Boundary trace of positive solutions of supercritical semilinear elliptic equations in dihedral domains

Abstract

We study the generalized boundary value problem for (E)\; - u+|u|q-1u=0 in a dihedral domain , when q>1 is supercritical. The value of the critical exponent can take only a finite number of values depending on the geometry of . When is a bounded Borel measure in a k-wedge, we give necessary and sufficient conditions in order it be the boundary value of a solution of (E). We also give conditions which ensure that a boundary compact subset is removable. These conditions are expressed in terms of Bessel capacities Bs,q' in N-k where s depends on the characteristics of the wedge. This allows us to describe the boundary trace of a positive solution of (E)