Supervised Homogeneity Fusion: a Combinatorial Approach
Abstract
Fusing regression coefficients into homogenous groups can unveil those coefficients that share a common value within each group. Such groupwise homogeneity reduces the intrinsic dimension of the parameter space and unleashes sharper statistical accuracy. We propose and investigate a new combinatorial grouping approach called -Fusion that is amenable to mixed integer optimization (MIO). On the statistical aspect, we identify a fundamental quantity called grouping sensitivity that underpins the difficulty of recovering the true groups. We show that -Fusion achieves grouping consistency under the weakest possible requirement of the grouping sensitivity: if this requirement is violated, then the minimax risk of group misspecification will fail to converge to zero. Moreover, we show that in the high-dimensional regime, one can apply -Fusion coupled with a sure screening set of features without any essential loss of statistical efficiency, while reducing the computational cost substantially. On the algorithmic aspect, we provide a MIO formulation for -Fusion along with a warm start strategy. Simulation and real data analysis demonstrate that -Fusion exhibits superiority over its competitors in terms of grouping accuracy.
Cite
@article{arxiv.2201.01036,
title = {Supervised Homogeneity Fusion: a Combinatorial Approach},
author = {Wen Wang and Shihao Wu and Ziwei Zhu and Ling Zhou and Peter X. -K. Song},
journal= {arXiv preprint arXiv:2201.01036},
year = {2022}
}