Quantum Entropy Scoring for Fast Robust Mean Estimation and Improved Outlier Detection
Abstract
We study two problems in high-dimensional robust statistics: \emph{robust mean estimation} and \emph{outlier detection}. In robust mean estimation the goal is to estimate the mean of a distribution on given independent samples, an -fraction of which have been corrupted by a malicious adversary. In outlier detection the goal is to assign an \emph{outlier score} to each element of a data set such that elements more likely to be outliers are assigned higher scores. Our algorithms for both problems are based on a new outlier scoring method we call QUE-scoring based on \emph{quantum entropy regularization}. For robust mean estimation, this yields the first algorithm with optimal error rates and nearly-linear running time in all parameters, improving on the previous fastest running time . For outlier detection, we evaluate the performance of QUE-scoring via extensive experiments on synthetic and real data, and demonstrate that it often performs better than previously proposed algorithms. Code for these experiments is available at https://github.com/twistedcubic/que-outlier-detection .
Keywords
Cite
@article{arxiv.1906.11366,
title = {Quantum Entropy Scoring for Fast Robust Mean Estimation and Improved Outlier Detection},
author = {Yihe Dong and Samuel B. Hopkins and Jerry Li},
journal= {arXiv preprint arXiv:1906.11366},
year = {2019}
}