Scattering in the energy space for the NLS with variable coefficients

Abstract

We consider the NLS with variable coefficients in dimension n3 equation* i ∂t u - Lu +f(u)=0, Lv=∇b·(a(x)∇bv)-c(x)v, ∇b=∇+ib(x), equation* on Rn or more generally on an exterior domain with Dirichlet boundary conditions, for a gauge invariant, defocusing nonlinearity of power type f(u)|u|γ-1u. We assume that L is a small, long range perturbation of , plus a potential with a large positive part. The first main result of the paper is a bilinear smoothing (interaction Morawetz) estimate for the solution. As an application, under the conditional assumption that Strichartz estimates are valid for the linear flow eitL, we prove global well posedness in the energy space for subcritical powers γ<1+4n-2, and scattering provided γ>1+4n. When the domain is Rn, by extending the Strichartz estimates due to Tataru [Tataru08], we prove that the conditional assumption is satisfied and deduce well posedness and scattering in the energy space.