Scattering for the non-radial inhomogenous biharmonic NLS equation

Abstract

We consider the focusing inhomogeneous biharmonic nonlinear Schr\"odinger equation in H2(RN), equation iut + 2 u - |x|-b|u|αu=0 equation when b > 0 and N ≥ 5. We first obtain a small data global result in H2, which, in the five-dimensional case, improves a previous result from Pastor and the second author. In the sequel, we show the main result, scattering below the mass-energy threshold in the intercritical case, that is, 8-2bN < α <8-2bN-4, without assuming radiality of the initial data. The proof combines the decay of the nonlinearity with Virial-Morawetz-type estimates to avoid the radial assumption, allowing for a much simpler proof than the Kenig-Merle roadmap.