Application of the((G^{prime})/(G))-expansion method for the Burgers, Burgers–Huxley and modified Burgers–KdV equations

## Abstraet--A relatively new decomposition method is presented to find the explicit and numerical solutions of the two-dimensional Korteweg-de Vries Burgers' equation (tdKdVB for short) for the initial conditions. Some numerical results are also given for this equation by using the decomposition

## Abstract We introduce the discrete (__G__′/__G__)‐expansion method for solving nonlinear differential–difference equations (NDDEs). As illustrative examples, we consider the differential–difference Burgers equation and the relativistic Toda lattice system. Discrete solitary, periodic, and ration

The Modified Local Crank-Nicolson method is applied to solve one-and two-dimensional Burgers' equations. New difference schemes that are explicit, unconditionally stable, and easy to compute are obtained. Numerical solutions obtained by the present method are compared with exact solutions, and it is