Generalized Center Problems with Outliers

We study the ℱ-center problem with outliers: Given a metric space (X,d), a general down-closed family ℱ of subsets of X, and a parameter m, we need to locate a subset S ∈ ℱ of centers such that the maximum distance among the closest m points in X to S is minimized. Our main result is a dichotomy the...

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Bibliographic Details
Published in	ACM transactions on algorithms Vol. 15; no. 3; pp. 1 - 14
Main Authors	Chakrabarty, Deeparnab, Negahbani, Maryam
Format	Journal Article
Language	English
Published	New York, NY, USA ACM 01.07.2019
Subjects	Approximation algorithms analysis Design and analysis of algorithms Facility location and clustering Theory of computation Approximation algorithms k-center problem clustering
Online Access	Get full text
ISSN	1549-6325 1549-6333 1549-6333
DOI	10.1145/3338513

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Summary:	We study the ℱ-center problem with outliers: Given a metric space (X,d), a general down-closed family ℱ of subsets of X, and a parameter m, we need to locate a subset S ∈ ℱ of centers such that the maximum distance among the closest m points in X to S is minimized. Our main result is a dichotomy theorem. Colloquially, we prove that there is an efficient 3-approximation for the ℱ-center problem with outliers if and only if we can efficiently optimize a poly-bounded linear function over ℱ subject to a partition constraint. One concrete upshot of our result is a polynomial time 3-approximation for the knapsack center problem with outliers for which no (true) approximation algorithm was known.
ISSN:	1549-6325 1549-6333 1549-6333
DOI:	10.1145/3338513