On the supercritical Schr\"odinger equation on the exterior of a ball
Abstract
We consider the mixed problem on the exterior of the unit ball in Rn, n2, for a defocusing Schr\"odinger equation with a power nonlinearity |u|p-1u, with zero boundary data. Assuming that the initial data are non radial, sufficiently small perturbations of large radial initial data, we prove that for all powers p>n+6 the solution exists for all times, its Sobolev norms do not inflate, and the solution is unique in the energy class.
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