Pointwise localization and sharp weighted bounds for Rubio de Francia square functions

Abstract

Let Hω f be the Fourier restriction of f∈ L2(R) to an interval ω⊂ R. If is an arbitrary collection of pairwise disjoint intervals, the square function of \Hω f: ω ∈ \ is termed the Rubio de Francia square function T. This article proves a pointwise bound for T f by a sparse operator involving local L2-averages. A pointwise bound for the smooth version of T by a sparse square function is also proved. These pointwise localization principles lead to quantified Lp(w), p>2 and weak Lp(w), p≥ 2 norm inequalities for T. In particular, the obtained weak Lp(w) norm bounds are new for p≥ 2 and sharp for p>2. The proofs rely on sparse bounds for abstract balayages of Carleson sequences, local orthogonality and very elementary time-frequency analysis techniques. The paper also contains two results related to the outstanding conjecture that T is bounded on L2(w) if and only if w∈ A1. The conjecture is verified for radially decreasing even A1 weights, and in full generality for the Walsh group analogue of T.