English

Weighted Local Estimates for Singular Integral Operators

Classical Analysis and ODEs 2013-08-15 v2

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 M0,s(Tf)(x)cMf(x)M^{\sharp}_{0,s}(Tf)(x) \le c\,Mf(x) for Calder\'{o}n-Zygmund singular integral operators, this allows us to express the local weighted integral control of TfTf by MfMf. Similar estimates hold for TT replaced by singular integrals with kernels satisfying H\"{o}rmander-type conditions or integral operators with homogeneous kernels, and MM replaced by an appropriate maximal function MTM_T. Using sharper bounds in the local median decomposition we prove two-weight, LvpL^p_v-LwqL^q_w estimates for singular integral operators for 1<pq<1<p\le q<\infty. In all cases, the results include weights that are not necessarily AA_{\infty}. The local nature of these estimates leads to results involving weighted generalized Orlicz-Campanato and Orlicz-Morrey spaces.

Keywords

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

R2 v1 2026-06-22T01:04:24.334Z