Approximate Equations for Long Nonlinear Waves on a Viscous Fluid

Jeffrey Topper; Takuji Kawahara

doi:10.1143/JPSJ.44.663

Abstract

A systematic perturbation method is applied to three-dimensional long waves on a viscous liquid film, and the nonlinear evolution equation incorporating the effects of dissipation and dispersion is derived. It is shown that both the fourth-order derivative term as well as the three-dimensionality have stabilizing effects.

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