Tuesday, October 9, 2018 at 2:00pm to 3:00pm
Kaprielian Hall (KAP), 427
3620 South Vermont Avenue, Los Angeles, CA 90089
Marcelo Disconzi, Vanderbilt University
We consider the compressible free-boundary Euler equations with surface tension. We prove that its solutions converge to solutions of the incompressible free-boundary Euler equations when the sound speed tends to infinity.