Some New Exact Solutions of (1+2)-Dimensional Sine-Gordon Equation

and Applied Analysis 3 where n is the modulus of the Jacobi elliptic function sn(z) = sn(z, n). Finally, the accurate expression of Φ is gained: Φ = − i ln [[2 (ω 1 + aωS) (k 1 + akS) × tanh [ξ 1 + a ln (D − nC)

Recently, some new useful and powerful methods have been proposed to search for the accurate solutions of nonlinear partial differential equations, such as the general algebra method for the coupled Schrödinger-Boussinesq equations [31], the general mapping deformation method for the generalized variable-coefficient Gardner equation with forcing term [32], the generalized tanh function expansion method for the Abowitz-Kaup-Nwell-Segur system [33], the bosonized supersymmetric KdV model [34], and the Broer-Kaup system [35].Significantly, the generalized tanh function expansion method is an effective new technique for us to obtain some new interaction solutions of 2DsG equation.Also, we can solve the 2DsG equation by a direct method 2 Abstract and Applied Analysis based on the mapping relations between 2DsG equation and the cubic nonlinear Klein-Gordon (CNKG) equation.This method can be also applied to solve the double sine-Gordon equation, the triple sine-Gordon equation, and the Ginzburg-Landau equation [36], and so forth.In this paper, we want to seek more interaction solutions of new types among solitary waves and periodic waves of the 2DsG equation by the generalized tanh function expansion method and the direct method.
This paper is organized as follows.In Section 2, a kinkperiodic wave interaction solution of 2DsG equation is obtained by using of the generalized tanh function expansion method.In Section 3, two-periodic solitoff solution, periodic soliton-periodic travelling wave interaction solution, twotoothed-solitoff solution, and periodic solitoff-kink interaction solution of 2DsG equation are obtained by using the direct method.In Section 4, a short summary and discussions are given.

Kink-Periodic Wave Interaction Solutions
The 2DsG equation ( 1) cannot be solved directly by the generalized tanh function expansion method [33][34][35], and to find some soliton-periodic wave interaction solutions of 2DsG equation, we suppose and take the following coordinates transformation: Then, we substitute (2) with (3) into (1) and arrive at with the constants  1 ,  2 ,  1 , and  2 satisfying It is worth noting that (4) can be solved by using the generalized tanh function expansion method.Firstly, we set where  2 ,  1 ,  0 , and Ψ are functions of variables (, ).
In order to obtain some soliton-periodic wave interaction solutions, let where  1 =  1  +  1 ,  =  + , in which , ,  1 , and  1 are undetermined constants.Then, we substitute ( 6) and ( 7) into (4) and analyse the coefficients of function tanh(Ψ) order by order we get the expression of where the functions  2 () and  3 () satisfy Furthermore,  2 () is a solution of the following Jacobi elliptic function equation: with these parameters  0 ,  1 ,  2 , and  3 satisfying where , and  = (3ℎ + )/2, in which  1 ̸ =  1  and  is a constant.Now we choose the sine Jacobi elliptic function as a solution of (10), and the functions  1 () and  3 () are easy to be obtained Then substituting ( 12), (13), and ( 11) into (10), relationships of these parameters are written as Abstract and Applied Analysis where  is the modulus of the Jacobi elliptic function sn() = sn(, ).
Finally, the accurate expression of Φ is gained: where  = sn(),  = cn(), and  = dn().The solution of ( 15) denotes a kink-periodic wave interaction solution of 2DsG equation.Velocities of these two travelling waves are Figure 1 shows the density distribution of a kinkperiodic wave interaction solution on the x-y plane given by [− exp(Φ)] and ( 15) with these parameters ( at time  = 1.This figure exhibits a special interaction structure of a kink and a periodic wave.Figure 2 shows the propagation of the kink-periodic wave solution at  = 0 and  = 1.In this figure, the soliton propagates along the negative direction of the x-axis, and its velocity is quicker than the one of the periodic wave, which also propagates along the negative  direction.

