Measure and Dimension of Sums and Products

Abstract

We investigate the Lebesgue measure, Hausdorff dimension, and Fourier dimension of sets of the form RY + Z, where R ⊂eq (0,∞) and Y, Z ⊂eq Rd. We prove a theorem on the Lebesgue measure and Hausdorff dimension of RY+Z; The theorem is a generalized variant of some theorems of Wolff and Oberlin in which Y is the unit sphere, but its proof is much simpler. We also prove a deeper existence theorem: For each α ∈ [0,1] and for each non-empty compact set R ⊂eq (0,∞), there exists a compact set Y ⊂eq [1,2] such that F(Y) = H(Y) = M(Y) = α and F(RY) ≥ \ 1, F(R) + F(Y)\. This theorem verifies a weak form of a more general conjecture, and it can be used to produce new Salem sets from old ones.