Singular integrals along variable codimension one subspaces

Abstract

This article deals with maximal operators on Rn formed by taking arbitrary rotations of tensor products of a d-dimensional H\"ormander--Mihlin multiplier with the identity in n-d coordinates, in the particular codimension 1 case d=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)-estimate on band-limited functions, leads to several corollaries. The first is a sharp L2( Rn) 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), 2 p <∞, may be recovered from their averages along a measurable choice of codimension 1 subspaces, a form of Zygmund's conjecture in general dimension n.

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