Carleson perturbations of locally Lipschitz elliptic operators

Abstract

In one-sided Chord-Arc Domains , we demonstrate that the A∞-absolute continuity of the elliptic measure with respect to the surface measure remains stable under L2 Carleson perturbations. This stability holds provided that either the elliptic operator L0=-div A0∇, which is being perturbed, or the perturbed operator L1=-div A1∇ satisfies the condition X∈ dist(X,∂ )|∇ Ai(X)| <∞ on its coefficients. L2 Carleson perturbations are slightly more general than those previously discussed in the literature. The proof hinges on the availability of a comprehensive elliptic theory and a domain that allows uniform non-tangential access to any point on its boundary. Consequently, while the current theory of L2 Carleson perturbations can be extended to more general contexts, we have chosen not to do so in order to simplify the presentation.