Asymptotic properties of ground states of scalar field equations with a vanishing parameter

Abstract

We study the leading order behaviour of positive solutions of the equation - u + u-|u|p-2u+|u|q-2u=0, x∈N, where N 3, q>p>2 and when >0 is a small parameter. We give a complete characterization of all possible asymptotic regimes as a function of p, q and N. The behavior of solutions depends sensitively on whether p is less, equal or bigger than the critical Sobolev exponent p=2NN-2. For p<p the solution asymptotically coincides with the solution of the equation in which the last term is absent. For p>p the solution asymptotically coincides with the solution of the equation with =0. In the most delicate case p=p the asymptotic behaviour of the solutions is given by a particular solution of the critical Emden--Fowler equation, whose choice depends on in a nontrivial way.