Newton Method for Soft Quadratic Surface Support Vector Machine with 0-1 Loss Function
Abstract
A nonlinear kernel-free soft quadratic surface support vector machine model with 0-1 loss function (-SQSSVM) is proposed for binary classification problems, which is non-convex discontinuous. We are devoted to establishing the first and the second-order optimality conditions for the -SQSSVM. We establish a stationary equation using the properties of proximal operator of 0-1 loss function. We design a Newton method based on the stationary equation to solve -SQSSVM model and prove that the Newton method has local quadratic convergence under the second-order sufficient condition. Numerical experience on artificial datasets and benchmark datasets demonstrate that the Newton method for -SQSSVM achieves higher classification accuracy with less CPU time cost than other state-of-the-art methods.
Cite
@article{arxiv.2605.09361,
title = {Newton Method for Soft Quadratic Surface Support Vector Machine with 0-1 Loss Function},
author = {Guoping Li and Wen Song},
journal= {arXiv preprint arXiv:2605.09361},
year = {2026}
}