Piercing Diametral Disks Induced by Edges of Maximum Spanning Tree

Abstract

Let P be a set of points in the plane and let T be a maximum-weight spanning tree of P. For an edge (p,q), let Dpq be the diametral disk induced by (p,q), i.e., the disk having the segment pq as its diameter. Let DT be the set of the diametral disks induced by the edges of T. In this paper, we show that one point is sufficient to pierce all the disks in DT, thus, the set DT is Helly. Actually, we show that the center of the smallest enclosing circle of P is contained in all the disks of DT, and thus the piercing point can be computed in linear time.