Solitoff, Periodic Soliton-Periodic Travelling Wave, and Periodic Solitoff-Kink Interaction Solutions
In this section, we use the direct method to study the 2DsG equation.Based on the Lamb substitution [20,21], the solution of (1) can be set to the following form: in which the function (, , ) is the solution of the CNKG equation [30,36], under the constrained condition with  =  − .Function (, , ) can be various styles, such as exp, tanh, sn, and dn [36].Here we take where function Ṽ = (√||)/( + 1), in which  is a function of variables (, , ), and the constant  is the modulus of the Jacobi elliptic function.Then, we substitute ( 17) and ( 20) into 2DsG equation and get with the constrained conditions Here we define then an arbitrary function V() can be included in the function  by solving (22), namely, and parameters  01 ,  02 ,  11 ,  12 ,  0 , and  1 satisfy where the sign "±" in ( 22) and ( 25) takes "−" when  > 0 and takes "+" when  < 0. Due to the existence of the arbitrary functions, abundant exact solutions of (1) will be obtained as long as the function V() is properly selected.
When we take We know that a solitoff is defined as a half line soliton.The solution of ( 27) indicates a solitoff type solution constructed by two travelling waves that propagate in different directions.Velocities of these two travelling waves are Figure 3 shows a two-periodic solitoff solution ( 27) with these parameters at time  = 0.The angle of the two-periodic solitoff in this figure is actually an obtuse angle although it seems to be orthogonal.It is because ⃗  1 ⋅ ⃗  2 =  01  11 +  02  12 =  0  1 ̸ = 0. Figure 4 shows more details of the two-periodic solitoff solution (27) with (28).The two-periodic solitoff solution with different wavelength has the same amplitude and keeps the peak unchanged during the propagation process.Their phase velocities are different, but their travelling directions are same; they propagate along the negative y-axis.
A periodic soliton-periodic travelling wave interaction solution of 2DsG equation can be obtained: by choosing at time  = 0.The solitoff-type structure solution does not appear, whereas these two travelling waves propagate in the different directions.The graph is similar to the solitonperiodic interaction wave in [33], but the soliton really has the periodicity and the peak of the soliton keeps periodically changing.Figure 5(b) shows the density distribution of Φ on the x-y plane.Furthermore, if we take then a two-sawtooth-solitoff solution and a periodic solitoffkink interaction solution of 2DsG equation can be written as respectively.Figure 6 shows a two-toothed-solitoff solution (33) with (31) in the limit case of the modulus  = 1.The twotoothed-solitoff structure is constructed by a kink soliton and an antikink soliton.Their travelling velocities are different, but group velocities are the same.And travelling directions of these two solitoff waves construct a constant acute angle during the propagation process.Figure 7(a) displays a periodic solitoff-kink interaction solution constructed by a bright soliton and a kink soliton.Figures 7(b)-7(d) show that the bright soliton and the kink soliton have different travelling velocities, and they propagate along the negative x-axis.The peak of the bright soliton keeps increasing until it is arriving at the same amplitude of the kink soliton.

Summary and Discussion
First of all, we use the generalized tanh function expansion method to solve the 2DsG equation; a special new kinkperiodic wave interaction solution is explicitly expressed both analytically and graphically.This interaction solution between tanh-type soliton and periodic wave of 2DsG equation is firstly obtained.Then, we use the direct method and obtain more new interaction solutions of the 2DsG equation, including the two-periodic solitoff solution (27), periodic soliton-periodic travelling wave interaction solution (29), two-toothed-solitoff solution (33), and periodic solitoff-kink interaction solution (34).The solution (34) is a generalization of a single straight-line kink soliton solution, while the solution ( 33) is an alternative generalization of periodic straight-line solitoff type of kink soliton solution.These types of interaction solutions are also firstly found for the 2DsG equation.All of these solutions indicate the interaction solution among solitary waves and periodic waves; their travelling velocities are different, but group velocities are same, and they propagate in different trajectories which contain linear shape, curve shape, and saw-tooth shape.In fact, the forms of ( 12) and (20) can be not only taken the sine Jacobi elliptic function (sn), more functions can be selected such as exp, cn, and cn/sn, and more explicit solutions can be gained.The abundant solutions solved by these two methods suggest that the rich structures of nonlinear systems do not only exist in the integrable systems but also in the nonintegrable systems.Furthermore, there are some types of localized solutions decaying in all directions, for instance, the dromions and ring solitons have not been found by these two methods; those will be left for us to do more research.