The structure of A-free measures with uniformly singular part

Abstract

We prove that a singular part μs of a measure μ satisfying Aμ =0 for a linear partial differential operator A defined on Rd has the range in the intersection of kernels of the principal symbol of A if the singular part is singular with respect to all the variables (uniformly singular) i.e. it is such that for μs-almost every x∈ Rd there exist positive functions α(ε), β(ε), ε ∈ R, satisfying α(ε)ε 0, εβ(ε) 0 and a set Eε⊂ B(,α(ε)) such that ε 0μs(B(x,β(ε)) / Eε)|μs|(Eε)=0.