Learning, 2012.](https://mlanthology.org/icml/2012/savalle2012icml-estimation/)BibTeX
@inproceedings{savalle2012icml-estimation,
title = {{Estimation of Simultaneously Sparse and Low Rank Matrices}},
author = {Savalle, Pierre-André and Richard, Emile and Vayatis, Nicolas},
booktitle = {International Conference on Machine Learning},
year = {2012},
url = {https://mlanthology.org/icml/2012/savalle2012icml-estimation/}
}