English

A Sharper Computational Tool for $\text{L}_2\text{E}$ Regression

Methodology 2023-04-25 v3 Computation

Abstract

Building on previous research of Chi and Chi (2022), the current paper revisits estimation in robust structured regression under the L2E\text{L}_2\text{E} criterion. We adopt the majorization-minimization (MM) principle to design a new algorithm for updating the vector of regression coefficients. Our sharp majorization achieves faster convergence than the previous alternating proximal gradient descent algorithm (Chi and Chi, 2022). In addition, we reparameterize the model by substituting precision for scale and estimate precision via a modified Newton's method. This simplifies and accelerates overall estimation. We also introduce distance-to-set penalties to allow constrained estimation under nonconvex constraint sets. This tactic also improves performance in coefficient estimation and structure recovery. Finally, we demonstrate the merits of our improved tactics through a rich set of simulation examples and a real data application.

Keywords

Cite

@article{arxiv.2203.02993,
  title  = {A Sharper Computational Tool for $\text{L}_2\text{E}$ Regression},
  author = {Xiaoqian Liu and Eric C. Chi and Kenneth Lange},
  journal= {arXiv preprint arXiv:2203.02993},
  year   = {2023}
}

Comments

30 pages, 8 figures

R2 v1 2026-06-24T10:03:42.805Z