Convergence for a planar elliptic problem with large exponent Neumann data

Abstract

We study positive solutions up of the nonlinear Neumann elliptic problem u =u in , ∂ u/∂ = |u|p-1u on ∂, where is a bounded open smooth domain in R2. We investigate the asymptotic behavior of families of solutions up satisfying an energy bound condition when the exponent p is getting large. Inspired by the work of Davila-del Pino-Musso DavilaDM, we prove that up is developing m peaks xi∈∂ , in the sense upp/∫∂ upp approaches the sum of m Dirac masses at the boundary and we determine the localization of these concentration points.