Blow-up phenomena and asymptotic profiles passing from H1-critical to super-critical quasilinear Schr\"odinger equations

Abstract

We study the asymptotic profile, as → 0, of positive solutions to -2 u+V(x)u-2+γu u2=K(x)|u|p-2u,\ \ x∈ RN where γ≥ 0 is a parameter with relevant physical interpretations, V and K are given potentials and N≥ 5. We investigate the concentrating behavior of solutions when γ>0 and, differently form the case γ=0 where the leading potential is V, the concentration is here localized by the source potential K. Moreover, surprisingly for γ>0 we find a different concentration behavior of solutions in the case p=2NN-2 and when 2NN-2<p<4NN-2. This phenomenon does not occur when γ=0.