Harmonic measure is rectifiable if it is absolutely continuous with respect to the co-dimension one Hausdorff measure
Abstract
In the present paper we sketch the proof of the fact that for any open connected set ⊂Rn+1, n≥ 1, and any E⊂ ∂ with 0<Hn(E)<∞, absolute continuity of the harmonic measure ω with respect to the Hausdorff measure on E implies that ω|E is rectifiable.
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