Dimensionality Reduction has Quantifiable Imperfections: Two Geometric Bounds
Abstract
In this paper, we investigate Dimensionality reduction (DR) maps in an information retrieval setting from a quantitative topology point of view. In particular, we show that no DR maps can achieve perfect precision and perfect recall simultaneously. Thus a continuous DR map must have imperfect precision. We further prove an upper bound on the precision of Lipschitz continuous DR maps. While precision is a natural measure in an information retrieval setting, it does not measure `how' wrong the retrieved data is. We therefore propose a new measure based on Wasserstein distance that comes with similar theoretical guarantee. A key technical step in our proofs is a particular optimization problem of the -Wasserstein distance over a constrained set of distributions. We provide a complete solution to this optimization problem, which can be of independent interest on the technical side.
Cite
@article{arxiv.1811.00115,
title = {Dimensionality Reduction has Quantifiable Imperfections: Two Geometric Bounds},
author = {Kry Yik Chau Lui and Gavin Weiguang Ding and Ruitong Huang and Robert J. McCann},
journal= {arXiv preprint arXiv:1811.00115},
year = {2018}
}
Comments
32nd Conference on Neural Information Processing Systems (NIPS 2018), Montreal, Canada