Sets in Rd with slow-decaying density that avoid an unbounded collection of distances

Abstract

For any d∈ N and any function f:(0,∞) [0,1] with f(R) 0 as R ∞, we construct a set A ⊂eq Rd and a sequence Rn ∞ such that \|x-y\| ≠ Rn for all x,y∈ A and μ(A BRn)≥ f(Rn)μ(BRn) for all n∈ N, where BR is the ball of radius R centered at the origin and μ is Lebesgue measure. This construction exhibits a form of sharpness for a result established independently by Furstenberg-Katznelson-Weiss, Bourgain, and Falconer-Marstrand, and it generalizes to any metric induced by a norm on Rd.