Highly oscillatory solutions of a Neumann problem for a p-laplacian equation

Abstract

We deal with a boundary value problem of the form -ε(φp(ε u'))'+a(x)W'(u)=0, u'(0)=0=u'(1), where φp(s) = s p-2 s for s ∈ R and p>1, and W:[-1,1] R is a double-well potential. We study the limit profile of solutions when ε 0+ and, conversely, we prove the existence of nodal solutions associated with any admissible limit profile when ε is small enough.