Matching points with rectangles and squares

Abstract

In this paper we deal with the following natural family of geometric matching problems. Given a class C of geometric objects and a point set P, a C-matching is a set M ⊆C such that every C ∈ M contains exactly two elements of P. The matching is perfect if it covers every point, and strong if the objects do not intersect. We concentrate on matching points using axis-aligned squares and rectangles. We give algorithms for these classes and show that it is NP-hard to decide whether a point set has a perfect strong square matching. We show that one of our matching algorithms solves a family of map-labeling problems