Weighted Local Estimates for Singular Integral Operators
Abstract
A local median decomposition is used to prove that a weighted local mean of a function is controlled by a weighted local mean of its local sharp maximal function. Together with (a local version of) the estimate for Calder\'{o}n-Zygmund singular integral operators, this allows us to express the local weighted integral control of by . Similar estimates hold for replaced by singular integrals with kernels satisfying H\"{o}rmander-type conditions or integral operators with homogeneous kernels, and replaced by an appropriate maximal function . Using sharper bounds in the local median decomposition we prove two-weight, - estimates for singular integral operators for . In all cases, the results include weights that are not necessarily . The local nature of these estimates leads to results involving weighted generalized Orlicz-Campanato and Orlicz-Morrey spaces.
Cite
@article{arxiv.1308.1134,
title = {Weighted Local Estimates for Singular Integral Operators},
author = {Jonathan Poelhuis and Alberto Torchinsky},
journal= {arXiv preprint arXiv:1308.1134},
year = {2013}
}
Comments
53 pages; Theorem 6.6 now gives two-weight, $L^p_v$-$L^q_w$ estimates with $1 < p \leq q < \infty$ for Calder\'{o}n-Zygmund operators based on "bump" conditions introduced by P\'{e}rez