Resonant Dispersive Benney and Broer-Kaup Systems in 2+1 Dimensions
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Pashaev, Oktay
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Abstract
We represent the Benney system of dispersionless hydrodynamic equations as NLS type infinite system of equations with quantum potential. We show that negative dispersive deformation of this system is an integrable system including vector generalization of Resonant NLS and 2+1 dimensional nonlocal Resonant NLS. We obtain bilinear form and soliton solutions in these systems and find the resonant character of soliton interaction. Equivalent vector Broer-Kaup system and non-local 2+1 dimensional nonlocal Broer-Kaup equation are constructed.
Description
Physics and Mathematics of Nonlinear Phenomena 2013, PMNP 2013; Gallipoli; Italy; 22 June 2013 through 29 June 2013
Keywords
Broer Kaup equation, Hydrodynamic equations, Infinite system, Integrable systems, Solitons, Infinite system, Broer Kaup equation, Integrable systems, Hydrodynamic equations, Solitons
Fields of Science
0103 physical sciences, 01 natural sciences
Citation
Lee, J. H., and Pashaev, O. (2014). Resonant dispersive Benney and Broer-Kaup systems in 2+1 dimensions. Journal of Physics: Conference Series, 482(1). doi:10.1088/1742-6596/482/1/012026
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482
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1
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