Analysis Seminar

Strong ill-posedness of the logarithmically regularized 2D Euler equations in the borderline Sobolev space

The well-posedness of the incompressible Euler equations in borderline spaces has attracted much attention in recent years. To understand the behavior of solutions in these spaces, the logarithmically regularized Euler equations were introduced. In borderline Sobolev spaces, local well-posedness was proved Chae-Wu when the regularization is sufficiently strong, while strong ill-posedness of the unregularized case was established by Bourgain-Li. In this talk, I will discuss the strong ill-posedness of the remaining intermediate regime of regularization.

Date & Time

October 21, 2019 | 5:00pm – 6:00pm

Location

Simonyi Hall 101

Affiliation

Member, School of Mathematics

Event Series

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