On Clustering to Minimize the Sum of Radii

Date

2012-01-05

Authors

Gibson, Matt
Kanade, Gaurav
Krohn, Erik
Pirwani, Imran
Varadarajan, Kasturi

Journal Title

Journal ISSN

Volume Title

Publisher

Society for Industrial and Applied Mathematics

Abstract

Let P be a set of n points in the plane. Consider the problem of finding k disks, each centered at a point in P, whose union covers P with the objective of minimizing the sum of the radii of the disks. We present an exact algorithm for this well-studied problem with polynomial running time, under the assumption that two candidate solutions can be compared efficiently. The algorithm generalizes in a straightforward manner to any fixed dimension and to some other related problems.

Description

A preliminary version of this paper appeared in the 18th ACM-SIAMSymposium on Discrete Algorithms (SODA), San Francisco, CA, 2008, pp. 819–825.

Keywords

k-clustering, min-cost k-cover, minimum sum of radii cover

Citation

Department

Computer Science