English

Rough Bilinear Singular Integrals

Classical Analysis and ODEs 2015-09-23 v2

Abstract

We study the rough bilinear singular integral, introduced by Coifman and Meyer , TΩ(f,g)(x)=p.v. ⁣Rn ⁣Rn ⁣(y,z)2nΩ((y,z)/(y,z))f(xy)g(xz)dydz, T_\Omega(f,g)(x)=p.v. \! \int_{\mathbb R^{n}}\! \int_{\mathbb R^{n}}\! |(y,z)|^{-2n} \Omega((y,z)/|(y,z)|)f(x-y)g(x-z) dydz, when Ω\Omega is a function in Lq(S2n1)L^q(\mathbb S^{2n-1}) with vanishing integral and 2q2\le q\le \infty. When q=q=\infty we obtain boundedness for TΩT_\Omega from Lp1(Rn)×Lp2(Rn)L^{p_1}(\mathbb R^n)\times L^{p_2}(\mathbb R^n) to Lp(Rn) L^p(\mathbb R^n) when 1<p1,p2<1<p_1, p_2<\infty and 1/p=1/p1+1/p21/p=1/p_1+1/p_2. For q=2q=2 we obtain that TΩT_\Omega is bounded from L2(Rn)×L2(Rn)L^{2}(\mathbb R^n)\times L^{ 2}(\mathbb R^n) to L1(Rn) L^1(\mathbb R^n) . For qq between 22 and infinity we obtain the analogous boundedness on a set of indices around the point (1/2,1/2,1)(1/2,1/2,1). To obtain our results we introduce a new bilinear technique based on tensor-type wavelet decompositions.

Cite

@article{arxiv.1509.06099,
  title  = {Rough Bilinear Singular Integrals},
  author = {Loukas Grafakos and Danqing He and Petr Honzík},
  journal= {arXiv preprint arXiv:1509.06099},
  year   = {2015}
}

Comments

23 pages

R2 v1 2026-06-22T11:01:14.389Z