Scattering above energy norm of solutions of a loglog energy-supercritical Schrodinger equation with radial data
Abstract
We prove scattering of Hk solutions of the loglog energy-supercritical Schrodinger equation i ∂t u + u = |u|4n-2 u c ((10+|u|2)), 0 < c < cn, n=3,4, with radial data u(0):=u0 ∈ Hk , k>n/2. This is achieved, roughly speaking, by extending Bourgain's argument (see also Grillakis) and Tao's argument in high dimensions.
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