Piercing axis-parallel boxes

Abstract

Let be a finite family of axis-parallel boxes in d such that contains no k+1 pairwise disjoint boxes. We prove that if contains a subfamily of k pairwise disjoint boxes with the property that for every F∈ and M∈ with F M ≠ , either F contains a corner of M or M contains 2d-1 corners of F, then can be pierced by O(k) points. One consequence of this result is that if d=2 and the ratio between any of the side lengths of any box is bounded by a constant, then can be pierced by O(k) points. We further show that if for each two intersecting boxes in a corner of one is contained in the other, then can be pierced by at most O(k(k)) points, and in the special case where contains only cubes this bound improves to O(k).