Boosting Nystr\"om Method

Abstract

The Nystr\"om method is an effective tool to generate low-rank approximations of large matrices, and it is particularly useful for kernel-based learning. To improve the standard Nystr\"om approximation, ensemble Nystr\"om algorithms compute a mixture of Nystr\"om approximations which are generated independently based on column resampling. We propose a new family of algorithms, boosting Nystr\"om, which iteratively generate multiple ``weak'' Nystr\"om approximations (each using a small number of columns) in a sequence adaptively - each approximation aims to compensate for the weaknesses of its predecessor - and then combine them to form one strong approximation. We demonstrate that our boosting Nystr\"om algorithms can yield more efficient and accurate low-rank approximations to kernel matrices. Improvements over the standard and ensemble Nystr\"om methods are illustrated by simulation studies and real-world data analysis.