The Minkowski grid has robustly many repeated distances
Abstract
We show that there exists a constant δ> 0 such that for any positive integer n there exists a set of n points P ⊂ R2 with the following property: for every subset A ⊂eq P of size |A| ≥ 2, \[ λ>0 \#\(a,b)∈ A × A: a b,\ a-b=λ\ |A|2n1-δ.\] Our result is a vertical amplification of a robust Ramanujan estimate recently established by Croot-Mao-Pohoata-Sheffer-Yip for arbitrary subsets of the ordinary square grid, and is inspired by recent constructions for the Erdős unit distance problem and the Elekes-Rónyai problem. Taking A=P, the inequality above gives a distance occurring n1+δ times in P; thereby a scaled copy of P is a counterexample for the unit-distance conjecture. In addition, the same inequality shows that (1) all subsets of P of size n1-δ must contain isosceles triangles, and (2) all subsets of P of size n1/2-δ must contain repeated distances. These features give polynomially improved estimates for old problems of Erdős. The existence of a set satisfying property (1) confirms a conjecture of Erdős from 1980, whereas the existence of a set with property (2) answers a question of Conlon-Fox-Gasarch-Harris-Ulrich-Zbarsky in the negative.
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