We give a concentration inequality for a stochastic version of the facility location problem. We show the objective Cn=minF⊆[0,1]2∣F∣+∑x∈Xminf∈F∥x−f∥ is concentrated in an interval of length O(n1/6) and \E[Cn]=Θ(n2/3) if the input X consists of i.i.d. uniform points in the unit square. Our main tool is to use a geometric quantity, previously used in the design of approximation algorithms for the facility location problem, to analyze a martingale process. Many of our techniques generalize to other settings.
Cite
@article{arxiv.2012.04488,
title = {A Concentration Inequality for the Facility Location Problem},
author = {Sandeep Silwal},
journal= {arXiv preprint arXiv:2012.04488},
year = {2022}
}