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Bibliographic Details
Main Authors: Zhou, Shuya, Xia, Junwen, Zhang, Jingxiao
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.15911
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author Zhou, Shuya
Xia, Junwen
Zhang, Jingxiao
author_facet Zhou, Shuya
Xia, Junwen
Zhang, Jingxiao
contents High-dimensional classification problems often rely on the Lasso-penalized linear Support Vector Machines (SVMs). However, the double non-smoothness induced by the hinge loss and Lasso penalty in this model makes statistical inference challenging and impedes computational efficiency. In this paper, we propose a unified inference framework in both offline and online settings. In the offline case, by applying a convolution smoothing technique to the hinge loss, we construct a debiased estimator that eliminates the shrinkage bias, thereby building a valid confidence interval. For online streaming data, we develop a real-time estimator and inference procedure that relies only on summary statistics of historical data. Theoretically, we provide rigorous proofs for the asymptotic normality of our offline and online debiased estimators. Simulation studies and real data applications demonstrate that our methods achieve valid statistical inference and improved computational efficiency.
format Preprint
id arxiv_https___arxiv_org_abs_2605_15911
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Statistical Inference for Smoothed Support Vector Machines in High Dimensions: From Offline to Online Data
Zhou, Shuya
Xia, Junwen
Zhang, Jingxiao
Methodology
High-dimensional classification problems often rely on the Lasso-penalized linear Support Vector Machines (SVMs). However, the double non-smoothness induced by the hinge loss and Lasso penalty in this model makes statistical inference challenging and impedes computational efficiency. In this paper, we propose a unified inference framework in both offline and online settings. In the offline case, by applying a convolution smoothing technique to the hinge loss, we construct a debiased estimator that eliminates the shrinkage bias, thereby building a valid confidence interval. For online streaming data, we develop a real-time estimator and inference procedure that relies only on summary statistics of historical data. Theoretically, we provide rigorous proofs for the asymptotic normality of our offline and online debiased estimators. Simulation studies and real data applications demonstrate that our methods achieve valid statistical inference and improved computational efficiency.
title Statistical Inference for Smoothed Support Vector Machines in High Dimensions: From Offline to Online Data
topic Methodology
url https://arxiv.org/abs/2605.15911