Fair Clustering with Multiple Colors
Abstract
A fair clustering instance is given a data set in which every point is assigned some color. Colors correspond to various protected attributes such as sex, ethnicity, or age. A fair clustering is an instance where membership of points in a cluster is uncorrelated with the coloring of the points. Of particular interest is the case where all colors are equally represented. If we have exactly two colors, Chierrichetti, Kumar, Lattanzi and Vassilvitskii (NIPS 2017) showed that various -clustering objectives admit a constant factor approximation. Since then, a number of follow up work has attempted to extend this result to a multi-color case, though so far, the only known results either result in no-constant factor approximation, apply only to special clustering objectives such as -center, yield bicrititeria approximations, or require to be constant. In this paper, we present a simple reduction from unconstrained -clustering to fair -clustering for a large range of clustering objectives including -median, -means, and -center. The reduction loses only a constant factor in the approximation guarantee, marking the first true constant factor approximation for many of these problems.
Keywords
Cite
@article{arxiv.2002.07892,
title = {Fair Clustering with Multiple Colors},
author = {Matteo Böhm and Adriano Fazzone and Stefano Leonardi and Chris Schwiegelshohn},
journal= {arXiv preprint arXiv:2002.07892},
year = {2021}
}
Comments
Partially supported by the ERC Advanced Grant 788893 AMDROMA "Algorithmic and Mechanism Design Research in Online Markets" and MIUR PRIN project ALGADIMAR "Algorithms, Games, and Digital Markets"