Multi-parameter projection theorems with applications to sums-products and finite point configurations in the Euclidean setting

Abstract

In this paper we study multi-parameter projection theorems for fractal sets. With the help of these estimates, we recover results about the size of A · A+...+A · A, where A is a subset of the real line of a given Hausdorff dimension, A+A=\a+a': a,a' ∈ A \ and A · A=\a · a': a,a' ∈ A\. We also use projection results and inductive arguments to show that if a Hausdorff dimension of a subset of Rd is sufficiently large, then the k+1 2-dimensional Lebesgue measure of the set of k-simplexes determined by this set is positive. The sharpness of these results and connection with number theoretic estimates is also discussed.