1.Introduction

Many fields of physics benefit from the nonlinear partial differential equations (NPDEs) in a wide variety of applications to mechanics, electrostatics, quantum mechanics, and finance. In linear theory, solutions usually have representation formulas and conform to the superposition principle. Despite some equations governing nature were recognized to be linear since the 19th century, this advance was widely criticized in the 20th century. It is possible to observe NPDEs not only in non-Newtonian fluids, glaciology, rheology but also in stochastic game theory, nonlinear elasticity, flow through a porous medium, and image-processing. As a result, no available superposition can be found for nonlinear equations; therefore, there is a need for studying those equations. Over the last few years, a crucial number of new methods have been proposed to obtain exact solutions for NPDEs. The Davey-Stewartson equation (DSE) has been studied in many areas of research such as chemical engineering, nonlinear mechanics, biology, and physics. To define the evolution of a three-dimensional wave packet in finite depth water, Davey-Stewartson (1974) had presented the DSE in his research study about fluid dynamics¹.

In (2+1)-dimensions, the Davey-Stewartson equation is known as a solution equation that examines long and short wave resonances and other wave propagation patterns. For more details, we refer to the previous research works conducted in Refs. ^2-3. The Davey-Stewartson theory is an NPDE for a complex field (wave-amplitude) q and a real field (mean flow) ϕ which is described by the following nonlinear coupled system

ϕxx-δ2ϕyy-2λ(|q|2)x=0. (1.1)

This important system of equations has attracted the attention of many researchers. For example, the line soliton ⁴, the semi-inverse variational principle method (SIVPM), the improved tan(ϕ/2) -expansion method (ITEM) along with the generalized G´/G-expansion method (GGM) ⁵, the G’/G method and the 1-soliton solution ⁶, the Galerkin methods ⁷, the extended tanh-function method ⁸, the generalized Kudryashov method ⁹, the traveling wave solutions ¹⁰, the first integral method ¹¹, the solitary wave solution ¹², the dynamical system method ¹³, the traveling waves solution and the exponential function method ¹⁴, the inverse scattering transform method and the soliton solutions ¹⁵, the self-similar solutions ¹⁶, the bilinear method ^17,18, the single soliton and multi-soliton solutions ¹⁹, the G´/G -expansion method ²⁰, the generalized tan(ϕ/2) method and the He’s semi-inverse variational method ²¹, and the bifurcation method ^22,23. Others popular techniques can be found in Ref. ^24,43.

In Ref. ⁴⁴, Ghanbari and his collaborator developed an efficient methodology for obtaining exact solutions to NPDEs which is known as a generalized exponential rational function method (GERFM). The authors applied the technique to solve the resonant nonlinear Schrödinger equation (R-NLSE). It has been proven over time that the method enables us to be implemented in many different NPDEs arising in mathematics, physics, and engineering ^45-54. The proposed method reproduces many types of precise solutions, and it is very useful for finding the exact solutions of the equation with relative ease. Recently, a new version of the method for solving partial differential equations with local fractional derivatives has been considered in Ref. ^55,56.

In this paper, the GERFM is used to solve the Davey-Stewartson equation. This paper consists of the following parts: In Sec. 2, we introduce the methodology of the GERFM. In Sec. 3, the results of using the method in determining the solutions of the equation (according to the main achievement of this article) will be presented. Finally, the article ends with some concluding remarks.

2.Methodology of the GERFM

The technique is a very efficient method in solving partial differential equations ⁴⁴. The basic steps of using this method are listed below.

1.NPDE will be accepted as follows:

To abbreviate the NPDEs is the following ordinary differential equation (ODE), it will be used u(ξ)=u(x,t) and ξ=kx-lt.

