Rectifiability and elliptic measures on 1-sided NTA domains with Ahlfors-David regular boundaries

Abstract

Let ⊂ Rn+1, n≥ 2, be 1-sided NTA domain (aka uniform domain), i.e. a domain which satisfies interior Corkscrew and Harnack Chain conditions, and assume that ∂ is n-dimensional Ahlfors-David regular. We characterize the rectifiability of ∂ in terms of the absolute continuity of surface measure with respect to harmonic measure. We also show that these are equivalent to the fact that ∂ can be covered Hn-a.e. by a countable union of portions of boundaries of bounded chord-arc subdomains of and to the fact that ∂ possesses exterior corkscrew points in a qualitative way Hn-a.e. Our methods apply to harmonic measure and also to elliptic measures associated with real symmetric second order divergence form elliptic operators with locally Lipschitz coefficients whose derivatives satisfy a natural qualitative Carleson condition.