The composite absolute penalties family for grouped and hierarchical variable selection

TL;DR

This paper introduces the Composite Absolute Penalties (CAP) family, a flexible regularization method that incorporates group and hierarchical structures into variable selection, improving predictive performance in high-dimensional settings.

Contribution

The paper develops the CAP family of penalties that encode grouping and hierarchical relationships, along with the iCAP algorithm for efficient regularization path computation and degrees of freedom estimation.

Findings

CAP improves predictive accuracy over LASSO in simulations.

iCAP efficiently traces regularization paths for grouped variables.

CAP performs well even with mis-specified groupings.

Abstract

Extracting useful information from high-dimensional data is an important focus of today's statistical research and practice. Penalized loss function minimization has been shown to be effective for this task both theoretically and empirically. With the virtues of both regularization and sparsity, the $L_1$-penalized squared error minimization method Lasso has been popular in regression models and beyond. In this paper, we combine different norms including $L_1$ to form an intelligent penalty in order to add side information to the fitting of a regression or classification model to obtain reasonable estimates. Specifically, we introduce the Composite Absolute Penalties (CAP) family, which allows given grouping and hierarchical relationships between the predictors to be expressed. CAP penalties are built by defining groups and combining the properties of norm penalties at the across-group and within-group levels. Grouped selection occurs for nonoverlapping groups. Hierarchical variable selection is reached by defining groups with particular overlapping patterns. We propose using the BLASSO and cross-validation to compute CAP estimates in general. For a subfamily of CAP estimates involving only the $L_1$ and $L_{\infty}$ norms, we introduce the iCAP algorithm to trace the entire regularization path for the grouped selection problem. Within this subfamily, unbiased estimates of the degrees of freedom (df) are derived so that the regularization parameter is selected without cross-validation. CAP is shown to improve on the predictive performance of the LASSO in a series of simulated experiments, including cases with $p\gg n$ and possibly mis-specified groupings. When the complexity of a model is properly calculated, iCAP is seen to be parsimonious in the experiments.