A Roth type theorem for dense subsets of Rd

Abstract

Let 1 < p < ∞, p≠ 2. We prove that if d≥ dp is sufficiently large, and Ad is a measurable set of positive upper density then there exists 0=0(A) such for all ≥0 there are x,y∈d such that \x,x+y,x+2y\ A and |y|p=, where ||y||p=(Σi |yi|p)1/p is the lp( Rd)-norm of a point y=(y1,…,yd)∈d. This means that dense subsets of d contain 3-term progressions of all sufficiently large gaps when the gap size is measured in the lp-metric. This statement is known to be false in the Euclidean l2-metric as well as in the l1 and ∞-metrics. One of the goals of this note is to understand this phenomenon. A distinctive feature of the proof is the use of multilinear singular integral operators, widely studied in classical time-frequency analysis, in the estimation of forms counting configurations.