The Voronoi Diagram of Weakly Smooth Planar Point Sets in O( n) Deterministic Rounds on the Congested Clique
Abstract
We study the problem of computing the Voronoi diagram of a set of n2 points with O( n)-bit coordinates in the Euclidean plane in a substantially sublinear in n number of rounds in the congested clique model with n nodes. Recently, Jansson et al. have shown that if the points are uniformly at random distributed in a unit square then their Voronoi diagram within the square can be computed in O(1) rounds with high probability (w.h.p.). We show that if a very weak smoothness condition is satisfied by an input set of n2 points with O( n)-bit coordinates in the unit square then the Voronoi diagram of the point set within the unit square can be computed in O( n) rounds in this model.
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