Convex Hulls, Triangulations, and Voronoi Diagrams of Planar Point Sets on the Congested Clique

Abstract

We consider geometric problems on planar n2-point sets in the congested clique model. Initially, each node in the n-clique network holds a batch of n distinct points in the Euclidean plane given by O( n)-bit coordinates. In each round, each node can send a distinct O( n)-bit message to each other node in the clique and perform unlimited local computations. We show that the convex hull of the input n2-point set can be constructed in O(\ h, n\) rounds, where h is the size of the hull, on the congested clique. We also show that a triangulation of the input n2-point set can be constructed in O(2n) rounds on the congested clique. Finally, we demonstrate that the Voronoi diagram of n2 points with O( n)-bit coordinates drawn uniformly at random from a unit square can be computed within the square with high probability in O(1) rounds on the congested clique.