Characterizations of Lyapunov domains in terms of Riesz transforms and the Plemelj-Privalov theorem

Abstract

We prove several characterizations of C1,ω-domains (aka Lyapunov domains), where ω is a growth function satisfying natural assumptions. For example, given an Ahlfors regular domain ⊂eqRn, we show that the modulus of continuity of the geometric measure theoretic outward unit normal to is dominated by (a multiple of) ω if and only if the action of each Riesz transform Rj associated with ∂ on the constant function 1 has a modulus of continuity dominated by (a multiple of) ω. The proof of this result requires that we establish a higher-dimensional generalization of the classical Plemelj-Privalov theorem, identifying a large class of singular integral operators that are bounded on generalized H\"older spaces. This class includes the Cauchy-Clifford operator and the harmonic double layer operator, among others.