Approximate tangents, harmonic measure, and domains with rectifiable boundaries

Abstract

Let ⊂ Rn+1, n ≥ 1, be an open and connected set. Set Tn to be the set of points ∈ ∂ so that there exists an approximate tangent n-plane for ∂ at and ∂ satisfies the weak lower Ahlfors-David n-regularity condition at . We first show that Tn can be covered by a countable union of boundaries of bounded Lipschitz domains. Then, letting ∂ be a subset of Tn where satisfies an appropriate thickness condition, we prove that ∂ can be covered by a countable union of boundaries of bounded Lipschitz domains contained in . As a corollary we obtain that if has locally finite perimeter, ∂ is weakly lower Ahlfors-David n-regular, and the measure-theoretic boundary coincides with the topological boundary of up to a set of Hn-measure zero, then ∂ can be covered, up to a set of Hn-measure zero, by a countable union of boundaries of bounded Lipschitz domains that are contained in . This implies that in such domains, Hn|∂ is absolutely continuous with respect to harmonic measure.