Fast and slow decaying solutions for H1-supercritical quasilinear Schr\"odinger equations

Abstract

We consider the following quasilinear Schr\"odinger equations of the form equation* u- V(x)u+u u2+up=0,\ u>0\ in\ RN\ and\ |x|→ ∞ u(x)=0, equation* where N≥ 3, p>N+2N-2, >0 and V(x) is a positive function. By imposing appropriate conditions on V(x), we prove that, for =1, the existence of infinity many positive solutions with slow decaying O(|x|-2p-1) at infinity if p>N+2N-2 and, for sufficiently small, a positive solution with fast decaying O(|x|2-N) if N+2N-2<p<3N+2N-2. The proofs are based on perturbative approach. To this aim, we also analyze the structure of positive solutions for the zero mass problem.