Individual Fairness for $k$-Clustering
Abstract
We give a local search based algorithm for -median and -means (and more generally for any -clustering with norm cost function) from the perspective of individual fairness. More precisely, for a point in a point set of size , let be the minimum radius such that the ball of radius centered at has at least points from . Intuitively, if a set of random points are chosen from as centers, every point expects to have a center within radius . An individually fair clustering provides such a guarantee for every point . This notion of fairness was introduced in [Jung et al., 2019] where they showed how to get an approximately feasible -clustering with respect to this fairness condition. In this work, we show how to get a bicriteria approximation for fair -clustering: The -median (-means) cost of our solution is within a constant factor of the cost of an optimal fair -clustering, and our solution approximately satisfies the fairness condition (also within a constant factor). Further, we complement our theoretical bounds with empirical evaluation.
Cite
@article{arxiv.2002.06742,
title = {Individual Fairness for $k$-Clustering},
author = {Sepideh Mahabadi and Ali Vakilian},
journal= {arXiv preprint arXiv:2002.06742},
year = {2020}
}
Comments
ICML 2020