Deterministic 7/8-Approximation for the Metric Maximum TSP

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We present the first 7/8-approximation algorithm for the maximum traveling salesman problem with triangle inequality. Our algorithm is deterministic. This improves over both the randomized algorithm of Hassin and Rubinstein [2] with expected approximation ratio of 7/8-O(n-1/2) and the deterministic (7/8-O(n-1/3))approximation algorithm of Chen and Nagoya [1]. In the new algorithm, we extend the approach of processing local configurations using so-called loose-ends, which we introduced in [4].

Lukasz Kowalik, Marcin Mucha

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7/8-approximation Algorithm | Algorithm | Algorithms | APPROX 2008 | Maximum Traveling Salesman |

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Added	12 Oct 2010
Updated	12 Oct 2010
Type	Conference
Year	2008
Where	APPROX
Authors	Lukasz Kowalik, Marcin Mucha

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Deterministic 7/8-Approximation for the Metric Maximum TSP

7/8-approximation Algorithm | Algorithm | Algorithms | APPROX 2008 | Maximum Traveling Salesman |

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