A Generic Path Algorithm for Regularized Statistical Estimation

TL;DR

The paper introduces EPSODE, an exact path algorithm based on ODEs, capable of efficiently solving a wide range of convex regularized estimation problems, including complex penalties and constraints.

Contribution

It presents a novel, generalizable path-following algorithm that handles various convex penalties and constraints, improving optimization efficiency in regularized statistical estimation.

Findings

Successfully applied to generalized linear models with l1 penalties

Effectively handles shape restrictions and nonparametric density estimation

Demonstrates versatility across multiple statistical modeling tasks

Abstract

Regularization is widely used in statistics and machine learning to prevent overfitting and gear solution towards prior information. In general, a regularized estimation problem minimizes the sum of a loss function and a penalty term. The penalty term is usually weighted by a tuning parameter and encourages certain constraints on the parameters to be estimated. Particular choices of constraints lead to the popular lasso, fused-lasso, and other generalized $l_1$ penalized regression methods. Although there has been a lot of research in this area, developing efficient optimization methods for many nonseparable penalties remains a challenge. In this article we propose an exact path solver based on ordinary differential equations (EPSODE) that works for any convex loss function and can deal with generalized $l_1$ penalties as well as more complicated regularization such as inequality constraints encountered in shape-restricted regressions and nonparametric density estimation. In the path following process, the solution path hits, exits, and slides along the various constraints and vividly illustrates the tradeoffs between goodness of fit and model parsimony. In practice, the EPSODE can be coupled with AIC, BIC, $C_p$ or cross-validation to select an optimal tuning parameter. Our applications to generalized $l_1$ regularized generalized linear models, shape-restricted regressions, Gaussian graphical models, and nonparametric density estimation showcase the potential of the EPSODE algorithm.