Nonlinear growth of Kelvin–Helmholtz instability: Effect of surface tension and density ratio
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[1] R. Kiang. Nonlinear Theory of Inviscid Taylor Instability Near the Cutoff Wavenumber , 1969 .
[2] M. Yuen. Non-linear capillary instability of a liquid jet , 1968, Journal of Fluid Mechanics.
[3] Garrett Birkhoff,et al. Do vortex sheets roll up? , 1959 .
[4] R. Clements,et al. Some Techniques for Extending the Application of the Discrete Vortex Method of Flow Simulation , 1982 .
[5] A. Nayfeh. Nonlinear Stability of a Liquid Jet , 1970 .
[6] W. K. Soh,et al. A new approach to roll-up calculations of vortex sheets , 1978, Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences.
[7] M. M. Elkotb,et al. Fuel atomization for spray modelling , 1982 .
[8] Steven A. Orszag,et al. Generalized vortex methods for free-surface flow problems , 1982, Journal of Fluid Mechanics.
[9] D. I. Pullin,et al. Numerical studies of surface-tension effects in nonlinear Kelvin–Helmholtz and Rayleigh–Taylor instability , 1982, Journal of Fluid Mechanics.
[10] R. Zalosh. Discretized Simulation of Vortex Sheet Evolution with Buoyancy and Surface Tension Effects , 1976 .
[11] A. I. van de Vooren,et al. A NUMERICAL INVESTIGATION OF THE ROLLING-UP OF VORTEX SHEETS , 1980 .
[12] A. Leonard. Vortex methods for flow simulation , 1980 .
[13] L. Rosenhead. The Formation of Vortices from a Surface of Discontinuity , 1931 .
[14] Comment on "Discretized Simulation of Vortex Sheet Evolution with Buoyancy and Surf ace Tension Effects" , 1977 .