No Infinite (p,q)-Theorem for Piercing Compact Convex Sets with Lines in R3

Abstract

An infinite (p,q)-theorem, or an (0,q)-theorem, involving two families F and G of sets, states that if in every infinite subset of F, there are q sets that are intersected by some set in G, then there is a finite set SF⊂eqG such that for every C∈F, there is a B∈ SF with C B≠. We provide an example demonstrating that there is no (0,q)-theorem for piercing compact convex sets in R3 with lines by constructing a family F of compact convex sets such that it does not have a finite line transversal, but for any t∈N, every infinite subset of F contains t sets that are pierced by a line.