Maximal operators on spaces BMO and BLO
Abstract
We consider maximal kernel-operators on abstract measure spaces equipped with a ball-basis. We prove that under certain asymptotic condition on the kernels those operators maps boundedly BMO(X) into BLO(X), generalizing the well-known results of Bennett-DeVore-Sharpley and Bennett for the Hardy-Littlewood maximal function. As a particular case of such an operator one can consider the maximal function \begin{equation} M_\phi f(x)=\sup_{r>0}\frac{1}{r^d}\int_{R^d}|f(t)|\phi\left(\frac{x-t}{r}\right)dt, \end{equation} and its non-tangential version. Here is a bounded spherical function on , decreasing with respect to and satisfying the bound \begin{equation*} \int_{R^d}\phi (x)\log (2+|x|)dx<\infty. \end{equation*} We prove that if and is not identically infinite, then . Our main result is an inequality, providing an estimation of certain local oscillation of the maximal function by a local sharp function of .
Cite
@article{arxiv.2502.05882,
title = {Maximal operators on spaces BMO and BLO},
author = {Grigori A. Karagulyan},
journal= {arXiv preprint arXiv:2502.05882},
year = {2025}
}
Comments
24 pages. arXiv admin note: text overlap with arXiv:2308.02672