Behaviour of solutions to p-Laplacian with Robin boundary conditions as p goes to 1

Abstract

We study the asymptotic behaviour, as p 1+, of the solutions of the following inhomogeneous Robin boundary value problem: equation pbabstract P \arrayll -p up = f & in , |∇ up|p-2∇ up· +λ |up|p-2up = g& on ∂, array. equation where is a bounded domain in RN with sufficiently smooth boundary, is its unit outward normal vector and p v is the p-Laplacian operator with p>1. The data f∈ LN,∞() (which denotes the Marcinkiewicz space) and λ,g are bounded functions defined on ∂ with λ0. We find the threshold below which the family of p--solutions goes to 0 and above which this family blows up. As a second interest we deal with the 1-Laplacian problem formally arising by taking p 1+ in pbabstract.