A high-order augmented Lagrangian method with arbitrarily fast convergence
Abstract
We propose a high-order version of the augmented Lagrangian method for solving convex optimization problems with linear constraints, which achieves arbitrarily fast -- and even superlinear -- convergence rates. First, we analyze the convergence rates of the high-order proximal point method under certain uniform convexity assumptions on the energy functional. We then introduce the high-order augmented Lagrangian method and analyze its convergence by leveraging the convergence results of the high-order proximal point method. Finally, we present applications of the high-order augmented Lagrangian method to various problems arising in the sciences, including data fitting, flow in porous media, and scientific machine learning.
Cite
@article{arxiv.2601.11826,
title = {A high-order augmented Lagrangian method with arbitrarily fast convergence},
author = {Young-Ju Lee and Jongho Park},
journal= {arXiv preprint arXiv:2601.11826},
year = {2026}
}
Comments
22 pages, 7 figures