On the number of radial orderings of planar point sets

Abstract

Given a set S of n points in the plane, a radial ordering of S with respect to a point p (not in S) is a clockwise circular ordering of the elements in S by angle around p. If S is two-colored, a colored radial ordering is a radial ordering of S in which only the colors of the points are considered. In this paper, we obtain bounds on the number of distinct non-colored and colored radial orderings of S. We assume a strong general position on S, not three points are collinear and not three lines---each passing through a pair of points in S---intersect in a point of 2 S. In the colored case, S is a set of 2n points partitioned into n red and n blue points, and n is even. We prove that: the number of distinct radial orderings of S is at most O(n4) and at least (n3); the number of colored radial orderings of S is at most O(n4) and at least (n); there exist sets of points with (n4) colored radial orderings and sets of points with only O(n2) colored radial orderings.