Quantitative weighted estimates for Rubio de Francia's Littlewood--Paley square function

Abstract

We consider the Rubio de Francia's Littlewood--Paley square function associated with an arbitrary family of intervals in R with finite overlapping. Quantitative weighted estimates are obtained for this operator. The linear dependence on the characteristic of the weight [w]Ap/2 turns out to be sharp for 3 p<∞, whereas the sharpness in the range 2<p<3 remains as an open question. Weighted weak-type estimates in the endpoint p=2 are also provided. The results arise as a consequence of a sparse domination shown for these operators, obtained by suitably adapting the ideas coming from Benea (2015) and Culiuc et al. (2016).