Exact Solution of Boussinesq equations for propagation of nonlinear waves
Oleg V. Kaptsov (Institute of Computational Modeling SB RAS)
Abstract: In this paper, we consider two Boussinesq models that describe propagation of small-amplitude long water waves. Exact solutions of the classical Boussinesq equation that represent the interaction of wave packets and waves on solitons are found. We use the Hirota representation and computer algebra methods. Moreover, we find various solutions for one of the variants of the Boussinesq system. In particular, these solutions can be interpreted as the fusion and decay of solitary waves, as well as the interaction of more complex structures.
mathematical softwaresymbolic computationmathematical physicsanalysis of PDEsclassical analysis and ODEsdynamical systemsnumerical analysisexactly solvable and integrable systemscomputational physics
Audience: researchers in the topic
( paper )
Mathematical models and integration methods
Organizers: | Oleg Kaptsov, Sergey P. Tsarev*, Yury Shan'ko* |
*contact for this listing |