Convergence of the point vortex method for 2-D vortex sheet |
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| Authors: | Jian-Guo Liu Zhouping Xin. |
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| Affiliation: | Institute for Physical Science and Technology and Department of Mathematics, University of Maryland, College Park, MD 20742 ; Courant Institute, New York University and IMS and Dept. of Math., The Chinese University of Hong Kong, Shatin, N.T., Hong Kong |
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| Abstract: | We give an elementary proof of the convergence of the point vortex method (PVM) to a classical weak solution for the two-dimensional incompressible Euler equations with initial vorticity being a finite Radon measure of distinguished sign and the initial velocity of locally bounded energy. This includes the important example of vortex sheets, which exhibits the classical Kelvin-Helmholtz instability. A surprise fact is that although the velocity fields generated by the point vortex method do not have bounded local kinetic energy, the limiting velocity field is shown to have a bounded local kinetic energy. |
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| Keywords: | Point vortex method vortex sheet incompressible Euler equations classical weak solution |
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