The volume of the boundary of a Sobolev (p,q)-extension domain

Abstract

Let n≥ 2 and 1≤ q<p<. We prove that if ⊂ Rn is a Sobolev (p, q)-extension domain, with additional capacitory restrictions on boundary in the case q≤ n-1, n>2, then |∂|=0. In the case 1≤ q<n-1, we give an example of a Sobolev (p,q)-extension domain with |∂|>0.