The non-overlapping statistical approximation to overlapping group lasso

TL;DR

This paper introduces a separable penalty as an approximation to the overlapping group lasso, significantly speeding up computation while maintaining statistical performance, enabling large-scale applications.

Contribution

It proposes a new separable penalty that approximates the overlapping group lasso, offering faster computation without sacrificing statistical accuracy.

Findings

Faster computational time compared to overlapping group lasso.

Statistical equivalence in error bounds and performance.

Effective in large-scale, high-dimensional problems.

Abstract

Group lasso is a commonly used regularization method in statistical learning in which parameters are eliminated from the model according to predefined groups. However, when the groups overlap, optimizing the group lasso penalized objective can be time-consuming on large-scale problems because of the non-separability induced by the overlapping groups. This bottleneck has seriously limited the application of overlapping group lasso regularization in many modern problems, such as gene pathway selection and graphical model estimation. In this paper, we propose a separable penalty as an approximation of the overlapping group lasso penalty. Thanks to the separability, the computation of regularization based on our penalty is substantially faster than that of the overlapping group lasso, especially for large-scale and high-dimensional problems. We show that the penalty is the tightest separable relaxation of the overlapping group lasso norm within the family of $\ell_{q_1}/\ell_{q_2}$ norms. Moreover, we show that the estimator based on the proposed separable penalty is statistically equivalent to the one based on the overlapping group lasso penalty with respect to their error bounds and the rate-optimal performance under the squared loss. We demonstrate the faster computational time and statistical equivalence of our method compared with the overlapping group lasso in simulation examples and a classification problem of cancer tumors based on gene expression and multiple gene pathways.