Classification of crescent configurations

Abstract

Let n points be in crescent configurations in Rd if they lie in general position in Rd and determine n-1 distinct distances, such that for every 1 ≤ i ≤ n-1 there is a distance that occurs exactly i times. Since Erdos' conjecture in 1989 on the existence of N sufficiently large such that no crescent configurations exist on N or more points, he, Pomerance, and Pal\'asti have given constructions for n up to 8 but nothing is yet known for n ≥ 9. Most recently, Burt et. al. had proven that a crescent configuration on n points exists in Rn-2 for n ≥ 3. In this paper, we study the classification of these configurations on 4 and 5 points through graph isomorphism and rigidity. Our techniques, which can be generalized to higher dimensions, offer a new viewpoint on the problem through the lens of distance geometry and provide a systematic way to construct crescent configurations.