Solutions to the NavierStokes equations that are locally bounded in L^{3,\infty}.
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 Gregory Seregin (University of Oxford)
 Monday 02 May 2022, 14:0015:00
 CMS, MR13.
If you have a question about this talk, please contact Daniel Boutros.
In the talk, regularity properties of solutions to the NavierStokes equations that are locally bounded in the weak Lebesgue space L3 (denoted as L{3,infty}) will be discussed. The space L{3,\infty} is known as an important critical one for those equations. We shall consider both interior and boundary regularity cases.
This talk is part of the Partial Differential Equations seminar series.
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