Abstract

The consistent tanh expansion (CTE) method has been succeeded to apply to the nonintegrable (3+1)-dimensional Kadomtsev-Petviashvili (KP) and (2+1)-dimensional Boussinesq equations. The interaction solution between one soliton and one resonant soliton solution for the (3+1)-dimensional KP equation is obtained with CTE method. The interaction solutions among one soliton and cnoidal waves for these two equations are also explicitly given. These interaction solutions are investigated in both analytical and graphical ways. It demonstrates that the interactions between one soliton and cnoidal waves are elastic with phase shifts.

1. Introduction

The investigation of exact solutions of nonlinear partial differential equations (PDEs) plays an important role in the study of nonlinear physical phenomena. Many methods for seeking solutions of PDEs have been developed, such as the inverse scattering method [1], Hirota’s bilinear method [2], symmetry reductions [3], Darboux transformation [4], algebrogeometric method [5], homogeneous balance method [6], and multiple exp-function method [7]. However, except for the soliton-soliton interaction solution, it is very difficult to find interaction solutions among different types of nonlinear excitations with these methods. Recently, a consistent tanh expansion (CTE) method is developed to find interaction solutions between solitons and any other types of solitary waves [8, 9]. The method has been valid for a lot of integrable systems [1015]. The method for the nonintegrable nonlinear systems is much less studied. In this paper, we use the CTE method to study two typical nonintegrable systems. The interaction solutions between solitons and any other types of solitary waves for these two equations are obtained via the CTE method. These interaction solutions are completely different from those obtained via other methods [6, 1618].

The structure of this paper is organized as follows. In Section 2, the CTE approach is developed to the (3+1)-dimensional KP equation. The interaction solutions among one soliton and other types of solitary waves such as one resonant soliton solution and cnoidal waves are explicitly given. The interactions between one soliton and cnoidal waves are elastic with phase shifts. According to the above procedure of solving the KP equation, the interaction solutions for the Boussinesq equation are presented in Section 3. The last section is a simple summary and discussion.

2. CTE Method and Interaction Solutions for (3+1)-Dimensional KP System

The (3+1)-dimensional Kadomtsev-Petviashvili (KP) equation reads which has been directly applied in plasma physics. It has also been studied to figure problems of three-dimensional wave structures per se, the wave of collapse of sonic waves, and the self-focusing of the beams of the fast magnetosonic waves propagating in magnetized plasma [1922].

According to the CTE method, we take the tanh function expansion as the following form by using the leading order analysis [8]: where , , , and are arbitrary functions of . Vanishing the coefficients of powers of , , and after substituting (2) into the (3+1)-dimensional KP system (1), we get Collecting the coefficients of , , , and , we get four overdetermined systems for the field . We omit the expression of these four overdetermined systems since they are very lengthy. According to the CTE approach, we obtain the nonauto-Bäcklund transformation (BT) theorem of (3+1)-dimensional KP equation (1).

Nonauto-BT Theorem  1. If one finds the solution to satisfy these four overdetermined systems consistently, then , with will be a solution of (3+1)-dimensional KP system (1).

By means of the nonauto-BT Theorem  1, some special interaction solutions among solitons and other kinds of complicated waves can be obtained. We will give some concrete interesting examples in the following.

A quite trivial straight line solution for the overdetermined systems has the form where , , , and are the free constants. Substituting the trivial solution (5) into (4), one soliton solution of the (3+1)-dimensional KP system yields The nontrivial solution of the (3+1)-dimensional KP equation is found from the quite trivial solution of (5).

To find the interaction solutions between one soliton and other nonlinear excitations, we can use the solutions with one straight line solution (5) plus undetermined waves for the field . For the interaction solution between one soliton and one resonant soliton solution of the (3+1)-dimensional KP equation, we assume where , , , and are arbitrary constants. Substituting expression (7) into overdetermined systems, (7) should be the solution of overdetermined systems with the following relations: Figure 1 displays the interaction behavior between one soliton and one resonant soliton solution with the parameters selected as , , , , , and . This phenomenon can be observed on the sea surface. Solution (7) is useful for applying in maritime security and coastal engineering.

To find the interaction solutions between one soliton and cnoidal periodic waves, we assume the interaction solution form as Substituting expression (9) into four overdetermined systems, these four equations will be consistent and the consistent condition is where and denote the derivative of and with respect to , respectively, and where and are arbitrary constants. The general solution of (10) can be written out in terms of Jacobi elliptic functions [23, 24]. Hence, the solution expressed by (4) is just the explicit interaction solutions between one soliton and cnoidal periodic waves. In the following, we give one special case for this kind of interaction solution.