F(u,u',u″,…)=0, (2.2)

2.The crucial part of the new methodology comes from the fact that Eq.(2.2) has the formal solution of

u(ξ)=A0+∑k=1mAkΞ(ξ)k+∑k=1mBkΞ(ξ)-k, (2.3)

where

Ξ(ξ)=p1eq1ξ+p2eq2ξp3eq3ξ+p4eq4ξ. (2.4)

The real (or complex) unknown constants are A0,Ak,Bk(1≤k≤m), and pk,qk(1≤k≤4). These coefficients are determined in such a way that Eq.(2.3) satisfies the nonlinear ODE of Eq. (2.2).

Also, it is essential to determine the positive integer m by the principle of balancing.

3.By adding all terms and inserting Eq. (2.3) into Eq.(2.2), the left-hand side of Eq.(2.2) is converted into the polynomial equation P(Y1,Y2,Y3,Y4)=0 in terms of Yi=eqiξ for i = 1,…,4. With the help of symbolic calculation in Maple, we obtain a set of simultaneous algebraic equations for pn,qn(1≤n≤4), and k,ω,λ,A0,A1,B1 by eliminating each coefficient of P.

4.Finally, exact solutions to Eq.(2.1.) are derived through solving the algebraic nonlinear system of equations in step 3.

3.The results

The first step is the traveling wave transformation of Eq.(1.1) by utilizing the following new variables

and

ξ=iμ(x+y-ηt),θ=αx+βy+γt. (3.2)

In addition, constants of μ, η, α, and β should be determined. Using the wave transformation of Eq.(3.1) and Eq.(1.1) together with η=αδ2+βδ4, the following system of nonlinear ODE is obtained ⁵:

122γ+α2δ2+β2δ4U-12μ2δ21+δ2U″+λU3-iμUV´=0, (3.3)

μδ2-1V´´-2iλ(U2)'=0. (3.4)

Integrating Eq. (3.4), we obtain

V=2iλμ(δ2-1)∫U2dξ. (3.5)

Substituting Eq.(3.5) in Eq.(3.3) will turn into the following nonlinear differential equation:

12μ2δ2(δ4-1)U″+12(δ2-1)(2γ+α2δ2+β2δ4)U-λ(1+δ2)U3=0, (3.6)

where primes denote the derivatives with respect to ξ. By balancing terms of U'' and U ³ in Eq. (3.6) using homogenous principle yields 3m = m +2, so m = 1. Accordingly, the solution of Eq.(1.1) is expressed as follows:

U(ξ)=A0+A1Ξ(ξ)+B1Ξ(ξ). (3.7)

By following the described methodologies in section 2, we obtain several non-trivial solutions of (1.1).

Family 1: We attain the results for p = [1,1,-1,1] and q = [1,-1,1.-1], which gives

Ξ(ξ)=cosh⁡(ξ)sinh⁡(ξ). (3.8)

Case 1:

α=α, β=iα2δ4+(2A12λ-α2+2γ)δ2+2A12λ-2γδ2δ2-1,μ=λA1δδ2-1,δ=δ,γ=γ,A0=0,A1=A1,B1=0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U1(ξ)=A1cosh⁡(ξ)sinh⁡(ξ),V1(ξ)=2iλA12(ξ-coth(ξ))μ(δ2-1). (3.9)

Hence, the following exact solution was reached for Eq.(1.1):

q1(x,y,t)=(A1cosh⁡[ξ]sinh⁡[ξ])ei(αx+βy+γt),ϕ1(x,y,t)=(2iλA12[ξ-coth(ξ)]μ[δ2-1])ei(αx+βy+γt). (3.10)

Case 2:

α=α,β=iα2δ4+(8A12λ-α2+2γ)δ2+8A12λ-2γδ2δ2-1,μ=λA1δδ2-1,δ=δ,γ=γ,A0=0,A1=A1,B1=A1.

