Distributed boundary tracking using alpha and Delaunay-Cech shapes
Abstract
For a given point set in a plane, we develop a distributed algorithm to compute the shape of . shapes are well known geometric objects which generalize the idea of a convex hull, and provide a good definition for the shape of . We assume that the distances between pairs of points which are closer than a certain distance are provided, and we show constructively that this information is sufficient to compute the alpha shapes for a range of parameters, where the range depends on . Such distributed algorithms are very useful in domains such as sensor networks, where each point represents a sensing node, the location of which is not necessarily known. We also introduce a new geometric object called the Delaunay-\v{C}ech shape, which is geometrically more appropriate than an shape for some cases, and show that it is topologically equivalent to shapes.
Cite
@article{arxiv.1302.3982,
title = {Distributed boundary tracking using alpha and Delaunay-Cech shapes},
author = {Harish Chintakunta and Hamid Krim},
journal= {arXiv preprint arXiv:1302.3982},
year = {2013}
}