Separation and Circulation in the Stationary Prandtl Equation
[Moved Online] Recent Developments in Fluid Dynamics April 12, 2021 - April 30, 2021
Location: SLMath: Online/Virtual
Separation and Circulation in the Stationary Prandtl Equation
In this talk, I will describe some recent results about the separation phenomenon within the stationary Prandtl equation.
The Prandtl equation describes the behavior of a fluid with small viscosity close to the boundary. In the presence of an adverse pressure gradient, it has been observed experimentally that the boundary layer may detach itself from the boundary. This separation has been described in a formal way by Goldstein in 1958.
With Nader Masmoudi, we gave a rigorous proof of the validity of the Goldstein singularity, and a precise, quantitative description of the behaviour of the solution in the vicinity of the separation point.
I will also tackle some issues related to the well-posedness of the Prandtl system in the presence of a recirculation bubble, i.e. downstream of the separation point. This topic is a work in progress with Frédéric Marbach and Jean Rax.
Separation and Circulation in the Stationary Prandtl Equation
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