Mesh-Based Solutions for Nonparametric Penalized Regression
Abstract
It is often of interest to estimate regression functions non-parametrically. Penalized regression (PR) is one statistically-effective, well-studied solution to this problem. Unfortunately, in many cases, finding exact solutions to PR problems is computationally intractable. In this manuscript, we propose a mesh-based approximate solution (MBS) for those scenarios. MBS transforms the complicated functional minimization of NPR, to a finite parameter, discrete convex minimization; and allows us to leverage the tools of modern convex optimization. We show applications of MBS in a number of explicit examples (including both uni- and multi-variate regression), and explore how the number of parameters must increase with our sample-size in order for MBS to maintain the rate-optimality of NPR. We also give an efficient algorithm to minimize the MBS objective while effectively leveraging the sparsity inherent in MBS.
Cite
@article{arxiv.2112.03428,
title = {Mesh-Based Solutions for Nonparametric Penalized Regression},
author = {Brayan Ortiz and Noah Simon},
journal= {arXiv preprint arXiv:2112.03428},
year = {2021}
}
Comments
29 pages, 4 figures