On the profile of sign changing solutions of an almost critical problem in the ball

Abstract

We study the existence and the profile of sign-changing solutions to the slightly subcritical problem - u=|u|2*-2-u in , u=0 on∂ , where is the unit ball in N, N≥ 3, 2*=2NN-2 and >0 is a small parameter. Using a Lyapunov-Schmidt reduction we discover two new non-radial solutions having 3 bubbles with different nodal structures. An interesting feature is that the solutions are obtained as a local minimum and a local saddle point of a reduced function, hence they do not have a global min-max description.