On efficient robust regression with subquadratic samples
Abstract
We revisit the problem of robust linear regression under Gaussian covariates with an unknown covariance matrix of condition number . For this fundamental problem, significant gaps remain in our understanding of the trade-offs among sample complexity, condition number, runtime, and prediction error for efficient algorithms. Our first result is a near-linear-time algorithm that uses samples, where is the dimension and is the corruption rate, and achieves prediction error under the condition , improving over all prior works. We complement this result with a Statistical Query (SQ) lower bound showing that efficient SQ algorithms achieving error when require queries that take samples to simulate. Finally, we prove a low-degree polynomial lower bound that gives fine-grained evidence that, without assumptions such as , efficient algorithms may require samples to significantly outperform the trivial estimator that always guesses .
Cite
@article{arxiv.2605.18042,
title = {On efficient robust regression with subquadratic samples},
author = {Deeksha Adil and Jarosław Błasiok and Hongjie Chen and Deepak Narayanan Sridharan},
journal= {arXiv preprint arXiv:2605.18042},
year = {2026}
}
Comments
Accepted at COLT 2026