Weighted estimates for the Calder\'on commutator

TL;DR

This paper establishes weighted norm inequalities and endpoint estimates for the Calderón commutator using sparse domination techniques, advancing the understanding of its boundedness in weighted Lebesgue spaces.

Contribution

The paper introduces new weighted bounds for the Calderón commutator by dominating it with sparse operators, providing the first such estimates in this context.

Findings

Weighted bounds from multiple $L^{p}$ spaces to weighted $L^{p}$ spaces.

Weighted weak type endpoint estimates for the Calderón commutator.

Extension of sparse domination techniques to this class of operators.

Abstract

In this paper, the authors establish some weighted estimates for the Calder\'on commutator defined by \begin{eqnarray*} &&\mathcal{C}_{m+1,\,A}(a_1,\dots,a_{m};f)(x) &&\quad={\rm p.\,v.}\,\int_{\mathbb{R}}\frac{P_2(A;\,x,\,y)\prod_{j=1}^m(A_j(x)-A_j(y))}{(x-y)^{m+2}}f(y){\rm d}y, \end{eqnarray*} with $P_2(A;\,x,\,y)=A(x)-A(y)-A'(y)(x-y)$. Dominating this operator by multi(sub)linear sparse operators, the authors establish the weighted bounds from $L^{p_1}(\mathbb{R},w_1)$ $\times\dots\times L^{p_m}(\mathbb{R},w_m)$ to $L^{p}(\mathbb{R},\nu_{\vec{w}})$, with $p_1,\dots,p_m \in (1,\,\infty)$, $1/p=1/p_1+\dots+1/p_m$, and $\vec{w}=(w_1,\,\dots,\,w_m)\in A_{\vec{P}}(\mathbb{R}^{m+1})$. The authors also obtain the weighted weak type endpoint estimates for this operator