Extended Jacobi Elliptic Function Expansion Method to the ZK-MEW Equation

1. Introduction

It is one of the most important tasks to seek the exact solutions of nonlinear equation in the study of the nonlinear equations. Up to now, many powerful methods have been developed such as inverse scattering transformation [1], Backlund transformation [2], Hirota bilinear method [3], homogeneous balance method [4], extended tanh-function method [5], Jacobi elliptic function expansion method [6] and Ma’s transformed rational function method [7].

Recently [8], an extended-tanh method is used to establish exact travelling wave solution of the Zakharov-Kuznetsov-modified equal-width (ZK-MEW) equation. In this paper, an extended Jacobi elliptic function expansion method is employed to construct some new exact solutions of the Zakharov-Kuznetsov-modified equal-width (ZK-MEW) equation.

The remainder of the paper is organized as follows. In Section 2, we briefly describe the extended Jacobi elliptic function expansion method. In Section 3, we apply this method to ZK-MEW equation to construct exact solutions. Finally, some conclusions are given in Section 4.

2. The Extended Jacobi Elliptic Function Expansion Method

3. ZK-MEW Equation

3.1. The Case of Y = Y(ξ) = snξ = sn(ξ, m)

Substituting Y = Y(ξ) = snξ = sn(ξ, m) and (3.3) into (3.2), making use of (3.4), we obtain a system of algebraic equations, for a₋₁, a₀, a₁, and λ of the following form:

$$ (3.5)

Solving the system of the algebraic equations with the aid of Mathematica we can distinguish two cases, namely the following.

Case 1.

$$ (3.6)

Case 2.

$$ (3.7)

Substituting (3.6), (3.7) into (3.3), respectively, yield, the following solutions of ZK-MEW equation:

$$ (3.8)

$$ (3.9)

Notice that m → 1, snξ → tanhξ, and m → 0, snξ → sinξ, we can obtain solitary wave solutions and sin-wave solutions from (3.8) and (3.9), respectively,

$$ (3.10a)

$$ (3.10b)

$$ (3.11a)

$$ (3.11b)

Here we only give the graph of (3.8) (see Figure 1) and (3.10a) (see Figure 2) and the other graphs of equations are similar to discussing.

3.2. The Case of Y = Y(ξ) = dnξ = dn(ξ, m)

The analysis proceeds of this case is as for Section 3.1. Substituting Y = Y(ξ) = dnξ = dn(ξ, m) and (3.3) into (3.2), making use of (3.4), we obtain a system of algebraic equations, for a₋₁, a₀, a₁ and λ of the following form:

$$ (3.12)

Solving the system of the algebraic equations with the aid of Mathematica we can distinguish three cases, namely, The following.

Case 1.

$$ (3.13)

Case 2.

$$ (3.14)

Case 3.

$$ (3.15)

Substituting (3.13), (3.14), and (3.15) into (3.3), respectively, yields the following solutions of ZK-MEW equation:

$$ (3.16)

$$ (3.17)

$$ (3.18)

Notice that m → 1, dnξ → sechξ, thus we can obtain solitary wave of solutions of ZK-MEW equation from (3.16) and (3.17), respectively,

$$ (3.19)

Here we only give the graph of (3.17) (see Figure 3) and (3.19) (see Figure 4) and the other graphs of equations are similar to discussing.

4. Conclusions

The extended Jacobi elliptic function expansion method was directly and effectively employed to find travelling wave solutions of the nonlinear ZK-MEW equation. Using the method, we found some new solutions of Jacobi elliptic function type that were not obtained by the sine-cosine method, the extended tanh-method, the mapping method, and other methods. In the limiting case of the Jacobi elliptic function (namely, modulus setting 0 or 1), we also obtained the solutions of sin-type, cos-tye, tanh-type, and sech-type. The extended Jacobi elliptic function expansion method can be applied to some other nonlinear equation and gives more solutions.

The ZK-MEW equation was first appeared in Wazwaz’s paper [13] in 2005. To my acknowledge, its many properties, such as integrability, Lax pairs, and multisoliton solutions, have not been studied. The study of these properties is a very signification work and is our task research in the future.