English

Non-convex Regularizations for Feature Selection in Ranking With Sparse SVM

Machine Learning 2015-07-03 v1

Abstract

Feature selection in learning to rank has recently emerged as a crucial issue. Whereas several preprocessing approaches have been proposed, only a few works have been focused on integrating the feature selection into the learning process. In this work, we propose a general framework for feature selection in learning to rank using SVM with a sparse regularization term. We investigate both classical convex regularizations such as _1\ell\_1 or weighted _1\ell\_1 and non-convex regularization terms such as log penalty, Minimax Concave Penalty (MCP) or _p\ell\_p pseudo norm with p\textless1p\textless{}1. Two algorithms are proposed, first an accelerated proximal approach for solving the convex problems, second a reweighted _1\ell\_1 scheme to address the non-convex regularizations. We conduct intensive experiments on nine datasets from Letor 3.0 and Letor 4.0 corpora. Numerical results show that the use of non-convex regularizations we propose leads to more sparsity in the resulting models while prediction performance is preserved. The number of features is decreased by up to a factor of six compared to the _1\ell\_1 regularization. In addition, the software is publicly available on the web.

Keywords

Cite

@article{arxiv.1507.00500,
  title  = {Non-convex Regularizations for Feature Selection in Ranking With Sparse SVM},
  author = {Léa Laporte and Rémi Flamary and Stephane Canu and Sébastien Déjean and Josiane Mothe},
  journal= {arXiv preprint arXiv:1507.00500},
  year   = {2015}
}
R2 v1 2026-06-22T10:04:21.870Z