Absolute continuity of harmonic measure for domains with lower regular boundaries

Abstract

We study absolute continuity of harmonic measure with respect to surface measure on domains that have large complements. We show that if ⊂ Rd+1 is d-Ahlfors regular and splits Rd+1 into two NTA domains then ω Hd on ∂. This result is a natural generalisation of a result of Wu in [Wu86]. We also prove that almost every point in ∂ is a cone point if is a Lipschitz graph. Combining these results and a result from [AHMMMTV], we characterize sets of absolute continuity with finite Hd-measure both in terms of the cone point condition and in terms of the rectifiable structure of the boundary. This generalizes the results of McMillan in [McM69] and Pommerenke in [Pom86]. Finally, we also show our first result holds for elliptic measure associated with real second order divergence form elliptic operators with a mild assumption on the gradient of the matrix.