An intermediate wavelength, weakly nonlinear theory for the evolution of capillary gravity waves |
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| Authors: | Julia M. Rees William B. Zimmerman |
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| Affiliation: | a School of Mathematics and Statistics, University of Sheffield, Hicks Building, Hounsfield Road, Sheffield S3 7RH, UKb Department of Chemical and Biological Engineering, Newcastle Street, University of Sheffield, Sheffield S1 3RD, UK |
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| Abstract: | A new nonlinear evolution equation is derived for surface solitary waves propagating on a liquid-air interface where the wave motion is induced by a harmonic forcing. Instead of the traditional approach involving a base state of the long wave limit, a base state of harmonic waves is assumed for the perturbation analysis. This approach is considered to be more appropriate for channels of length just a few multiples of the depth. The dispersion relation found approaches the classical long wave limit. The weakly nonlinear dispersive waves satisfy a KdV-like nonlinear evolution equation with steeper nonlinearity. |
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| Keywords: | Surface waves Evolution equation Dispersion relation Fredholm alternative theorem |
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