Piecewise linear regularized solution paths

TL;DR

This paper characterizes conditions under which regularized optimization problems have piecewise linear solution paths, enabling efficient algorithms and robust extensions for regression and classification.

Contribution

It provides a general characterization of loss-penalty pairs that produce piecewise linear paths, facilitating efficient computation and new algorithm development.

Findings

Characterization of loss-penalty pairs with piecewise linear paths

Development of efficient path-following algorithms

Proposals for robust LASSO variants and new algorithms

Abstract

We consider the generic regularized optimization problem $\hat{\mathsf{\beta}}(\lambda)=\arg \min_{\beta}L({\sf{y}},X{\sf{\beta}})+\lambda J({\sf{\beta}})$. Efron, Hastie, Johnstone and Tibshirani [Ann. Statist. 32 (2004) 407--499] have shown that for the LASSO--that is, if $L$ is squared error loss and $J(\beta)=\|\beta\|_1$ is the $\ell_1$ norm of $\beta$--the optimal coefficient path is piecewise linear, that is, $\partial \hat{\beta}(\lambda)/\partial \lambda$ is piecewise constant. We derive a general characterization of the properties of (loss $L$, penalty $J$) pairs which give piecewise linear coefficient paths. Such pairs allow for efficient generation of the full regularized coefficient paths. We investigate the nature of efficient path following algorithms which arise. We use our results to suggest robust versions of the LASSO for regression and classification, and to develop new, efficient algorithms for existing problems in the literature, including Mammen and van de Geer's locally adaptive regression splines.