We have replaced the above values with Eqs. Eq.(3.7) and (3.8) together with (3.5)

U2(ξ)=(2[cosh⁡(ξ)]2-1)A1cosh⁡(ξ)sinh⁡(ξ),V2(ξ)=2iλA12(4ξcosh⁡[ξ]sinh⁡[ξ]-2[cosh⁡{ξ}]2+1)cosh⁡(ξ)sinh⁡(ξ)μ(δ2-1). (3.11)

Hence, the following exact solution has been reached for Eq.(1.1):

q2(x,y,t)=([2{cosh⁡(ξ)}2-1]A1cosh⁡[ξ]sinh⁡[ξ])ei(αx+βy+γt),ϕ2(x,y,t)=(2iλA12[4ξcosh⁡(ξ)sinh⁡(ξ)-2\lefllcosh⁡(ξ)\rigll2+1]cosh⁡[ξ]sinh⁡[ξ]μ[δ2-1])ei(αx+βy+γt). (3.12)

Case 3:

α=α,β=β,μ=i/22β2δ4+α2δ2+2γδδ2+1,δ=δ,γ=γ,A0=0,A1=0,B1=-i2δ4-1β2δ4+α2δ2+2γλ(2δ2+2).

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U3(ξ)=-i/22δ4-1β2δ4+α2δ2+2γsinh⁡(ξ)λ(δ2+1)cosh⁡(ξ),V3(ξ)=-i(δ4-1)(β2δ4+α2δ2+2γ)(ξ-tanh⁡(ξ))μ(δ2-1)(δ2+1)2. (3.13)

Hence, the following exact solution has been reached for (1.1):

q3(x,y,t)=(-i/22δ4-1β2δ4+α2δ2+2γsinh⁡(ξ)λ[δ2+1]cosh⁡[ξ])ei(αx+βy+γt),ϕ3(x,y,t)=(-iδ4-1β2δ4+α2δ2+2γξ-tanh⁡(ξ)μδ2-1δ2+12)ei(αx+βy+γt). (3.14)

Figure 1 shows the dynamic behavior of modulus of solutions q3x,y,t (left) and ϕ3x,y,t for δ=1.05,γ=1.3,α=β=0.5,λ=1.5, and t = 1.

Family 2: We attain the results for p = [i,-1,1,1] and q = [i,-i,i-i], and thus one gets

Ξ(ξ)=-sin⁡(ξ)cos⁡(ξ). (3.15)

Case 1:

α=α,β=iα2δ4+(-8A12λ-α2+2γ)δ2-8A12λ-2γδ2δ2-1,μ=λA1δδ2-1,δ=δ,γ=γ,A0=0,A1=A1,B1=-A1.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U4(ξ)=(2[cos⁡(ξ)]2-1)A1sin⁡(ξ)cos⁡(ξ),V4(ξ)=2iλA12(-2[cos⁡{ξ}]2-4ξcos⁡[ξ]sin⁡[ξ]+1)μ(δ2-1)sin⁡(ξ)cos⁡(ξ). (3.16)

Hence, the following exact solution has been reached for Eq.(1.1):

q4(x,y,t)=(2cos⁡(ξ)2-1A1sin⁡(ξ)cos⁡(ξ) )ei(αx+βy+γt),ϕ4(x,y,t)=(2iλA12-2cos⁡(ξ)2-4ξcos⁡(ξ)sin⁡(ξ)+1μδ2-1sin⁡(ξ)cos⁡(ξ))ei(αx+βy+γt). (3.17)

Case 2:

α=α,β=iα2δ4+(4B12λ-α2+2γ)δ2+4B12λ-2γδ2δ2-1,μ=λB1δδ2-1,δ=δ,γ=γ,A0=0,A1=B1,B1=B1.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U5(ξ)=-B1sin⁡(ξ)cos⁡(ξ),V5(ξ)=2iλB12(-2[cos⁡(ξ)]2+1)μ(δ2-1)sin⁡(ξ)cos⁡(ξ). (3.18)

Hence, the following exact solution has been reached for Eq.(1.1):

q5(x,y,t)=(-B1sin⁡(ξ)cos⁡(ξ) )ei(αx+βy+γt),ϕ5(x,y,t)=(2iλB12-2cos⁡(ξ)2+1μδ2-1sin⁡(ξ)cos⁡(ξ))ei(αx+βy+γt). (3.19)

Figure 2 shows the dynamic behavior of modulus of solutions q5x,y,t (left) and ϕ5x,y,t for B1=1,δ=8.5, γ=2.01,α=4.25,λ=0.92, and t = 1.

