The stability of equilibria solutions of the incompressible Euler and Navier-Stokes equations at high Reynolds number has been studied since the 1800s with the work of Kelvin, Rayleigh, Reynolds and others. However, only in recent years have we started to get a firm mathematical understanding of this field, even for the deceptively simple case of shear flows and vortices. I will outline some of the many recent advances in the area, including inviscid damping, enhanced dissipation, subcritical transition, vortex axi-symmetrization, and the local well-posedness of vortex filaments.
Talk in person in East Hall B844
and on Zoom:
Join Zoom Meeting
https://umich.zoom.us/j/95889337803
Meeting ID: 958 8933 7803
Passcode: 811977
Speaker(s): Jacob Bedrossian (University of Maryland)
Talk in person in East Hall B844
and on Zoom:
Join Zoom Meeting
https://umich.zoom.us/j/95889337803
Meeting ID: 958 8933 7803
Passcode: 811977
Speaker(s): Jacob Bedrossian (University of Maryland)
| Building: | East Hall |
|---|---|
| Event Type: | Workshop / Seminar |
| Tags: | Mathematics |
| Source: | Happening @ Michigan from Department of Mathematics, MCAIM Colloquium - Department of Mathematics |
