Balanced Islands in Two Colored Point Sets in the Plane

Abstract

Let S be a set of n points in general position in the plane, r of which are red and b of which are blue. In this paper we prove that there exist: for every α ∈ [ 0,12 ], a convex set containing exactly α r red points and exactly α b blue points of S; a convex set containing exactly r+12 red points and exactly b+12 blue points of S. Furthermore, we present polynomial time algorithms to find these convex sets. In the first case we provide an O(n4) time algorithm and an O(n2 n) time algorithm in the second case. Finally, if α r+ α b is small, that is, not much larger than 13n, we improve the running time to O(n n).