Principal Ellipsoid Analysis (PEA): Efficient non-linear dimension reduction & clustering
Abstract
Even with the rise in popularity of over-parameterized models, simple dimensionality reduction and clustering methods, such as PCA and k-means, are still routinely used in an amazing variety of settings. A primary reason is the combination of simplicity, interpretability and computational efficiency. The focus of this article is on improving upon PCA and k-means, by allowing non-linear relations in the data and more flexible cluster shapes, without sacrificing the key advantages. The key contribution is a new framework for Principal Elliptical Analysis (PEA), defining a simple and computationally efficient alternative to PCA that fits the best elliptical approximation through the data. We provide theoretical guarantees on the proposed PEA algorithm using Vapnik-Chervonenkis (VC) theory to show strong consistency and uniform concentration bounds. Toy experiments illustrate the performance of PEA, and the ability to adapt to non-linear structure and complex cluster shapes. In a rich variety of real data clustering applications, PEA is shown to do as well as k-means for simple datasets, while dramatically improving performance in more complex settings.
Keywords
Cite
@article{arxiv.2008.07110,
title = {Principal Ellipsoid Analysis (PEA): Efficient non-linear dimension reduction & clustering},
author = {Debolina Paul and Saptarshi Chakraborty and Didong Li and David Dunson},
journal= {arXiv preprint arXiv:2008.07110},
year = {2020}
}