Scattering for Defocusing NLS with Inhomogeneous Nonlinear Damping and Nonlinear Trapping Potential

Abstract

We investigate an energy-subcritical defocusing nonlinear Schr\"odinger equation in R3 subject to a lower order nonlinear trapping potential and a spatially dependent nonlinear damping: equation* i∂t u + u + i a(x) |u|2σ2 u = |u|2σ1 u + V(x)|u|2σ3 u. equation* We prove that if the damping acts where V induces concentration effects, i.e. where V is either negative or non-repulsive, solutions are global and uniformly bounded in H1, and scatter in the intercritical regime. A primary challenge arises from the spatial dependence of a(x), which breaks the energy's monotonicity. Consequently, a uniform in time control of the H1 norm of a solution is non-trivial and represents a new result even for V = 0. We overcome this issue by introducing a novel energy modified by virial argument, showing simultaneously a uniform bound on the energy and local energy decay estimates, which are subsequently upgraded to scattering via interaction Morawetz estimates.

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