Group actions and a multi-parameter Falconer distance problem

Abstract

In this paper we study the following multi-parameter variant of the celebrated Falconer distance problem. Given d=(d1,d2, …, d)∈ N with d1+d2+…+d=d and E ⊂eq Rd, we define d(E) = \ (|x(1)-y(1)|,…,|x()-y()|) : x,y ∈ E \ ⊂eq R, where for x∈ Rd we write x=( x(1),…, x() ) with x(i) ∈ Rdi. We ask how large does the Hausdorff dimension of E need to be to ensure that the -dimensional Lebesgue measure of d(E) is positive? We prove that if 2 ≤ di for 1 ≤ i ≤ , then the conclusion holds provided (E)>d- di2+13. We also note that, by previous constructions, the conclusion does not in general hold if (E)<d- di2. A group action derivation of a suitable Mattila integral plays an important role in the argument.