On multiplicities of interpoint distances

Abstract

Given a set X⊂eqR2 of n points and a distance d>0, the multiplicity of d is the number of times the distance d appears between points in X. Let a1(X) ≥ a2(X) ≥ ·s ≥ am(X) denote the multiplicities of the m distances determined by X and let a(X)=(a1(X),…,am(X)). In this paper, we study several questions from Erdos's time regarding distance multiplicities. Among other results, we show that: (1) If X is convex or ``not too convex'', then there exists a distance other than the diameter that has multiplicity at most n. (2) There exists a set X ⊂eq R2 of n points, such that many distances occur with high multiplicity. In particular, at least n(1/n) distances have superlinear multiplicity in n. (3) For any (not necessarily fixed) integer 1≤ k≤n, there exists X⊂eqR2 of n points, such that the difference between the kth and (k+1)th largest multiplicities is at least (nnk). Moreover, the distances in X with the largest k multiplicities can be prescribed. (4) For every n∈N, there exists X⊂eqR2 of n points, not all collinear or cocircular, such that a(X)= (n-1,n-2,…,1). There also exists Y⊂eqR2 of n points with pairwise distinct distance multiplicities and a(Y) ≠ (n-1,n-2,…,1).