Application of the -expansion method for the Burgers, Fisher and Burgers–Fisher equations (original) (raw)

A New (G'/G)-Expansion Method and Its Application to the Burgers Equation

Walailak Journal of Science and Technology, 2013

In this article, a new (G G / ′)-expansion method is proposed, where) (ξ G G = satisfies a second order nonlinear ordinary differential equation to seek the travelling wave solutions of nonlinear evolution equations. The Burgers equation is chosen to illustrate the validity and advantages of proposed method. Hyperbolic function, trigonometric function and rational function solutions with arbitrary constants are obtained from which some special solutions, including the known solitary wave solution, are derived by setting the appropriate values of constants. It is shown that the new (G G / ′)-expansion method is effective, and gives new, more general, travelling wave solutions than the existing methods, such as the basic (G G / ′)-expansion method, the extended (G G / ′)-expansion method, the improved (G G / ′)expansion method, the generalized and improved (G G / ′)-expansion method etc.

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

Pramana, 2011

In this work, we present travelling wave solutions for the Burgers, Burgers-Huxley and modified Burgers-KdV equations. The (G /G)-expansion method is used to determine travelling wave solutions of these sets of equations. The travelling wave solutions are expressed by the hyperbolic functions, the trigonometric functions and the rational functions. It is shown that the proposed method is direct, effective and can be used for many other nonlinear evolution equations in mathematical physics.

New Exact Traveling Wave Solutions to Burgers Equation

Journal of Scientific Research and Reports

In this letter, we seek new traveling wave solutions to Burgers equation via a new approach of improved) / (G G -expansion method. We handle the calculations with the aid of computer software Maple-13. As a result, many periodic and soliton like solutions have been achieved in terms of the hyperbolic functions, trigonometric functions, exp-functions and rational function solutions. The method is very simple for solving nonlinear evolution equations (NLEEs). Further, both two and three-dimensional plots of the obtained wave solutions are also given to imagine the dynamics of the equation.

Some New Non-Travelling Wave Solutions of the Fisher Equation with Nonlinear Auxiliary Equation

Oriental Journal of Physical Sciences

We have generated many new non-travelling wave solutions by executing the new extended generalized and improved (G'/G)-Expansion Method. Here the nonlinear ordinary differential equation with many new and real parameters has been used as an auxiliary equation. We have investigated the Fisher equation to show the advantages and effectiveness of this method. The obtained non-travelling solutions are expressed through the hyperbolic functions, trigonometric functions and rational functional forms. Results showing that the method is concise, direct and highly effective to study nonlinear evolution equations those are in mathematical physics and engineering.

Abundant traveling wave solutions of the compound KdV-Burgers equation via the improved (Gʹ∕G)-expansion method

AIP Advances, 2012

In this article, we investigate the compound KdV-Burgers equation involving parameters by applying the improved G /G -expansion method for constructing some new exact traveling wave solutions including solitons and periodic solutions. The second order linear ordinary differential equation with constant coefficients is used, in this method. The obtained solutions are presented through the hyperbolic, the trigonometric and the rational functions. Further, it is significant to point out that some of our solutions are in good agreement for special cases with the existing results which validates our other solutions. Moreover, some of the obtained solutions are described in the figures. Copyright 2012 Author(s). This article is distributed under a Creative Commons Attribution 3.0 Unported License. [http://dx.

Exact traveling wave solutions of nonlinear variable-coefficients evolution equations with forced terms using the generalized ( G′/G)-expansion method

Computational Mathematics and Modeling, 2013

The exact traveling wave solutions of the nonlinear variable coefficients Burgers-Fisher equation and the generalized Gardner equation with forced terms can be found in this article using the generalized (G G)-expansion method. As a result, hyperbolic, trigonometric and rational function solutions with parameters are obtained. When these parameters are taken special values, the solitary wave solutions are derived from the hyperbolic function solutions. It is shown that the proposed method is direct, effective and can be applied to many other nonlinear evolution equations in the mathematical physics.

General Solution of Two Generalized Form of Burgers Equation by Using the (<i>G</i><sup>'</sup>/<i>G</i>)-Expansion Method

Applied Mathematics, 2012

In this work, the G G       -expansion method is proposed for constructing more general exact solutions of two general form of Burgers type equation arising in fluid mechanics namely, Burgers-Korteweg-de Vries (Burgers-KdV) and Burger-Fisher equations. Our work is motivated by the fact that the G G       -expansion method provides not only more general forms of solutions but also periodic and solitary waves. If we set the parameters in the obtained wider set of solutions as special values, then some previously known solutions can be recovered. The method appears to be easier and faster by means of a symbolic computation system.