Small Strong Epsilon Nets

Abstract

Let P be a set of n points in Rd. A point x is said to be a centerpoint of P if x is contained in every convex object that contains more than dn d+1 points of P. We call a point x a strong centerpoint for a family of objects C if x ∈ P is contained in every object C ∈ C that contains more than a constant fraction of points of P. A strong centerpoint does not exist even for halfspaces in R2. We prove that a strong centerpoint exists for axis-parallel boxes in Rd and give exact bounds. We then extend this to small strong ε-nets in the plane and prove upper and lower bounds for εiS where S is the family of axis-parallel rectangles, halfspaces and disks. Here εiS represents the smallest real number in [0,1] such that there exists an εiS-net of size i with respect to S.