Soliton resolution for equivariant wave maps to the sphere
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keywords
mapswavecaseenergyblowconeconsidercorotationnal
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We consider finite energy corotationnal wave maps with target manifold $\m S^2$. We prove that for a sequence of times, they decompose as a sum of decoupled harmonic maps in the light cone, and a smooth wave map (in the blow case) or a linear scattering term (in the global case), up to an error which tends to 0 in the energy space.
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