The quintic NLS on perturbations of $\mathbf{R}^3$
Abstract: Consider the defocusing quintic nonlinear Schr\"{o}dinger equation on $\mathbf{R}3$ with initial data in the energy space. This problem is "energy-critical" in view of a certain scale-invariance, which is a main source of difficulty in the analysis of this equation. It is a nontrivial fact that all finite-energy solutions scatter to linear solutions. We show that this remains true under small compact deformations of the Euclidean metric. Our main new ingredient is a long-time microlocal weak dispersive estimate that accounts for the refocusing of geodesics.
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