English

Sparse Domination for Bi-Parameter Operators Using Square Functions

Classical Analysis and ODEs 2017-09-18 v1

Abstract

Let SS be the dyadic bi-parameter square function Sf(x)2=RDf,hR21R(x)R.Sf(x)^{2} = \sum_{R \in \mathcal{D}} |\langle f, h_{R} \rangle|^{2} \frac{1_{R}(x)}{|R|}. We prove that if TT is a bi-parameter martingale transform and f,gf,g are suitable test functions, then there exists a sparse collection of rectangles S\mathcal{S} such that Tf,gRSR(Sf)R(Sg)R.|\langle Tf, g \rangle| \lesssim \sum_{R \in \mathcal{S}} |R|(Sf)_{R}(Sg)_{R}. We also extend this estimate to the case where TT is a bi-parameter cancellative dyadic shift and when TT is a paraproduct-free singular integral of Journ\'{e} type. Weighted estimates follow from the domination.

Keywords

Cite

@article{arxiv.1709.05009,
  title  = {Sparse Domination for Bi-Parameter Operators Using Square Functions},
  author = {Alexander Barron and Jill Pipher},
  journal= {arXiv preprint arXiv:1709.05009},
  year   = {2017}
}
R2 v1 2026-06-22T21:43:49.150Z