Case 3:

α=α,β=iα2δ4+(-2B12λ-α2+2γ)δ2-2B12λ-2γδ2-1δ2,μ=λB1δδ2-1,δ=δ,γ=γ,A0=0,A1=0,B1=B1.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U6(ξ)=-B1cos⁡(ξ)sin⁡(ξ),V6(ξ)=2iλB12(-cot⁡(ξ)-ξ)μ(δ2-1). (3.20)

Hence, the following exact solution has been reached for equation (1.1):

q6(x,y,t)=(-B1cos⁡(ξ)sin⁡(ξ) )ei(αx+βy+γt),ϕ6(x,y,t)=(2iλB12[-cot⁡(ξ)-ξ]μ[δ2-1])ei(αx+βy+γt). (3.21)

Family 3: We attain p = [1,1,-1,1 ] and q = [2,0,2,0 ], which gives

Ξ(ξ)=e2ξ+1e2ξ-1. (3.22)

Case 1:

α=α,β=iα2δ4+(8A12λ-α2+2γ)δ2+8A12λ-2γδ2-1δ2,μ=λA1δδ2-1,δ=δ,γ=γ,A0=0,A1=A1,B1=A1.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U7(ξ)=2A1(e4ξ+1)e4ξ-1,V7(ξ)=2iλ(-4+4ξ[e4ξ-1])A12μ(δ2-1)(e4ξ-1). (3.23)

Hence, the following exact solution has been reached for Eq.(1.1):

q7(x,y,t)=(2A1[e4ξ+1]e4ξ-1)ei(αx+βy+γt),ϕ7(x,y,t)=(2iλ[-4+4ξe4ξ-1]A12μ[δ2-1][e4ξ-1])ei(αx+βy+γt). (3.24)

Case 2:

α=α,β=iα2δ4+(-4A12λ-α2+2γ)δ2-4A12λ-2γδ2-1δ2,μ=λA1δ2-1δ,δ=δ,γ=γ,A0=0,A1=A1,B1=-A1.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U8(ξ)=4e2ξA1e4ξ-1,V8(ξ)=-8iλA12μ(δ2-1)(e4ξ-1). (3.25)

Hence, the following exact solution has been reached for Eq.(1.1):

q8(x,y,t)=(4e2ξA1e4ξ-1)ei(αx+βy+γt),ϕ8(x,y,t)=(-8iλA12μ[δ2-1][e4ξ-1])ei(αx+βy+γt). (3.26)

Figure 3 shows the dynamic behavior of modulus of solutions q8x,y,t (left) and ϕ8x,y,t for A1=1,δ=1.01,γ=2.3,α=0.2,λ=0.5, and t = 1.

Family 4: We attain the results for p = [-1,3,1,-1 ] and q = [2,0,2,0 ]. So, it reads

Ξ(ξ)=-e2ξ+3e2ξ-1. (3.27)

Case 1:

α=α,β=iα2δ4+(2A12λ-α2+2γ)δ2+2A12λ-2γδ2-1δ2,μ=λA1δ2-1δ,δ=δ,γ=γ,A0=2A1,A1=A1,B1=0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U9(ξ)=A1(e2ξ+1)e2ξ-1,V9(ξ)=2iλ(-4+2ξ[e2ξ-1])A12μ(δ2-1)(2e2ξ-2). (3.28)

Hence, the following exact solution has been reached for equation (1.1):

q9(x,y,t)=(A1[e2ξ+1]e2ξ-1 )ei(αx+βy+γt),ϕ9(x,y,t)=(2iλ[-4+2ξ{e2ξ-1}]A12μ[δ2-1][2e2ξ-2])ei(αx+βy+γt). (3.29)

Case 2:

