Faster Algorithms for Learning Convex Functions
Abstract
The task of approximating an arbitrary convex function arises in several learning problems such as convex regression, learning with a difference of convex (DC) functions, and learning Bregman or -divergences. In this paper, we develop and analyze an approach for solving a broad range of convex function learning problems that is faster than state-of-the-art approaches. Our approach is based on a 2-block ADMM method where each block can be computed in closed form. For the task of convex Lipschitz regression, we establish that our proposed algorithm converges with iteration complexity of for a dataset and . Combined with per-iteration computation complexity, our method converges with the rate . This new rate improves the state of the art rate of if . Further we provide similar solvers for DC regression and Bregman divergence learning. Unlike previous approaches, our method is amenable to the use of GPUs. We demonstrate on regression and metric learning experiments that our approach is over 100 times faster than existing approaches on some data sets, and produces results that are comparable to state of the art.
Cite
@article{arxiv.2111.01348,
title = {Faster Algorithms for Learning Convex Functions},
author = {Ali Siahkamari and Durmus Alp Emre Acar and Christopher Liao and Kelly Geyer and Venkatesh Saligrama and Brian Kulis},
journal= {arXiv preprint arXiv:2111.01348},
year = {2022}
}
Comments
21 pages, 3 figures. Proceedings of the 39 th International Conference on Machine Learning, Baltimore, Maryland, USA, PMLR 162, 2022. Copy- right 2022 by the author(s)