A necessary condition for Sobolev extension domains in higher dimensions

Abstract

We give a necessary condition for a domain to have a bounded extension operator from L1,p() to L1,p( Rn) for the range 1 < p < 2. The condition is given in terms of a power of the distance to the boundary of integrated along the measure theoretic boundary of a set of locally finite perimeter and its extension. This generalizes a characterizing curve condition for planar simply connected domains, and a condition for W1,1-extensions. We use the necessary condition to give a quantitative version of the curve condition. We also construct an example of an extension domain that is homeomorphic to a ball and has n-dimensional boundary.

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