$L^{p}$ estimates and weighted estimates of fractional maximal rough singular integrals on homogeneous groups

TL;DR

This paper establishes $L^{p}$ and weighted $L^{p}(w)$ bounds for fractional maximal rough singular integrals on homogeneous groups, extending previous results and providing quantitative weighted estimates under certain kernel conditions.

Contribution

It proves new $L^{p}$ and weighted bounds for fractional maximal rough singular integrals on homogeneous groups, including explicit weighted inequalities with kernel regularity assumptions.

Findings

Proved $L^{p}$ boundedness for fractional maximal rough singular integrals.

Established weighted $L^{p}(w)$ bounds with explicit dependence on $A_{p}$ weights.

Extended known results to the setting of homogeneous groups with kernel regularity conditions.

Abstract

In this paper, we study the $L^{p}$ boundedness and $L^{p}(w)$ boundedness ($1<p<\infty$ and $w$ a Muckenhoupt $A_{p}$ weight) of fractional maximal singular integral operators $T_{\Omega,\alpha}^{\#}$ with homogeneous convolution kernel $\Omega(x)$ on an arbitrary homogeneous group $\mathbb H$ of dimension $\mathbb{Q}$. We show that if $0<\alpha<\mathbb{Q}$, $\Omega\in L^{1}(\Sigma)$ and satisfies the cancellation condition of order $[\alpha]$, then for any $1<p<\infty$, \begin{align*} \|T_{\Omega,\alpha}^{\#}f\|_{L^{p}(\mathbb{H})}\lesssim\|\Omega\|_{L^{1}(\Sigma)}\|f\|_{L_{\alpha}^{p}(\mathbb{H})}, \end{align*} where for the case $\alpha=0$, the $L^p$ boundedness of rough singular integral operator and its maximal operator were studied by Tao (\cite{Tao}) and Sato (\cite{sato}), respectively. We also obtain a quantitative weighted bound for these operators. To be specific, if $0\leq\alpha<\mathbb{Q}$ and $\Omega$ satisfies the same cancellation condition but a stronger condition that $\Omega\in L^{q}(\Sigma)$ for some $q>\mathbb{Q}/\alpha$, then for any $1<p<\infty$ and $w\in A_{p}$, \begin{align*} \|T_{\Omega,\alpha}^{\#}f\|_{L^{p}(w)}\lesssim\|\Omega\|_{L^{q}(\Sigma)}\{w\}_{A_p}(w)_{A_p}\|f\|_{L_{\alpha}^{p}(w)},\ \ 1<p<\infty. \end{align*}