Scattering of the energy-critical NLS with dipolar interaction
Abstract
In this paper, we investigate the global well-posedness and H1 scattering theory for a 3d energy-critical Schr\"odinger equation under the influence of magnetic dipole interaction λ1|u|2u+λ2(K|u|2)u, where K is the dipole-dipole interaction kernel. Our proof of global well-posedness result is based on the argument of Zhang [23]. Moreover, adopting the induction of energy technique of Killip-Oh-Pocovnicu-Visan [20], we obtain a condition for scattering.
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