A bilinear Rubio de Francia inequality for arbitrary rectangles

Abstract

Let R be a collection of disjoint dyadic rectangles R with sides parallel to the axes, let πR denote the non-smooth bilinear projection onto R \[ πR (f,g)(x):= 1R(,η) f() g(η) e2π i ( + η) x d dη \] and let r>2. We show that the bilinear Rubio de Francia operator associated to R given by \[ f,g (ΣR∈R |πR (f,g)|r )1/r \] is Lp × Lq → Ls bounded whenever 1/p + 1/q = 1/s, r'<p,q<r. This extends from squares to rectangles a previous result by the same authors, and as a corollary extends in the same way a previous result from Benea and the first author for smooth projections, albeit in a reduced range.