Robust Gradient Descent Estimation for Tensor Models under Heavy-Tailed Distributions
Abstract
Low-rank tensor models are widely used in statistics. However, most existing methods rely heavily on the assumption that data follows a sub-Gaussian distribution. To address the challenges associated with heavy-tailed distributions encountered in real-world applications, we propose a novel robust estimation procedure based on truncated gradient descent for general low-rank tensor models. We establish the computational convergence of the proposed method and derive optimal statistical rates under heavy-tailed distributional settings of both covariates and noise for various low-rank models. Notably, the statistical error rates are governed by a local moment condition, which captures the distributional properties of tensor variables projected onto certain low-dimensional local regions. Furthermore, we present numerical results to demonstrate the effectiveness of our method.
Cite
@article{arxiv.2412.04773,
title = {Robust Gradient Descent Estimation for Tensor Models under Heavy-Tailed Distributions},
author = {Xiaoyu Zhang and Di Wang and Guodong Li and Defeng Sun},
journal= {arXiv preprint arXiv:2412.04773},
year = {2025}
}
Comments
82 pages, 11 figures