A class of nondispersive evolution equations with solitary wave solutions

Many physical phenomena in one-or higher-dimensional space can be described by nonlinear evolution equations, which can be reduced to ordinary differential equations such as the Lienard equation. Thus, to study those ordinary differential equations is of significance not only in mathematics itself,

A direct series method to find exact travelling wave solutions of nonlinear PDEs is appfied to Hirota's system of coupled Korteweg-de Vries equations and to the sine-Gordon equation. The straightforward but lengthy algebraic computations to obtain single and multi-soliton solutions can be carried ou

A set of coupled Boussinesq-like equations arise in the continuum limit of a Toda lattice performing longitudinal and transversal motion. The cases of quartic and cubic approximations of the Toda potential are considered. In the latter case new solitary wave solutions are obtained by means of a gene