Threshold solutions for the 3d cubic INLS: the energy-critical case
Abstract
We study the energy-critical 3d cubic inhomogeneous NLS equation i∂t u + u + |x|-1|u|2 u=0. In this work, we prove the existence of special solutions W with energy equal to that of the ground state W and use these solutions to characterize the behavior of solutions at the ground state energy. The singular factor |x|-1 in the nonlinearity significantly limits the smoothness of the ground state and prompts a novel approach to the modulation analysis.
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