Approximation schemes for Metric Bisection and partitioning

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We design polynomial time approximation schemes (PTASs) for Metric BISECTION, i.e. dividing a given finite metric space into two halves so as to minimize or maximize the sum of distances across the cut. The method extends to partitioning problems with arbitrary size constraints. Our approximation schemes depend on a hybrid placement method and on a new application of linearized quadratic programs.

Wenceslas Fernandez de la Vega, Marek Karpinski, C

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Algorithms | Approximation Schemes | Finite Metric Space | SODA 2004 | Time Approximation Schemes |

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Added	31 Oct 2010
Updated	31 Oct 2010
Type	Conference
Year	2004
Where	SODA
Authors	Wenceslas Fernandez de la Vega, Marek Karpinski, Claire Kenyon

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Approximation schemes for Metric Bisection and partitioning

Algorithms | Approximation Schemes | Finite Metric Space | SODA 2004 | Time Approximation Schemes |

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