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IPCO
2001
2001
Approximate k-MSTs and k-Steiner Trees via the Primal-Dual Method and Lagrangean Relaxation
Garg [10] gives two approximation algorithms for the minimum-cost tree spanning k vertices in an undirected graph. Recently Jain and Vazirani [16] discovered primal-dual approximation algorithms for the metric uncapacitated facility location and k-median problems. In this paper we show how Garg's algorithms can be explained simply with ideas introduced by Jain and Vazirani, in particular via a Lagrangean relaxation technique together with the primal-dual method for approximation algorithms. We also derive a constant factor approximation algorithm for the k-Steiner tree problem using these ideas, and point out the common features of these problems that allow them to be solved with similar techniques.
Real-time TrafficApproximation Algorithm | Constant Factor Approximation Algorithm | IPCO 2001 | IPCO 2007 | Primal-dual Approximation Algorithms |
| Added | 31 Oct 2010 |
| Updated | 31 Oct 2010 |
| Type | Conference |
| Year | 2001 |
| Where | IPCO |
| Authors | Fabián A. Chudak, Tim Roughgarden, David P. Williamson |
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