The Geometric Dilation of Finite Point Sets |
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| Authors: | Annette Ebbers-Baumann Ansgar Grune Rolf Klein |
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| Affiliation: | (1) Universitat Bonn, Institut fur Informatik I, D-53117 Bonn, Germany |
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| Abstract: | Let G be an embedded planar graph whose edges may be curves. For two arbitrary points of G, we can compare the length of the shortest path in G connecting them against their Euclidean distance. The supremum of all these ratios is called the geometric dilation of G. Given a finite point set, we would like to know the smallest possible dilation of any graph that contains the given points. In this paper we prove that a dilation of 1.678 is always sufficient, and that π/2 = 1.570... is sometimes necessary in order to accommodate a finite set of points. |
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| Keywords: | Computational geometry Detour Dilation Graph Network Spanner Stretch factor Transportation network |
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