One Remark on Barely Hsp Supercritical Wave Equations
Abstract
We prove that a good Hsp critical theory for the 3D wave equation ∂tt u - u = -|u|p-1 u can be extended to prove global well-posedness of smooth solutions of at least one 3D barely Hsp supercritical wave equation ∂tt u - u =- |u|p-1 u g(|u|), with g growing slowly to infinity, provided that a Kenig-Merle type condition is satisfied. This result extends those obtained for the particular case sp=1.
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