Extrapolation of solvability of the regularity and the Poisson regularity problems in rough domains

Abstract

Let ⊂ Rn+1, n≥2, be an open set satisfying the corkscrew condition with n-Ahlfors regular boundary ∂, but without any connectivity assumption. We study the connection between solvability of the regularity problem for divergence form elliptic operators with boundary data in the Hajasz-Sobolev space M1,1(∂) and the weak- A∞ property of the associated elliptic measure. In particular, we show that solvability of the regularity problem in M1,1(∂) is equivalent to the solvability of the regularity problem in M1,p(∂) for some p>1. We also prove analogous extrapolation results for the Poisson regularity problem defined on tent spaces. Moreover, under the hypothesis that ∂ supports a weak (1,1)-Poincar\'e inequality, we show that the solvability of the regularity problem in the Hajasz-Sobolev space M1,1(∂) is equivalent to a stronger solvability in a Hardy-Sobolev space of tangential derivatives.