English

The maximal Beurling transform associated with squares

Classical Analysis and ODEs 2014-04-09 v1

Abstract

It is known that the improved Cotlar's inequality Bf(z)CM(Bf)(z)B^{*}f(z) \le C M(Bf)(z), zCz\in\mathbb C, holds for the Beurling transform BB, the maximal Beurling transform Bf(z)=B^{*}f(z)= supε>0w>εf(zw)1w2dw\displaystyle\sup_{\varepsilon >0}\left|\int_{|w|>\varepsilon}f(z-w) \frac{1}{w^2} \,dw\right|, zCz\in\mathbb C, and the Hardy--Littlewood maximal operator MM. In this note we consider the maximal Beurling transform associated with squares, namely, BSf(z)=supε>0wQ(0,ε)f(zw)1w2dwB^{*}_Sf(z)=\displaystyle\sup_{\varepsilon >0}\left|\int_{w\notin Q(0,\varepsilon)}f(z-w) \frac{1}{w^2} \,dw \right|, zCz\in\mathbb C, Q(0,ε)Q(0,\varepsilon) being the square with sides parallel to the coordinate axis of side length ε\varepsilon. We prove that BSf(z)CM2(Bf)(z)B_{S}^{*}f(z) \le C M^2(Bf)(z), zCz\in\mathbb C, where M2=MMM^2=M \circ M is the iteration of the Hardy--Littlewood maximal operator, and M2M^2 cannot be replaced by MM.

Cite

@article{arxiv.1404.2196,
  title  = {The maximal Beurling transform associated with squares},
  author = {Anna Bosch-Camós and Joan Mateu and Joan Orobitg},
  journal= {arXiv preprint arXiv:1404.2196},
  year   = {2014}
}

Comments

3 figures

R2 v1 2026-06-22T03:46:01.432Z