Soliton perturbation theory for a higher order Hirota equation

The soliton perturbation theory is used to study the adiabatic parameter dynamics of solitons due to the generalized fifth-order KdV equation in presence of perturbation terms. The adiabatic change of soliton velocity is also obtained in this paper.

The soliton perturbation theory is used to study the solitons that are governed by the modified nonlinear Schro ¨dinger's equation. The adiabatic parameter dynamics of the solitons in presence of the perturbation terms are obtained. In particular, the nonlinear gain (damping) and filters or the coef

The soliton perturbation theory is used to study the adiabatic parameter dynamics of solitons due to the Benjamin-Bona-Mahoney equations in presence of perturbation terms. The change in the velocity is also obtained in this paper.

The extended homogeneous balance method is used to construct exact traveling wave solutions of a generalized Hirota-Satsuma coupled KdV equation, in which the homogeneous balance method is applied to solve the Riccati equation and the reduced nonlinear ordinary differential equation, respectively. M

The adiabatic parameter dynamics of solitons, due to fifth order KdV-type equations with power law nonlinearity, is obtained with the aid of soliton perturbation theory. In addition, the small change in the velocity of the soliton, in the presence of perturbation terms, is also determined in this wo