On soliton structure of higher order (2+1)-dimensional equations of a relaxing medium beneath high-frequency perturbations

Details On soliton structure of higher order (2+1)-dimensional equations of a relaxing medium beneath high-frequency perturbations On soliton structure of higher order (2+1)-dimensional equations of a relaxing medium beneath high-frequency perturbations

2007-09-27

arxiv.org/abs/0709.4449v1

Physics

Mathematical Physics

4 pages

Scientific paper

We investigate the soliton structure of novel (2+1)-dimensional nonlinear
partial differential evolution(NLPDE) equations which may govern the behavior
of a barothropic relaxing medium beneath high-frequency perturbations. As a
result, we may derive some soliton solutions amongst which three typical
pattern formations with loop-, cusp- and hump-like shapes.

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