Reflectionless measures for Calder\'on-Zygmund operators

Abstract

We study the properties of reflectionless measures for a Calder\'on-Zygmund operator T. Roughly speaking, these are measures μ for which T(μ) vanishes (in a weak sense) on the support of the measure. We describe the relationship between certain well-known problems in harmonic analysis and geometric measure theory and the classification of reflectionless measures. As an application of our theory, we give a new proof of a recent theorem of Eiderman, Nazarov, and Volberg, which states that in Rd, the s-dimensional Riesz transform of a non-trivial s-dimensional measure is unbounded if s∈ (d-1,d).