Asymptotic behavior and life-span estimates for the damped inhomogeneous nonlinear Schr\"odinger equation

Abstract

We are interested in the behavior of solutions to the damped inhomogeneous nonlinear Schr\"odinger equation i∂tu+ u+μ|x|-b|u|αu+iau=0, μ ∈C , b>0, a ∈ C such that e(a) ≥ 0, α>0. We establish lower and upper bound estimates of the life-span. In particular for a≥ 0, we obtain explicit values a*,\; a* such that if a<a* then blow up occurs, while for a>a*, global existence holds. Also, we prove scattering results with precise decay rates for large damping. Some of the results are new even for b=0.