We take the solution of (10) as Substituting (12) into (10) and vanishing all the coefficients of different powers of the Jacobi elliptic function , the interaction solution between one soliton and the cnoidal wave solution of (3+1)-dimensional KP system (1) giveswhere , , and are the usual Jacobian elliptic functions with modulus and It is remarkable that solution (13) describes interaction between one soliton and the cnoidal wave. Figure 2 plots a dark soliton coupled to a cnoidal wave background with the parameters , , , , , , , , and . Figures 2(a) and 2(b) exhibit the wave interaction structure for (3+1)-dimensional KP equation solution (13) at and , respectively. Figure 2(c) is three-dimensional view of corresponding solution (13). Figure 2(d) demonstrates the interaction behavior between a soliton and every peak of the periodic wave. It is easy to observe that the interaction between a soliton and every peak of the cnoidal periodic wave is elastic except phase shifts. In the ocean, there are some typical nonlinear waves such as interaction solutions between solitons and cnoidal periodic waves [23]. We introduce the interaction solutions which may be useful for studying the ocean waves.

3. CTE Method and Interaction Solutions for (2+1)-Dimensional Boussinesq System

The (2+1)-dimensional Boussinesq equation reads It was derived by combining the classical Boussinesq equation with the weak dependence on the second spatial dimension [25]. It can be used to describe the propagation of gravity waves on water surface, in particular the head-on collision of oblique waves [25, 26].

According to the same as the above-mentioned steps, the tanh function expansion has the form [8] where , , , and are arbitrary functions of . Vanishing the coefficients of powers of , , and after substituting (16) into the Boussinesq system (15), we get Gathering the coefficients of , , , and , we get four overdetermined systems for the field . The following nonauto-BT theorem for (2+1)-dimensional Boussinesq equation (15) is obtained with above calculation.

Nonauto-BT Theorem. If one finds the solution to satisfy four overdetermined systems consistently, then , with will be a solution of (2+1)-dimensional Boussinesq system (15). To find the interaction solutions between one soliton and cnoidal periodic waves, we assume the interaction solution form as where , , , , , and are all the free constants. Substituting (19) into overdetermined systems, we obtain an equation about as where and indicate the derivative of and with respect to , respectively, and where and are arbitrary constants. We also give one special case to show interaction solutions between one soliton and cnoidal periodic waves.

We assume the solution of (20) as Substituting (22) into (20) and vanishing all the coefficients of different powers of the Jacobian elliptic function , the interaction solution between one soliton and the cnoidal wave solution of (2+1)-dimensional Boussinesq system (15) gives where , , and are the usual Jacobian elliptic functions with modulus and Figure 3 is a special plot of this interaction solution with the parameters , , , , , , and . Figures 3(a) and 3(b) exhibit the wave interaction structure for (2+1)-dimensional Boussinesq equation solution (23) at and , respectively. Figure 3(c) is three-dimensional view of corresponding solution (23). Figure 3(d) shows that the interaction between soliton and the cnoidal wave (every peak of the cnoidal wave) is elastic except for phase shifts.

4. Conclusions

In summary, the (3+1)-dimensional KP and (2+1)-dimensional Boussinesq equations are studied by means of the CTE method. A nonauto-BT theorem for these two systems is given with the CTE method. With the help of the nonauto-BT theorem, the interaction solutions between one soliton and cnoidal waves are obtained for these two systems. The interaction between one soliton and every peak of the cnoidal periodic wave is elastic with phase shift. Besides the interaction solution between one soliton and one resonant soliton solution for (3+1)-dimensional KP equation is also derived with the nonauto-BT theorem. The interaction solutions for these two nonintegrable equations were not found before. It may be useful for studying the ocean waves. In the meanwhile, other methods such as the truncated Painlevé expansion [8], Darboux transformation [23, 24, 27, 28], and Bäcklund transformation [29] related nonlocal symmetries have been also used to obtain the interaction solutions among solitons and other nonlinear excitations. The details on these interaction solutions for other nonlinear systems are worthy of further study.

Conflict of Interests

The authors declare that there is no conflict of interests regarding the publication of this paper.

Acknowledgments

This work was partially supported by the National Natural Science Foundation of China under Grant nos. 11305106, 11275129, and 11405110 and the Natural Science Foundation of Zhejiang Province of China under Grant no. LQ13A050001.