Approximating k-median via pseudo-approximation

Shi Li; Ola Svensson

doi:10.1145/2488608.2488723

Approximating k-median via pseudo-approximation

Shi Li
, Ola Svensson

Department of Computer Science and Engineering

University at Buffalo

Swiss Federal Institute of Technology Lausanne

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

109 Scopus citations

Abstract

We present a novel approximation algorithm for k-median that achieves an approximation guarantee of 1 + √3 + ε, improving upon the decade-old ratio of 3+ε. Our approach is based on two components, each of which, we believe, is of independent interest. First, we show that in order to give an α-approximation algorithm for k-median, it is sufficient to give a pseudo- approximation algorithm that finds an α-approximate solu- tion by opening k+O(1) facilities. This is a rather surprising result as there exist instances for which opening k + 1 facil- ities may lead to a significant smaller cost than if only k facilities were opened. Second, we give such a pseudo-approximation algorithm with α = 1+ √3+ε. Prior to our work, it was not even known whether opening k + o(k) facilities would help improve the approximation ratio.

Original language	English
Title of host publication	STOC 2013 - Proceedings of the 2013 ACM Symposium on Theory of Computing
Pages	901-910
Number of pages	10
DOIs	https://doi.org/10.1145/2488608.2488723
State	Published - 2013
Event	45th Annual ACM Symposium on Theory of Computing, STOC 2013 - Palo Alto, CA, United States Duration: Jun 1 2013 → Jun 4 2013

Publication series

Name	Proceedings of the Annual ACM Symposium on Theory of Computing

Conference

Conference	45th Annual ACM Symposium on Theory of Computing, STOC 2013
Country/Territory	United States
City	Palo Alto, CA
Period	06/1/13 → 06/4/13

Keywords

Approximation algorithms
Combinatorial optimization
K- median
Network location problems

Access to Document

10.1145/2488608.2488723

Cite this

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title = "Approximating k-median via pseudo-approximation",

abstract = "We present a novel approximation algorithm for k-median that achieves an approximation guarantee of 1 + √3 + ε, improving upon the decade-old ratio of 3+ε. Our approach is based on two components, each of which, we believe, is of independent interest. First, we show that in order to give an α-approximation algorithm for k-median, it is sufficient to give a pseudo- approximation algorithm that finds an α-approximate solu- tion by opening k+O(1) facilities. This is a rather surprising result as there exist instances for which opening k + 1 facil- ities may lead to a significant smaller cost than if only k facilities were opened. Second, we give such a pseudo-approximation algorithm with α = 1+ √3+ε. Prior to our work, it was not even known whether opening k + o(k) facilities would help improve the approximation ratio.",

keywords = "Approximation algorithms, Combinatorial optimization, K- median, Network location problems",

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AB - We present a novel approximation algorithm for k-median that achieves an approximation guarantee of 1 + √3 + ε, improving upon the decade-old ratio of 3+ε. Our approach is based on two components, each of which, we believe, is of independent interest. First, we show that in order to give an α-approximation algorithm for k-median, it is sufficient to give a pseudo- approximation algorithm that finds an α-approximate solu- tion by opening k+O(1) facilities. This is a rather surprising result as there exist instances for which opening k + 1 facil- ities may lead to a significant smaller cost than if only k facilities were opened. Second, we give such a pseudo-approximation algorithm with α = 1+ √3+ε. Prior to our work, it was not even known whether opening k + o(k) facilities would help improve the approximation ratio.

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KW - Combinatorial optimization

KW - K- median

KW - Network location problems

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Approximating k-median via pseudo-approximation

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Keywords

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