Near-Linear Time Approximation Schemes for Clustering in Doubling Metrics

Abstract

We consider the classic Facility Location, k-Median, and k-Means problems in metric spaces of doubling dimension d. We give nearly linear-time approximation schemes for each problem. The complexity of our algorithms is 2((1/)/)O(d2) n 4 n + 2O(d) n 9 n, making a significant improvement over the state-of-the-art algorithms which run in time n(d/)O(d). Moreover, we show how to extend the techniques used to get the first efficient approximation schemes for the problems of prize-collecting k-Medians and k-Means, and efficient bicriteria approximation schemes for k-Medians with outliers, k-Means with outliers and k-Center.