α=α,β=i22α2δ4+(A02λ-2α2+4γ)δ2+A02λ-4γ2δ2-1δ2,μ=A0λ2δδ2-1,δ=δ,γ=γ,A0=A0,A1=0,B1=3/2A0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U10(ξ)=-A0(e2ξ+3)2e2ξ-6,V10(ξ)=2iλA02(-12+2ξ[e2ξ-3])μ(δ2-1)(8e2ξ-24). (3.30)

Hence, the following exact solution has been reached for equation (1.1):

q10(x,y,t)=(-A0[e2ξ+3]2e2ξ-6)ei(αx+βy+γt),ϕ10(x,y,t)=(2iλA02[-12+2ξ{e2ξ-3}]μ[δ2-1][8e2ξ-24])ei(αx+βy+γt). (3.31)

Family 5: We attain the results for p = [-1,1,1,1 ] and q = [1,-1,1-1 ], which gives

Ξ(ξ)=-sinh⁡(ξ)cosh⁡(ξ). (3.32)

Case 1:

α=α,β=iα2δ4+(-4A12λ-α2+2γ)δ2-4A12λ-2γδ2-1δ2,μ=λA1δ2-1δ,δ=δ,γ=γ,A0=0,A1=A1,B1=-A1.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U11(ξ)=A1cosh⁡(ξ)sinh⁡(ξ),V11(ξ)=2iλA12(-2[cosh⁡(ξ)]2+1)μ(δ2-1)cosh⁡(ξ)sinh⁡(ξ). (3.33)

Hence, the following exact solution has been reached for Eq.(1.1):

q11(x,y,t)=(A1cosh⁡(ξ)sinh⁡(ξ))ei(αx+βy+γt),ϕ11(x,y,t)=(2iλA12[-2cosh⁡(ξ)2+1]μ[δ2-1]cosh⁡(ξ)sinh⁡(ξ))ei(αx+βy+γt). (3.34)

Figure 4 shows the dynamic behavior of modulus of solutions q11x,y,t (left) and ϕ11x,y,t for A1=1,δ=1.01,γ=2.3,α=0.2,λ=0.5, and t = 1.

Family 6: We attain the results for p = [-1-i,1-1,-1,1 ] and q = [i,-i,i-1 Α, and one obtains

Ξ(ξ)=cos⁡(ξ)+sin⁡(ξ)sin⁡(ξ). (3.35)

Case 1:

α=α,β=iα2δ4+(-2A02λ-α2+2γ)δ2-2A02λ-2γδ2-1δ2,μ=A0λδ2-1δ,δ=δ,γ=γ,A0=A0,A1=0,B1=-2A0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U12(ξ)=A0(-sin⁡(ξ)+cos⁡(ξ))cos⁡(ξ)+sin⁡(ξ),V12(ξ)=-2iλA02(ξtan⁡(ξ)+ξ+2)μ(δ2-1)(tan⁡(ξ)+1). (3.36)

Hence, the following exact solution has been reached for Eq.(1.1):

q12(x,y,t)=(A0[-sin⁡(ξ)+cos⁡(ξ)]cos⁡(ξ)+sin⁡(ξ))ei(αx+βy+γt),ϕ12(x,y,t)=(-2iλA02[ξtan⁡(ξ)+ξ+2]μ[δ2-1][tan⁡(ξ)+1])ei(αx+βy+γt). (3.37)

Family 7: We obtain p = [-2-i,2-i,-1,1 ] and q = [i,-i,i,-i ], and thus one attains

Ξ(ξ)=cos⁡(ξ)+2sin⁡(ξ)sin⁡(ξ). (3.38)

Case 1:

α=α,β=i/222α2δ4+(-A02λ-2α2+4γ)δ2-A02λ-4γδ2-1δ2,μ=1/2A0λδ2-1δ,δ=δ,γ=γ,A0=A0,A1=0,B1=-5/2A0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U13(ξ)=A0(-sin⁡(ξ)+2cos⁡(ξ))2cos⁡(ξ)+4sin⁡(ξ),V13(ξ)=-2iλA02(4ξtan⁡(ξ)+2ξ+5)μ(δ2-1)(8+16tan⁡(ξ)). (3.39)

