On the boundedness of non-standard rough singular integral operators

TL;DR

This paper investigates the boundedness of a class of rough non-standard singular integral operators with specific kernel properties, establishing new endpoint and weighted inequalities that improve upon previous results.

Contribution

It introduces new boundedness results for rough singular integrals with less restrictive kernel conditions, including endpoint and weighted estimates, using bilinear sparse domination techniques.

Findings

Proves $L ext{-}logL$ endpoint estimates for $T_{ ext{Ω, A}}$.

Establishes $L^p$ boundedness under $L( ext{log}L)^2$ conditions on $ ext{Ω}$.

Provides weighted strong and endpoint inequalities using sparse domination.

Abstract

Let $\Omega$ be homogeneous of degree zero, have vanishing moment of order one on the unit sphere $\mathbb {S}^{d-1}$($d\ge 2$). In this paper, our object of investigation is the following rough non-standard singular integral operator $$T_{\Omega,\,A}f(x)={\rm p.\,v.}\int_{\mathbb{R}^d}\frac{\Omega(x-y)}{|x-y|^{d+1}}\big(A(x)-A(y)-\nabla A(y)(x-y)\big)f(y){\rm d}y,$$ where $A$ is a function defined on $\mathbb{R}^d$ with derivatives of order one in ${\rm BMO}(\mathbb{R}^d)$. We show that $T_{\Omega,\,A}$ enjoys the endpoint $L\log L$ type estimate and is $L^p$ bounded if $\Omega\in L(\log L)^{2}(\mathbb{S}^{d-1})$. These resuts essentially improve the previous known results given by Hofmann for the $L^p$ boundedness of $T_{\Omega,\,A}$ under the condition $\Omega\in L^{q}(\mathbb {S}^{d-1})$ $(q>1)$, Hu and Yang for the endpoint weak $L\log L$ type estimates when $\Omega\in {\rm Lip}_{\alpha}(\mathbb{S}^{d-1})$ for some $\alpha\in (0,\,1]$. Quantitative weighted strong and endpoint weak $L\log L$ type inequalities are proved whenever $\Omega\in L^{\infty}(\mathbb {S}^{d-1})$. The analysis of the weighted results relies heavily on two bilinear sparse dominations of $T_{\Omega,\,A}$ established herein.