Boundary-layers for a Neumann problem at higher critical exponents

Abstract

We consider the Neumann problem (P) - v + v= vq-1 \ in \ D, \ v > 0 \ in \ D,\ ∂ v = 0 \ on ∂D , where D is an open bounded domain in RN, is the unit inner normal at the boundary and q>2. For any integer, 1 h N-3, we show that, in some suitable domains D, problem (P) has a solution which blows-up along a h-dimensional minimal submanifold of the boundary ∂ D as q approaches from either below or above the higher critical Sobolev exponent 2(N-h) N-h-2.