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Fluid Dynamics
Seminar
Monday, Oct 9, 2006,
4:15 PM
Cullimore Lecture Hall, Room 611
New Jersey Institute of
Technology
Calculation of complex singular solutions to the 3D incompressible Euler
equations
Mike Siegel
Department of Mathematical Sciences,
NJIT
Abstract
We describe an approach for the construction of singular solutions to the 3D Euler equations for complex initial data. The approach is based on a numerical simulation of complex traveling wave solutions with imaginary wave speed, originally developed in the context of interfacial flow. We simplify and generalize this construction to calculate traveling wave solutions in a fully 3D, noninterfacial flow geometry. We also discuss a semi-analytic approach to the problem of Euler singularities based on numerical computation of the complex traveling wave solutions, followed by perturbation construction of a real solution. The perturbation analysis depends on a small amplitude of the singularity in the traveling wave solution; techniques for producing such a small amplitude are described. This is joint work with Russ Caflisch.