Loss minimization and parameter estimation with heavy tails
Abstract
This work studies applications and generalizations of a simple estimation technique that provides exponential concentration under heavy-tailed distributions, assuming only bounded low-order moments. We show that the technique can be used for approximate minimization of smooth and strongly convex losses, and specifically for least squares linear regression. For instance, our -dimensional estimator requires just random samples to obtain a constant factor approximation to the optimal least squares loss with probability , without requiring the covariates or noise to be bounded or subgaussian. We provide further applications to sparse linear regression and low-rank covariance matrix estimation with similar allowances on the noise and covariate distributions. The core technique is a generalization of the median-of-means estimator to arbitrary metric spaces.
Cite
@article{arxiv.1307.1827,
title = {Loss minimization and parameter estimation with heavy tails},
author = {Daniel Hsu and Sivan Sabato},
journal= {arXiv preprint arXiv:1307.1827},
year = {2016}
}
Comments
Final version as published in JMLR