English

Robust support vector model based on bounded asymmetric elastic net loss for binary classification

Machine Learning 2026-04-09 v2 Machine Learning

Abstract

In this paper, we propose a novel bounded asymmetric elastic net (LbaenL_{baen}) loss function and combine it with the support vector machine (SVM), resulting in the BAEN-SVM. The LbaenL_{baen} is bounded and asymmetric and can degrade to the asymmetric elastic net hinge loss, pinball loss, and asymmetric least squares loss. BAEN-SVM not only effectively handles noise-contaminated data but also addresses the geometric irrationalities in the traditional SVM. By proving the violation tolerance upper bound (VTUB) of BAEN-SVM, we show that the model is geometrically well-defined. Furthermore, we derive that the influence function of BAEN-SVM is bounded, providing a theoretical guarantee of its robustness to noise. The Fisher consistency of the model further ensures its generalization capability. Since the Lbaen L_{\text{baen}} loss is non-convex, we designed a clipping dual coordinate descent-based half-quadratic algorithm to solve the non-convex optimization problem efficiently. Experimental results on artificial and benchmark datasets indicate that the proposed method outperforms classical and advanced SVMs, particularly in noisy environments.

Keywords

Cite

@article{arxiv.2603.06257,
  title  = {Robust support vector model based on bounded asymmetric elastic net loss for binary classification},
  author = {Haiyan Du and Hu Yang},
  journal= {arXiv preprint arXiv:2603.06257},
  year   = {2026}
}

Comments

Upon re-examination, we found fundamental flaws in the BAEN-SVM model that undermine our conclusions. The design inadequately addresses geometrical rationality on slack variables, questioning generalizability. Thus, we retract this manuscript. We are exploring a different model and will resubmit after thorough validation. We apologize for any confusion

R2 v1 2026-07-01T11:06:48.602Z