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SODA
2001
ACM
2001
ACM
Approximation algorithms for TSP with neighborhoods in the plane
In the Euclidean TSP with neighborhoods (TSPN), we are given a collection of n regions (neighborhoods) and we seek a shortest tour that visits each region. As a generalization of the classical Euclidean TSP, TSPN is also NP-hard. In this paper, we present new approximation results for the TSPN, including (1) a constant-factor approximation algorithm for the case of arbitrary connected neighborhoods having comparable diameters; and (2) a PTAS for the important special case of disjoint unit disk neighborhoods (or nearly disjoint, nearly-unit disks). Our methods also yield improved approximation ratios for various special classes of neighborhoods, which have previously been studied. Further, we give a linear-time O(1)-approximation algorithm for the case of neighborhoods that are (infinite) straight lines.
Real-time TrafficAlgorithms | Arbitrary Connected Neighborhoods | Classical Euclidean Tsp | Euclidean TSP | SODA 2001 |
Related Content
| Added | 31 Oct 2010 |
| Updated | 31 Oct 2010 |
| Type | Conference |
| Year | 2001 |
| Where | SODA |
| Authors | Adrian Dumitrescu, Joseph S. B. Mitchell |
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