Harmonic Measure and the Analyst's Traveling Salesman Theorem

Abstract

We study how generalized Jones β-numbers relate to harmonic measure. Firstly, we generalize a result of Garnett, Mourgoglou and Tolsa by showing that domains in Rd+1 whose boundaries are lower d-content regular admit Corona decompositions for harmonic measure if and only if the square sum β∂ of the generalized Jones β-numbers is finite. Secondly, for semi-uniform domains with Ahlfors regular boundaries, it is known that uniform rectifiability implies harmonic measure is A∞ for semi-uniform domains, but now we give more explicit dependencies on the A∞-constant in terms of the uniform rectifiability constant. This follows from a more general estimate that does not assume the boundary to be uniformly rectifiable. For general semi-uniform domains, we also show how to bound the harmonic measure of a subset in terms of that sets Hausdorff measure and the square sum of β-numbers on that set. Using this, we give estimates on the fluctuation of Green's function in a uniform domain in terms of the β-numbers. As a corollary, for bounded NTA domains , if B=B(x,cdiam ) is so that 2B⊂eq , we obtain that \[ (diam ∂)d + ∫ B \ |∇2 G(x,x)G(x,x)\ |2 dist(x,c)3 dx Hd(∂). \] Secondly, we also use β-numbers to estimate how much harmonic measure fails to be A∞-weight for semi-uniform domains with Ahlfors regular boundaries.