English

Weighted Estimates for Rough Bilinear Singular Integrals via Sparse Domination

Classical Analysis and ODEs 2017-06-21 v3

Abstract

We prove weighted estimates for rough bilinear singular integral operators with kernel K(y1,y2)=Ω((y1,y2)/(y1,y2))(y1,y2)2d,K(y_1, y_2) = \frac{\Omega((y_1,y_2)/|(y_1,y_2)|)}{|(y_1, y_2)|^{2d}}, where yiRdy_i \in \mathbb{R}^{d} and ΩL(S2d1)\Omega \in L^{\infty}(S^{2d-1}) with S2d1Ωdσ=0.\int_{S^{2d-1}}\Omega d\sigma = 0. The argument is by sparse domination of rough bilinear operators, via an abstract theorem that is a multilinear generalization of recent work by Conde-Alonso, Culiuc, Di Plinio and Ou. We also use recent results due to Grafakos, He, and Honz\'{\i}k for the application to rough bilinear operators. In particular, since the weighted estimates are proved via sparse domination, we obtain some quantitative estimates in terms of the ApA_{p} characteristics of the weights. The abstract theorem is also shown to apply to multilinear Calder\'{o}n-Zygmund operators with a standard smoothness assumption. Due to the generality of the sparse domination theorem, future applications not considered in this paper are expected.

Keywords

Cite

@article{arxiv.1702.04790,
  title  = {Weighted Estimates for Rough Bilinear Singular Integrals via Sparse Domination},
  author = {Alexander Barron},
  journal= {arXiv preprint arXiv:1702.04790},
  year   = {2017}
}

Comments

31 pages, final version

R2 v1 2026-06-22T18:19:41.076Z