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Main Authors: Luo, Xiaoyu, Gao, Chuanhou
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2509.01936
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author Luo, Xiaoyu
Gao, Chuanhou
author_facet Luo, Xiaoyu
Gao, Chuanhou
contents We develop a scalable algorithmic framework for sparse convex quantile regression (SCQR), addressing key computational challenges in the literature. Enhancing the classical CQR model, we introduce L2-norm regularization and an epsilon-insensitive zone to improve generalization and mitigate overfitting - both theoretically justified and empirically validated. Based on this extension, we improve the SCQR model and propose the first Generalized Benders Decomposition (GBD) algorithm tailored to this context, further strengthened by a novel local search-based Benders matheuristic. Extensive simulations and a real-world application to Sustainable Development Goals benchmarking demonstrate the accuracy, scalability, and practical value of our approach.
format Preprint
id arxiv_https___arxiv_org_abs_2509_01936
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Sparse Convex Quantile Regression: A Generalized Benders Decomposition Approach
Luo, Xiaoyu
Gao, Chuanhou
Optimization and Control
We develop a scalable algorithmic framework for sparse convex quantile regression (SCQR), addressing key computational challenges in the literature. Enhancing the classical CQR model, we introduce L2-norm regularization and an epsilon-insensitive zone to improve generalization and mitigate overfitting - both theoretically justified and empirically validated. Based on this extension, we improve the SCQR model and propose the first Generalized Benders Decomposition (GBD) algorithm tailored to this context, further strengthened by a novel local search-based Benders matheuristic. Extensive simulations and a real-world application to Sustainable Development Goals benchmarking demonstrate the accuracy, scalability, and practical value of our approach.
title Sparse Convex Quantile Regression: A Generalized Benders Decomposition Approach
topic Optimization and Control
url https://arxiv.org/abs/2509.01936