Large data scattering for the defocusing NLKG on waveguide Rd× T
Abstract
We consider the pure-power defocusing nonlinear Klein-Gordon equation, in the energy subcritical case, posed on the product space Rd× T, where T is the one-dimensional flat torus. In this framework, we prove that scattering holds for any initial data belonging to the energy space H1 × L2 for 1≤ d≤ 4. The strategy consists in proving a suitable profile decomposition theorem in Rd× T to pursue a concentration-compactness \& rigidity method.
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