An Extended Newton-type Algorithm for $\ell_2$-Regularized Sparse Logistic Regression and Its Efficiency for Classifying Large-scale Datasets
Abstract
Sparse logistic regression, as an effective tool of classification, has been developed tremendously in recent two decades, from its origination the -regularized version to the sparsity constrained models. This paper is carried out on the sparsity constrained logistic regression by the Newton method. We begin with establishing its first-order optimality condition associated with a -stationary point. This point can be equivalently interpreted as a system of equations which is then efficiently solved by the Newton method. The method has a considerably low computational complexity and enjoys global and quadratic convergence properties. Numerical experiments on random and real data demonstrate its superior performance when against seven state-of-the-art solvers.
Cite
@article{arxiv.1901.02768,
title = {An Extended Newton-type Algorithm for $\ell_2$-Regularized Sparse Logistic Regression and Its Efficiency for Classifying Large-scale Datasets},
author = {Rui Wang and Naihua Xiu and Shenglong Zhou},
journal= {arXiv preprint arXiv:1901.02768},
year = {2021}
}