Improved Algorithms for the Bichromatic Two-Center Problem for Pairs of Points

Abstract

We consider a bichromatic two-center problem for pairs of points. Given a set S of n pairs of points in the plane, for every pair, we want to assign a red color to one point and a blue color to the other, in such a way that the value \r1,r2\ is minimized, where r1 (resp., r2) is the radius of the smallest enclosing disk of all red (resp., blue) points. Previously, an exact algorithm of O(n32 n) time and a (1+)-approximate algorithm of O(n + (1/)6 2 (1/)) time were known. In this paper, we propose a new exact algorithm of O(n22 n) time and a new (1+)-approximate algorithm of O(n + (1/)3 2 (1/)) time.