A one-soliton solution of the equation with generalized evolution and time-dependent coefficients

A generalized KdV equation with time-dependent coefficients will be studied. The BBM equation with time-dependent coefficients and linear damping term will also be examined. The wave soliton ansatz will be used to obtain soliton solutions for both equations. The conditions of existence of solitons a

This paper obtains the 1-soliton solution of the Bðm; nÞ equation, that is the generalized form of the Boussinesq equation, with generalized evolution term. The solitary wave ansatz is used to obtain the solution. The four exhaustive cases, depending on the parameters, are considered.

This paper studies the modified Korteweg-de Vries equation with time variable coefficients of the damping and dispersion using Lie symmetry methods. We carry out Lie group classification with respect to the time-dependent coefficients. Lie point symmetries admitted by the mKdV equation for various f

The time-dependent neutron transport equation in an infinite medium with time-varying cross sections has been solved by means of two techniques namely, flux-limited approach and maximum entropy method. The behaviour of the distribution function are shown graphically. Knowing the distribution functio