The final-state problem for the cubic-quintic NLS with non-vanishing boundary conditions

Abstract

We construct solutions with prescribed scattering state to the cubic-quintic NLS (i∂t+)=α1 -α3 2 +α5 4 in three spatial dimensions in the class of solutions with |(x)| c >0 as |x|∞. This models disturbances in an infinite expanse of (quantum) fluid in its quiescent state --- the limiting modulus c corresponds to a local minimum in the energy density. Our arguments build on work of Gustafson, Nakanishi, and Tsai on the (defocusing) Gross--Pitaevskii equation. The presence of an energy-critical nonlinearity and changes in the geometry of the energy functional add several new complexities. One new ingredient in our argument is a demonstration that solutions of such (perturbed) energy-critical equations exhibit continuous dependence on the initial data with respect to the weak topology on H1x.