Bourgain-Brezis-Mironescu Domains

Abstract

Bourgain et al.(2001) proved that for p>1 and smooth bounded domain ⊂eqRN, equation* s1(1-s) × f(x)-f(y) p x-y N+spdx dy= ∫ ∇ f(x) p dx equation* for all f∈ Lp(). This gives a characterization of W1,p() by means of Ws,p() seminorms only. For the case p=1, D\'avila(2002) proved that when is a bounded domain with Lipschitz boundary, equation* s1(1-s) × f(x)-f(y) x-y N+sdx dy= [f]BV() equation* for all f∈ L1(). This characterizes BV() in terms of Ws,1() seminorm. In this paper we extend the first result and partially extend the second result to extension domains.