On Helly numbers of exponential lattices

Abstract

Given a set S ⊂eq R2, define the Helly number of S, denoted by H(S), as the smallest positive integer N, if it exists, for which the following statement is true: for any finite family F of convex sets in~R2 such that the intersection of any N or fewer members of~F contains at least one point of S, there is a point of S common to all members of F. We prove that the Helly numbers of exponential lattices \αn n ∈ N0\2 are finite for every α>1 and we determine their exact values in some instances. In particular, we obtain H(\2n n ∈ N0\2)=5, solving a problem posed by Dillon (2021). For real numbers α, β > 1, we also fully characterize exponential lattices L(α,β) = \αn n ∈ N0\ × \βn n ∈ N0\ with finite Helly numbers by showing that H(L(α,β)) is finite if and only if α(β) is rational.