On the orbital stability for a class of nonautonomous NLS

Abstract

Following the original approach introduced by T. Cazenave and P.L. Lions in CaLi we prove the existence and the orbital stability of standing waves for the following class of NLS: intr1 i∂t u+ u - V(x) u + Q(x) u|u|p-2=0, (t,x) ∈ × n, 2<p<2+ 4n and intr2 i∂t u - 2 u - V(x) u + Q(x) u|u|p-2=0, (t,x) ∈ × n, 2<p<2+ 8n under suitable assumptions on the potentials V(x) and Q(x). More precisely we assume V(x), Q(x) ∈ L∞(n) and meas\Q(x)>λ0\∈ (0,∞) for a suitable λ0>0. The main point is the analysis of the compactness of minimiziang sequences to suitable constrained minimization problems related to intr1 and intr2.