Abstract
We consider wave maps on -dimensional Minkowski space. For each dimension we construct a negatively curved, -dimensional target manifold that allows for the existence of a self-similar wave map which provides a stable blowup mechanism for the corresponding Cauchy problem.
Citation
Roland Donninger. Irfan Glogić. "On the existence and stability of blowup for wave maps into a negatively curved target." Anal. PDE 12 (2) 389 - 416, 2019. https://doi.org/10.2140/apde.2019.12.389
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