On side lengths of corners in positive density subsets of the Euclidean space

Abstract

We generalize a result by Cook, Magyar, and Pramanik [3] on three-term arithmetic progressions in subsets of Rd to corners in subsets of Rd×Rd. More precisely, if 1<p<∞, p≠ 2, and d is large enough, we show that an arbitrary measurable set A⊂eqRd×Rd of positive upper Banach density contains corners (x,y), (x+s,y), (x,y+s) such that the p-norm of the side s attains all sufficiently large real values. Even though we closely follow the basic steps from [3], the proof diverges at the part relying on harmonic analysis. We need to apply a higher-dimensional variant of a multilinear estimate from [5], which we establish using the techniques from [5] and [6].