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Universität Bonn -> Institut für Informatik -> Abteilung V | ||
CS-APX-Reports 2000 | Copyright 2000 Universität Bonn, Institut für Informatik, Abt. V | |
8964 December 4, 2000 |
Approximation Hardness of TSP with Bounded Metrics
Lars Engebretsen and Marek Karpinski [Download PostScript] [Download PDF] The general asymmetric (and metric) TSP is known to be approximable only to within an O(log n) factor, and is also known to be approximable within a constant factor as soon as the metric is bounded. In this paper we study the asymmetric and symmetric TSP problems with bounded metrics and prove approximation lower bounds of 54/53 and 131/130, respectively, for these problems. We prove also approximation lower bounds of 321/320 and 743/742 for the asymmetric and symmetric TSP with distances one and two, improving over the previous best lower bounds of 2805/2804 and 5381/5380 of Engebretsen for the case of distances one and two, by the order of magnitude. Furthermore, one of our constructions can be used to improve a recent lower bound of Papadimitriou and Vempala for the case of symmetric TSP with unbounded metric. |
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Last Change:
11/05/14 at 10:16:07
English |
Universität Bonn -> Institut für Informatik -> Abteilung V |