Nearly k-distance sets

Abstract

We say that a set of points S⊂ Rd is an -nearly k-distance set if there exist 1 t1 … tk, such that the distance between any two distinct points in S falls into [t1,t1+]…[tk,tk+]. In this paper, we study the quantity Mk(d) = 0\|S|\ :\ S is an -nearly k -distance set in Rd\ and its relation to the classical quantity mk(d): the size of the largest k-distance set in Rd. We obtain that Mk(d) = mk(d) for k=2,3, as well as for any fixed k, provided that d is sufficiently large. The last result answers a question, proposed by Erdos, Makai and Pach. We also address a closely related Tur\'an-type problem, studied by Erdos, Makai, Pach, and Spencer in the 80's: given n points in Rd, how many pairs of them form a distance that belongs to [t1,t1+1]…[tk,tk+1], where t1,…, tk are fixed and any two points in the set are at distance at least 1 apart? We establish the connection between this quantity and a quantity closely related to Mk(d-1), as well as obtain an exact answer for the same ranges k,d as above.