On the N-wave equations and soliton interactions in two and three dimensions |
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| Authors: | V.S. Gerdjikov R.I. IvanovA.V. Kyuldjiev |
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| Affiliation: | a Institute for Nuclear Research and Nuclear Energy, Bulgarian Academy of Sciences, 1784 Sofia, Bulgariab School of Mathematical Sciences, Dublin Institute of Technology, Kevin Street, Dublin 8, Ireland |
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| Abstract: | Several important examples of the N-wave equations are studied. These integrable equations can be linearized by formulation of the inverse scattering as a local Riemann-Hilbert problem (RHP). Several nontrivial reductions are presented. Such reductions can be applied to the generic N-wave equations but mainly the 3- and 4-wave interactions are presented as examples. Their one and two-soliton solutions are derived and their soliton interactions are analyzed. It is shown that additional reductions may lead to new types of soliton solutions. In particular the 4-wave equations with ?2 × ?2 reduction group allow breather-like solitons. Finally it is demonstrated that RHP with sewing function depending on three variables t, x and y provides some special solutions of the N-wave equations in three dimensions. |
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| Keywords: | Solitons and soliton interactions Wave-wave interactions Rieman-Hilbert Problem Solitons in three dimensions |
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