Semiregular and strongly irregular boundary points for nonlocal Dirichlet problems

Abstract

In this paper we study nonlocal nonlinear equations of fractional (s,p)-Laplacian type on Rn. We show that the irregular boundary points for the Dirichlet problem can be divided into two disjoint classes: semiregular and strongly irregular boundary points, with very different behaviour. Two fundamental tools needed to show this are the Kellogg property (from our previous paper) and a new removability result for solutions in the Vs,p Sobolev type space, which we deduce more generally also for supersolutions of equations with a right-hand side. Semiregular and strongly irregular points are also characterized in various ways. Finally, it is explained how semiregularity depends on s and p.