Uniform rectifiability from Carleson measure estimates and -approximability of bounded harmonic functions

Abstract

Let ⊂ Rn+1, n≥1, be a corkscrew domain with Ahlfors-David regular boundary. In this paper we prove that ∂ is uniformly n-rectifiable if every bounded harmonic function on is -approximable or if every bounded harmonic function on satisfies a suitable square-function Carleson measure estimate. In particular, this applies to the case when = Rn+1 E and E is Ahlfors-David regular. Our results solve a conjecture posed by Hofmann, Martell, and Mayboroda in a recent work where they proved the converse statements. Here we also obtain two additional criteria for uniform rectifiability. One is given in terms of the so-called "S<N" estimates, and another in terms of a suitable corona decomposition involving harmonic measure.