The Riesz transform, rectifiability, and removability for Lipschitz harmonic functions

Fëdor Nazarov ,Xavier Tolsa ,Alexander Volberg

doi:10.5565/10.5565-publmat_58214_26

The Riesz transform, rectifiability, and removability for Lipschitz harmonic functions

Fëdor Nazarov , Xavier Tolsa + Show 1 more

https://doi.org/10.5565/10.5565-publmat_58214_26

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Journal: Publicacions Matematiques	Publication Date: Jul 1, 2014
Citations: 15

Affiliation: Autonomous University of Barcelona, Kent State University, Michigan State University

#Conjecture In Dimensions #Compact Set + Show 3 more

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Abstract

We show that, given a set E Rn+1 with finite n-Hausdorff measure Hn, if the n-dimensional Riesz transform is bounded in L2(HnbE), then E is n-rectifiable. From this result we deduce that a compact set E Rn+1 with Hn(E) < 1 is removable for Lipschitz harmonic functions if and only if it is purely n-unrectifiable, thus proving the analog of Vitushkin's conjecture in higher dimensions.

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