论文信息 - Convergence of vortex methods for Euler’s equations

Convergence of vortex methods for Euler’s equations

A numerical method for approximating the flow of a two dimensional incompressible, inviscid fluid is examined. It is proved that for a short time interval Chorin's vortex method converges superlinearly toward the solution of Euler's equations, which govern the flow. The length of the time interval depends upon the smoothness of the flow and of the particular cutoff. The theory is supported by numerical experiments. These suggest that the vortex method may even be a second order method.

Ole Hald | O. Hald | Vincenza Mauceri del Prete | V. D. Prete

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