English

Improved estimates for bilinear rough singular integrals

Classical Analysis and ODEs 2022-07-14 v4

Abstract

We study bilinear rough singular integral operators LΩ\mathcal{L}_{\Omega} associated with a function Ω\Omega on the sphere S2n1\mathbb{S}^{2n-1}. In the recent work of Grafakos, He, and Slav\'ikov\'a (Math. Ann. 376: 431-455, 2020), they showed that LΩ\mathcal{L}_{\Omega} is bounded from L2×L2L^2\times L^2 to L1L^1, provided that ΩLq(S2n1)\Omega\in L^q(\mathbb{S}^{2n-1}) for 4/3<q4/3<q\le \infty with mean value zero. In this paper, we provide a generalization of their result. We actually prove Lp1×Lp2LpL^{p_1}\times L^{p_2}\to L^p estimates for LΩ\mathcal{L}_{\Omega} under the assumption ΩLq(S2n1) for  max(  43  ,  p2p1  )<q\Omega\in L^q(\mathbb{S}^{2n-1}) \quad \text{ for }~\max{\Big(\;\frac{4}{3}\;,\; \frac{p}{2p-1} \;\Big)<q\le \infty} where 1<p1,p21<p_1,p_2\le\infty and 1/2<p<1/2<p<\infty with 1/p=1/p1+1/p21/p=1/p_1+1/p_2 . Our result improves that of Grafakos, He, and Honz\'ik (Adv. Math. 326: 54-78, 2018), in which the more restrictive condition ΩL(S2n1)\Omega\in L^{\infty}(\mathbb{S}^{2n-1}) is required for the Lp1×Lp2LpL^{p_1}\times L^{p_2}\to L^p boundedness.

Keywords

Cite

@article{arxiv.2104.14137,
  title  = {Improved estimates for bilinear rough singular integrals},
  author = {Danqing He and Bae Jun Park},
  journal= {arXiv preprint arXiv:2104.14137},
  year   = {2022}
}

Comments

Minor revision. To appear in Math. Ann

R2 v1 2026-06-24T01:37:17.520Z