-Approximability of Harmonic Functions in Lp Implies Uniform Rectifiability
Abstract
Suppose that ⊂ Rn+1, n 2, is an open set satisfying the corkscrew condition with an n-dimensional ADR boundary, ∂ . In this note, we show that if harmonic functions are -approximable in Lp for any p > n/(n-1), then ∂ is uniformly rectifiable. Combining our results with those in [HT] (Hofmann-Tapiola) gives us a new characterization of uniform rectifiability which complements the recent results in [HMM] (Hofmann-Martell-Mayboroda), [GMT] (Garnett-Mourgoglou-Tolsa) and [AGMT] (Azzam-Garnett-Mourgoglou-Tolsa).
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