Ridge Regression with Frequent Directions: Statistical and Optimization Perspectives
Abstract
Despite its impressive theory \& practical performance, Frequent Directions (\acrshort{fd}) has not been widely adopted for large-scale regression tasks. Prior work has shown randomized sketches (i) perform worse in estimating the covariance matrix of the data than \acrshort{fd}; (ii) incur high error when estimating the bias and/or variance on sketched ridge regression. We give the first constant factor relative error bounds on the bias \& variance for sketched ridge regression using \acrshort{fd}. We complement these statistical results by showing that \acrshort{fd} can be used in the optimization setting through an iterative scheme which yields high-accuracy solutions. This improves on randomized approaches which need to compromise the need for a new sketch every iteration with speed of convergence. In both settings, we also show using \emph{Robust Frequent Directions} further enhances performance.
Cite
@article{arxiv.2011.03607,
title = {Ridge Regression with Frequent Directions: Statistical and Optimization Perspectives},
author = {Charlie Dickens},
journal= {arXiv preprint arXiv:2011.03607},
year = {2020}
}