English

Singular integrals along variable codimension one subspaces

Classical Analysis and ODEs 2024-02-23 v2

Abstract

This article deals with maximal operators on Rn{\mathbb R}^n formed by taking arbitrary rotations of tensor products of a dd-dimensional H\"ormander--Mihlin multiplier with the identity in ndn-d coordinates, in the particular codimension 1 case d=n1d=n-1. These maximal operators are naturally connected to differentiation problems and maximally modulated singular integrals such as Sj\"olin's generalization of Carleson's maximal operator. Our main result, a weak-type L2(Rn)L^{2}({\mathbb R}^n)-estimate on band-limited functions, leads to several corollaries. The first is a sharp L2(Rn)L^2({\mathbb R}^n) estimate for the maximal operator restricted to a finite set of rotations in terms of the cardinality of the finite set. The second is a version of the Carleson--Sj\"olin theorem. In addition, we obtain that functions in the Besov space Bp,10(Rn)B_{p,1}^0({\mathbb R}^n), 2p<2\le p <\infty, may be recovered from their averages along a measurable choice of codimension 11 subspaces, a form of Zygmund's conjecture in general dimension nn.

Keywords

Cite

@article{arxiv.2211.13646,
  title  = {Singular integrals along variable codimension one subspaces},
  author = {Odysseas Bakas and Francesco Di Plinio and Ioannis Parissis and Luz Roncal},
  journal= {arXiv preprint arXiv:2211.13646},
  year   = {2024}
}

Comments

Published version on Ars Inveniendi Analytica

R2 v1 2026-06-28T07:11:38.919Z