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Main Authors: Kou, Huayan, Gu, Yuwen, Lian, Yi, Zhang, Rui, Fan, Jun
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2604.12694
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author Kou, Huayan
Gu, Yuwen
Lian, Yi
Zhang, Rui
Fan, Jun
author_facet Kou, Huayan
Gu, Yuwen
Lian, Yi
Zhang, Rui
Fan, Jun
contents Sparse penalized quantile regression provides an effective framework for variable selection and robust estimation in high-dimensional data analysis. When ex planatory variables are organized into groups, achieving sparsity both within and between groups is essential. However, existing quantile regression methods often fail to meet this dual objective. To address this gap, we introduce the adaptive sparse group lasso penalized quantile regression, which integrates adaptive lasso and adaptive group lasso penalties. We optimize the model parameters via the alternating direction method of multipliers (ADMM) applied to the dual problem, and establish global convergence. Through extensive simulation studies and real data analyses, we demonstrate (i) the efficacy of the proposed method in achieving simultaneous within- and between-group sparsity, and (ii) the computational efficiency of our algorithm relative to existing alternatives.
format Preprint
id arxiv_https___arxiv_org_abs_2604_12694
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Adaptive Sparse Group Lasso Penalized Quantile Regression via Dual ADMM
Kou, Huayan
Gu, Yuwen
Lian, Yi
Zhang, Rui
Fan, Jun
Computation
Sparse penalized quantile regression provides an effective framework for variable selection and robust estimation in high-dimensional data analysis. When ex planatory variables are organized into groups, achieving sparsity both within and between groups is essential. However, existing quantile regression methods often fail to meet this dual objective. To address this gap, we introduce the adaptive sparse group lasso penalized quantile regression, which integrates adaptive lasso and adaptive group lasso penalties. We optimize the model parameters via the alternating direction method of multipliers (ADMM) applied to the dual problem, and establish global convergence. Through extensive simulation studies and real data analyses, we demonstrate (i) the efficacy of the proposed method in achieving simultaneous within- and between-group sparsity, and (ii) the computational efficiency of our algorithm relative to existing alternatives.
title Adaptive Sparse Group Lasso Penalized Quantile Regression via Dual ADMM
topic Computation
url https://arxiv.org/abs/2604.12694