Global well-posedness and scattering for defocusing energy-critical inhomogeneous NLS in dimensions d 3

Abstract

We study the defocusing energy-critical inhomogeneous nonlinear Schr\"odinger equation \[ i∂tu+ u=|x|-b|u|4-2bd-2u, (t,x)∈×d, \] with initial data u0∈ Hx1(d), where d 3 and 0<b<\2, d2\. We prove global well-posedness and scattering for arbitrary non-radial data. The main difficulties are that, when d 6, the derivative of the critical nonlinearity is only H\"older continuous, so the short-time perturbation argument cannot be closed in S1, and that the singular coefficient |x|-b breaks translation symmetry. To handle these issues, we exploit the weak-space structure |x|-b∈ Ldb,∞(d), introduce exotic Strichartz norms, and prove a long-time stability theorem for the general energy-critical inhomogeneous nonlinear Schr\"odinger equation. We also show that profiles escaping to spatial infinity are asymptotically linear because of the decay of |x|-b. Consequently, almost periodic solutions are compact modulo scaling only, with neither spatial nor frequency center parameters. Combined with the concentration--compactness argument of Kenig--Merle [Invent. Math. 166 (2006), 645--675], this yields the main theorem.