Instability of ground states for the NLS equation with potential on the star graph

Abstract

We study the nonlinear Schr\"odinger equation with an arbitrary real potential V(x)∈ (L1+L∞)() on a star graph . At the vertex an interaction occurs described by the generalized Kirchhoff condition with strength -γ<0. We show the existence of ground states ω(x) as minimizers of the action functional on the Nehari manifold under additional negativity and decay conditions on V(x). Moreover, for V(x)=-βxα, in the supercritical case, we prove that the standing waves eiω tω(x) are orbitally unstable in H1() when ω is large enough. Analogous result holds for an arbitrary γ∈R when the standing waves have symmetric profile.