Global existence for energy critical waves in 3-d domains : Neumann boundary conditions
Abstract
We prove that the defocusing quintic wave equation, with Neumann boundary conditions, is globally wellposed on H1N() × L2() for any smooth (compact) domain ⊂ R3. The proof relies on one hand on Lp estimates for the spectral projector by Smith and Sogge, and on the other hand on a precise analysis of the boundary value problem, which turns out to be much more delicate than in the case of Dirichlet boundary conditions.
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