Hence, the following exact solution has been reached for equation (1.1):

q13(x,y,t)=(A0[-sin⁡(ξ)+2cos⁡(ξ)]2cos⁡(ξ)+4sin⁡(ξ))ei(αx+βy+γt),ϕ13(x,y,t)=(-2iλA02[4ξtan⁡(ξ)+2ξ+5]μ[δ2-1][8+16tan⁡(ξ)])ei(αx+βy+γt). (3.40)

Family 8: We attain the results for p= [1-i,-1-i,-1,1 ] and q= [i,-i,i,-i ], and thus we obtain

Ξ(ξ)=-sin⁡(ξ)+cos⁡(ξ)sin⁡(ξ). (3.41)

Case 1:

α=α,β=iα2δ4+(-2A02λ-α2+2γ)δ2-2A02λ-2γδ2-1δ2,μ=A0λδ2-1δ,δ=δ,γ=γ,A0=A0,A1=0,B1=2A0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U14(ξ)=2A0sin⁡(ξ)cos⁡(ξ)+A02(cos⁡(ξ))2-1,V14(ξ)=-2iλA02(ξtan⁡(ξ)-ξ+2)μ(δ2-1)(tan⁡(ξ)-1). (3.42)

Hence, the following exact solution has been reached for Eq.(1.1):

q14(x,y,t)=(2A0sin⁡(ξ)cos⁡(ξ)+A02[cos⁡(ξ)]2-1)ei(αx+βy+γt),ϕ14(x,y,t)=(-2iλA02[ξtan⁡(ξ)-ξ+2]μ[δ2-1][tan⁡(ξ)-1])ei(αx+βy+γt). (3.43)

Family 9: We attain the results for p= [ -3,-1,1,1 ] and q= [ 1,-1,1,-1 ], and thus we have

Ξ(ξ)=-sinh⁡(ξ)-2cosh⁡(ξ)cosh⁡(ξ). (3.44)

Case 1:

α=α,β=i22α2δ4+(A02λ-2α2+4γ)δ2+A02λ-4γ2δ2-1δ2,μ=A0λ2δ2-1δ,δ=δ,γ=γ,A0=A0,A1=0,B1=3/2A0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U15(ξ)=A0(2sinh⁡(ξ)+cosh⁡(ξ))4cosh⁡(ξ)+2sinh⁡(ξ),V15(ξ)=2iλ(4cosh⁡(ξ)ln⁡(cosh⁡(ξ)-1+sinh⁡(ξ))+2sinh⁡(ξ)ln⁡(cosh⁡(ξ)-1+sinh⁡(ξ)))A02μ(δ2-1)(16cosh⁡(ξ)+8sinh⁡(ξ))+2iλ(-4cosh⁡(ξ)ln⁡(cosh⁡(ξ)-1-sinh⁡(ξ))-2sinh⁡(ξ)ln⁡(cosh⁡(ξ)-1-sinh⁡(ξ))-3sinh⁡(ξ))A02μ(δ2-1)(16cosh⁡(ξ)+8sinh⁡(ξ)). (3.45)

Hence, the following exact solution has been reached for Eq. (1.1):

q15(x,y,t)=(A0[2sinh⁡(ξ)+cosh⁡(ξ)]4cosh⁡(ξ)+2sinh⁡(ξ))ei(αx+βy+γt),ϕ15(x,y,t)=V15(ξ)ei(αx+βy+γt). (3.46)

Family 10: We attain the results for p= [ -2-i,-2+i,1,1 ] and q= [ i,-i,i,-i ], and thus one has

Ξ(ξ)=sin⁡(ξ)-2cos⁡(ξ)cos⁡(ξ). (3.47)

Case 1:

