The (2,2) and (4,3) properties in families of fat sets in the plane

Abstract

A family of sets satisfies the (p,q) property if among every p members of it some q intersect. Given a number 0<r 1, a set S⊂ R2 is called r-fat if there exists a point c∈ S such that B(c,r) ⊂eq S⊂eq B(c,1), where B(c,r)⊂ R2 is a disk of radius r with center-point c. We prove constant upper bounds C=C(r) on the piercing numbers in families of r-fat sets in R2 that satisfy the (2,2) or the (4,3) properties. This extends results by Danzer and Karasev on the piercing numbers in intersecting families of disks in the plane, as well as a result by Kyncl and Tancer on the piercing numbers in families of units disks in the plane satisfying the (4,3) property.