Global Well-Posedness for the Fourth-Order Nonlinear Schr\"odinger Equation with Potential in the Energy-Critical Case
Abstract
We consider the defocusing fourth-order nonlinear Schr\"odinger equation with potential \[ i∂t u + 2 u + Vu + λ |u|p-1u = 0 (x ∈ Rn,\ t ∈ R), \] in dimensions n 5. In the energy-critical case p = n+4n-4, under suitable assumptions on a radial real-valued potential V, we prove global well-posedness for radial initial data in H2(Rn). We also show that every such solution scatters in H2 to a free solution of the biharmonic Schr\"odinger equation. The proof relies on Strichartz estimates for fourth-order Schr\"odinger operators with potential, equivalence of Sobolev norms associated with 2+V and 2, boundedness of wave operators, perturbative stability theory, and a Morawetz-type estimate adapted to the presence of a potential. This extends earlier results for the case without potential to a class of radial potentials.
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