| [1] Strutt, J.W. and Rayleigh, L. Investigation of the character of the equilibrium of an incompressible heavy fluid of variable density. Proceedings of the London Mathematical Society, 14, 170-177(1882)
[2] Taylor, G. The instability of liquid surfaces when accelerated in a direction perpendicular to their planes. Proceedings of the Royal Society of London A:Mathematical, Physical and Engineering Sciences, 201, 192-196(1950)
[3] Layzer, D. On the instability of superposed fluids in a gravitational field. The Astrophysical Journal, 122, 1-12(1955)
[4] Zufiria, J. A. Bubble competition in Rayleigh-Taylor instability. Physics of Fluids, 31, 440-446(1988)
[5] Sohn, S. I. Density dependence of a Zufiria-type model for Rayleigh-Taylor bubble fronts. Physical Review E, 70, 045301(2004)
[6] Sohn, S. I. Effects of surface tension and viscosity on the growth rates of Rayleigh-Taylor and Richtmyer-Meshkov instabilities. Physical Review E, 80, 055302(2009)
[7] Cao, Y. G., Guo, H. Z., Zhang, Z. F., Sun, Z. H., and Chow, W. K. Effects of viscosity on the growth of Rayleigh-Taylor instability. Journal of Physics A:Mathematical and Theoretical, 44, 275501(2011)
[8] Xia, T. J., Dong, Y. Q., and Cao, Y. G. Effects of surface tension on Rayleigh-Taylor instability. Acta Physica Sinica, 62, 214702(2013)
[9] Li, Y. and Luo, X. S. Theoretical analysis of effects of viscosity, surface tension, and magnetic field on the bubble evolution of Rayleigh-Taylor instability (in Chinese). Acta Physica Sinica, 63, 85203(2014)
[10] White, J., Oakley, J., Anderson, M., and Bonazza, R. Experimental measurements of the nonlinear Rayleigh-Taylor instability using a magnetorheological fluid. Physical Review E, 81, 026303(2010) |
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