Favourite distances in high dimensions

Abstract

Let S be a set of n points in d-dimensional Euclidean space. Assign to each x∈ S an arbitrary distance r(x)>0. Let er(x,S) denote the number of points in S at distance r(x) from x. Avis, Erd\"os and Pach (1988) introduced the extremal quantity fd(n)=Σx∈ Ser(x,S), where the maximum is taken over all n-point sets S in d-dimensional space and all assignments r S(0,∞) of distances. We give a quick derivation of the asymptotics of the error term of fd(n) using only the analogous asymptotics of the maximum number of unit distance pairs in a set of n points, which improves on previous results of Avis, Erd\"os and Pach (1988) and Erd\"os and Pach (1990). Then we prove a stability result for d≥ 4, asserting that if (S,r) with |S|=n satisfies er(S)=fd(n)-o(n2), then, up to o(n) points, S is a Lenz construction with r constant. Finally we use stability to show that for n sufficiently large (depending on d) the pairs (S,r) that attain fd(n) are up to scaling exactly the Lenz constructions that maximise the number of unit distance pairs with r 1, with some exceptions in dimension 4. Analogous results hold for the furthest neighbour digraph, where r is fixed to be r(x)=y∈ S |xy| for x∈ S.