Sijue Wu
Published 2003-04-24Version 1
We consider the motion of the interface separating two domains of the same fluid that moves with different velocity along the tangential direction of the interface. We assume that the fluids occupying the two domains are of constant densities that are equal, are inviscid, incompressible and irrotational, and that the surface tension is zero. We discuss results on the existence and uniqueness of solutions for given data, the regularity of solutions, singularity formation and the nature of solutions after the singularity formation time.
Journal: Proceedings of the ICM, Beijing 2002, vol. 3, 233--242
On the Motion of Vortex Sheets with Surface Tension in the 3D Euler Equations with Vorticity
Well-posedness of the free-surface incompressible Euler equations with or without surface tension
Local well-posedness for Benard convection without surface tension
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