About an Erdos-Gr\"unbaum conjecture concerning piercing of non bounded convex sets
Abstract
In this paper, we study the number of compact sets needed in an infinite family of convex sets with a local intersection structure to imply a bound on its piercing number, answering a conjecture of Erdos and Gr\"unbaum. Namely, if in an infinite family of convex sets in Rd we know that out of every p there are q which are intersecting, we determine if having some compact sets implies a bound on the number of points needed to intersect the whole family. We also study variations of this problem.
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