Regularity properties of stationary harmonic functions whose Laplacian is a Radon measure

Abstract

We study the regularity of Radon measures μ which satisfy that there exists a function hμ in H1(), stationary harmonic such that hμ =μ in (here is an open set of R2). Such conditions appear in physical contexts such as the study of a limiting vorticity measure associated to a family (u) of solutions of the Ginzburg-Landau system without magnetic field. Under these conditions we prove that locally there exists a harmonic function H such that the support of the measure is contained in the set of zeros of H. Using the local structure of the set of zeros of harmonic functions we can thus obtain that locally the support of μ is a union of smooth simple