Critical weak-Lp differentiability of singular integrals

Abstract

We establish that for every function u ∈ L1loc() whose distributional Laplacian u is a signed Borel measure in an open set in RN, the distributional gradient ∇ u is differentiable almost everywhere in with respect to the weak-LNN-1 Marcinkiewicz norm. We show in addition that the absolutely continuous part of u with respect to the Lebesgue measure equals zero almost everywhere on the level sets \u = α\ and \∇ u = e\, for every α ∈ R and e ∈ RN. Our proofs rely on an adaptation of Calder\'on and Zygmund's singular-integral estimates inspired by subsequent work by Hajlasz.