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Strong ill-posedness of the incompressible Euler equation in borderline Sobolev spaces

Jean Bourgain Dong Li

Analysis of PDEs mathscidoc:1702.03081

Inventiones Mathematicae, 201, (1), 97-157, 2015
For the d-dimensional incompressible Euler equation, the standard energy method gives local wellposedness for initial velocity in Sobolev space with regularity above some critical threshold. The borderline case was a folklore open problem. In this paper we consider the physical dimension d=2 and show that if we perturb any given smooth initial data in critical norm, then the corresponding solution can have infinite critical norm instantaneously at t>0. In a companion paper we settle the 3D and more general cases. The constructed solutions are unique and even infinitely-smooth (locally) in some cases. To prove these results we introduce a new strategy: large Lagrangian deformation induces critical norm inflation. As an application we also settle several closely related open problems.
ill-posedness incompressible Euler Sobolev
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@inproceedings{jean2015strong,
  title={Strong ill-posedness of the incompressible Euler equation in borderline Sobolev spaces},
  author={Jean Bourgain, and Dong Li},
  url={http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20170226220141720165519},
  booktitle={Inventiones Mathematicae},
  volume={201},
  number={1},
  pages={97-157},
  year={2015},
}
Jean Bourgain, and Dong Li. Strong ill-posedness of the incompressible Euler equation in borderline Sobolev spaces. 2015. Vol. 201. In Inventiones Mathematicae. pp.97-157. http://archive.ymsc.tsinghua.edu.cn/pacm_paperurl/20170226220141720165519.
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