A Virial-Morawetz approach to scattering for the non-radial inhomogeneous NLS

Abstract

Consider the focusing inhomogeneous nonlinear Schr\"odinger equation in H1(RN), iut + u + |x|-b|u|p-1u=0, when b > 0 and N ≥ 3 in the intercritical case 0 < sc <1. In previous works, the second author, as well as Farah, Guzm\'an and Murphy, applied the concentration-compactness approach to prove scattering below the mass-energy threshold for radial and non-radial data. Recently, the first author adapted the Dodson-Murphy approach for radial data, followed by Murphy, who proved scattering for non-radial solutions in the 3d cubic case, for b<1/2. This work generalizes the recent result of Murphy, allowing a broader range of values for the parameters p and b, as well as allowing any dimension N ≥ 3. It also gives a simpler proof for scattering nonradial, avoiding the Kenig-Merle road map. We exploit the decay of the nonlinearity, which, together with Virial-Morawetz-type estimates, allows us to drop the radial assumption.