Harmonic measure and quantitative connectivity: geometric characterization of the Lp-solvability of the Dirichlet problem. Part I

Abstract

Let ⊂ Rn+1 be an open set, not necessarily connected, with an n-dimensional uniformly rectifiable boundary. We show that ∂ may be approximated in a "Big Pieces" sense by boundaries of chord-arc subdomains of , and hence that harmonic measure for is weak-A∞ with respect to surface measure on ∂, provided that satisfies a certain weak version of a local John condition. Under the further assumption that satisfies an interior Corkscrew condition, and combined with our previous work, and with recent work of Azzam, Mourgoglou and Tolsa, this yields a geometric characterization of domains whose harmonic measure is quantitatively absolutely continuous with respect to surface measure and hence a haracterization of the fact that the associated Lp-Dirichlet problem is solvable for some finite p.