CEREZO , André

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In this paper, we propose an algorithm to compute the Delaunay triangulation of a set of n points in 3-dimensional space when the points lie in 2 planes. The algorithm is output-sensitive and optimal with respect to the input and the output sizes. Its time complexity is O(n log n+t), where t is the size of the output, and the extra storage is O(n).

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International audience

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We present an algorithm which computes the convex hull of a set of spheres in dimension d in time O(n^ceil(d/2)+n log n). It is worst case optimal in three dimensions and in even dimensions. The same method can also be used to compute the convex hull of a set of n homethetic objects of Ed. If the complexity of each object is constant, the time...