Global Dynamics of the Non-Radial Energy-Critical Inhomogeneous Biharmonic NLS

Abstract

We investigate the focusing inhomogeneous nonlinear biharmonic Schr\"odinger equation \[ i∂t u + 2 u - |x|-b|u|p u = 0 on R × RN, \] in the energy-critical regime, p = 8 - 2bN - 4, and 5 ≤ N < 12. We focus on the challenging non-radial setting and establish global well-posedness and scattering under the subcritical assumption t ∈ I \| u(t)\|L2 < \| W\|L2, where W denotes the ground state solution to the associated elliptic equation. In contrast to previous results in the homogeneous case (b = 0), which often rely on radial symmetry and conserved quantities, our analysis is carried out without symmetry assumptions and under a non-conserved quantity, the kinetic energy. The presence of spatial inhomogeneity combined with the fourth-order dispersive operator introduces substantial analytical challenges. To overcome these difficulties, we develop a refined concentration-compactness and rigidity framework, based on the Kenig-Merle approach KM, but more directly inspired by recent work of Murphy and the first author CM in the second-order inhomogeneous setting.