Nader Masmoudi, Fabrice Planchon
Published 2006-03-03Version 1
We prove the uniqueness of weak solutions to the critical defocusing wave equation in 3D under a local energy inequality condition. More precisely, we prove the uniqueness of $ u \in L^\infty\_t(\dot{H}^{1})\cap \dot{W}^{1,\infty}\_t(L^2)$, under the condition that $u$ verifies some local energy inequalities.
Comments: 12 pages, to appear in Comm. Partial Differential Equations
Center-stable manifold of the ground state in the energy space for the critical wave equation
Finite time blow up for critical wave equations in high dimensions
Strichartz estimates in similarity coordinates and stable blowup for the critical wave equation
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