Approximation Algorithms for Clustering Problems with Lower Bounds and Outliers
Abstract
We consider clustering problems with {\em non-uniform lower bounds and outliers}, and obtain the {\em first approximation guarantees} for these problems. We have a set of facilities with lower bounds and a set of clients located in a common metric space , and bounds , . A feasible solution is a pair , where specifies the client assignments, such that , for all , and . In the {\em lower-bounded min-sum-of-radii with outliers} (\lbksro) problem, the objective is to minimize , and in the {\em lower-bounded -supplier with outliers} (\lbkso) problem, the objective is to minimize . We obtain an approximation factor of for \lbksro, which improves to for the non-outlier version (i.e., ). These also constitute the {\em first} approximation bounds for the min-sum-of-radii objective when we consider lower bounds and outliers {\em separately}. We apply the primal-dual method to the relaxation where we Lagrangify the constraint. The chief technical contribution and novelty of our algorithm is that, departing from the standard paradigm used for such constrained problems, we obtain an -approximation {\em despite the fact that we do not obtain a Lagrangian-multiplier-preserving algorithm for the Lagrangian relaxation}. We believe that our ideas have {broader applicability to other clustering problems with outliers as well.} We obtain approximation factors of and respectively for \lbkso and its non-outlier version. These are the {\em first} approximation results for -supplier with {\em non-uniform} lower bounds.
Keywords
Cite
@article{arxiv.1608.01700,
title = {Approximation Algorithms for Clustering Problems with Lower Bounds and Outliers},
author = {Sara Ahmadian and Chaitanya Swamy},
journal= {arXiv preprint arXiv:1608.01700},
year = {2016}
}