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Effects of vorticity on the travelling waves of some shallow water two-component systems

In the present study we consider three two-component (integrable and non-integrable) systems which describe the propagation of shallow water waves on a constant shear current. Namely, we consider the two-component Camassa-Holm equations, the Zakharov-Ito system and the Kaup--Boussinesq equations all including constant vorticity effects. We analyze both solitary and periodic-type travelling waves using the simple and geometrically intuitive phase space analysis. We get the pulse-type solitary wave solutions and the front solitary wave solutions. For the Zakharov-Ito system we underline the occurrence of the pulse and anti-pulse solutions. The front wave solutions decay algebraically in the far field. For the Kaup-Boussinesq system, interesting analytical multi-pulsed travelling wave solutions are found.

preprint2019arXivOpen access
Denys DutykhDelia Ionescu-Kruse
nlin.PSphysics.ao-phphysics.flu-dynnlin.SIphysics.class-ph
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Denys DutykhDelia Ionescu-Kruse

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