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DTSTART:19810329T020000
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BEGIN:VEVENT
UID:news1784@dmi.unibas.ch
DTSTAMP;TZID=Europe/Zurich:20250328T102204
DTSTART;TZID=Europe/Zurich:20250402T150000
SUMMARY:Seminar Analysis and Mathematical Physics: Emil Wiedemann (FAU Erla
 ngen)
DESCRIPTION:If the initial vorticity of a two-dimensional incompressible fl
 ow is in $L^p$\, then it is classically known that solutions of the Navier
 -Stokes equations converge to a solution of Euler in the zero viscosity li
 mit. Here\, the convergence of the corresponding vorticities is only weak.
  We will present some recent results on how to upgrade to strong convergen
 ce of vorticity. The problem is particularly interesting in a bounded doma
 in.
X-ALT-DESC:<p>If the initial vorticity of a two-dimensional incompressible 
 flow is in $L^p$\, then it is classically known that solutions of the Navi
 er-Stokes equations converge to a solution of Euler in the zero viscosity 
 limit. Here\, the convergence of the corresponding vorticities is only wea
 k. We will present some recent results on how to upgrade to strong converg
 ence of vorticity. The problem is particularly interesting in a bounded do
 main.</p>
DTEND;TZID=Europe/Zurich:20250402T160000
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