Normalized Standing Waves for the Focusing Inhomogeneous Schr\"odinger Equation with Spatially Growing Nonlinearity

Abstract

We study the focusing inhomogeneous nonlinear Schr\"odinger equation i∂t u + u = -|x|b |u|p-1u , (t,x)∈ (0,∞)×RN, with b>0 and p>1. Due to the spatial growth of the nonlinearity, standard compactness arguments do not apply and new difficulties arise. We first characterize ground state standing waves via a variational approach on the Nehari manifold and we establish some sharp stability and instability properties. In the L2-subcritical regime, we prove the existence of normalized ground states by solving a constrained energy minimization problem in the radial energy space, and we show that the resulting set of minimizers is orbitally stable under the flow. In contrast, in the L2-critical and supercritical regimes, ground state standing waves are shown to be strongly unstable by finite-time blow-up. Our results extend classical stability and instability theory for nonlinear Schr\"odinger equations to the case of spatially growing inhomogeneous nonlinearities.