α=α,β=i22α2δ4+(-A02λ-2α2+4γ)δ2-A02λ-4γ2δ2-1δ2,μ=A0λ2δ2-1δ,δ=δ,γ=γ,A0=A0,A1=0,B1=5/2A0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U16(ξ)=A0(cos⁡(ξ)+2sin⁡(ξ))2sin⁡(ξ)-4cos⁡(ξ),V16(ξ)=-2iλA02(ξtan⁡(ξ)-2ξ+5)μ(δ2-1)(4tan⁡(ξ)-8). (3.48)

Hence, the following exact solution has been reached for Eq.(1.1):

q16(x,y,t)=(A0[cos⁡(ξ)+2sin⁡(ξ)]2sin⁡(ξ)-4cos⁡(ξ))ei(αx+βy+γt),\nbϕ16(x,y,t)=(-2iλA02[ξtan⁡(ξ)-2ξ+5]μ[δ2-1][4tan⁡(ξ)-8])ei(αx+βy+γt). (3.49)

Figure 5 shows the dynamic behavior of modulus of solutions q16x,y,t (left) and ϕ16x,y,t for A0=1,δ=1.1, γ = 0.8, α = 0.9, λ = 0.2 and t = 1.

Family 11: [F11] We attain the results for p= [ 1-i,1+i,1,1 ] and q= [ i,-i,i,-i ], and then one results

Ξ(ξ)=cos⁡(ξ)+sin⁡(ξ)cos⁡(ξ). (3.50)

Case 1:

α=α,β=iα2δ4+(-2A12λ-α2+2γ)δ2-2A12λ-2γδ2-1δ2,μ=λA1δ2-1δ,δ=δ,γ=γ,A0=-A1,A1=A1,B1=0,

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U17(ξ)=A1sin⁡(ξ)cos⁡(ξ),V17(ξ)=2iλA12(tan⁡(ξ)-ξ)μ(δ2-1). (3.51)

Hence, the following exact solution was reached for Eq. (1.1):

q17(x,y,t)=(A1sin⁡(ξ)cos⁡(ξ))ei(αx+βy+γt),ϕ17(x,y,t)=(2iλA12[tan⁡(ξ)-ξ]μ[δ2-1])ei(αx+βy+γt). (3.52)

Figure 6 shows the dynamic behavior of modulus of solutions q17x,y,t (left) and ϕ17x,y,t for A1=1,δ=1.5,γ=0.5, α = 0.1, λ = 0.2 and t = 1.

Family 12:

We attain the results for p= [ -3,-2,1,1 ] and q= [ 0,1,0,1 ], and we get

Ξ(ξ)=-3-2eξ1+eξ. (3.53)

Case 1:

α=α,β=i/525α2δ4+(2A02λ-25α2+50γ)δ2+2A02λ-50γδ2-1δ2,μ=2A0λ5δ2-1δ,δ=δ,γ=γ,A0=A0,A1=0,B1=12A05,

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U18(ξ)=-A02eξ-315+10eξ,V18(ξ)=2iλA02(2ξeξ+3ξ+12)μ(δ2-1)(75+50eξ). (3.54)

Hence, the following exact solution has been reached for equation (1.1):

q18(x,y,t)=(-A0[2eξ-3]15+10eξ)ei(αx+βy+γt),ϕ18(x,y,t)=(2iλA02[2ξeξ+3ξ+12]μ[δ2-1][75+50eξ])ei(αx+βy+γt). (3.55)

Figure 7 shows the dynamic behavior of modulus of solutions q18x,y,t (left) and ϕ18x,y,t for A0=1,δ=5, γ = 0.1, α = 1.5, λ = 0.3 and t = 1.

Family 13:

We attain the results for p= [ -1,-2,1,1 ] and q= [ 1,0,1,0 ], and one finds

Ξ(ξ)=-eξ-2eξ+1. (3.56)

Case 1:

α=α,β=i9α2δ4+(2A02λ-9α2+18γ)δ2+2A02λ-18γ3δ2-1δ2,μ=2A0λ3δ2-1δ,δ=δ,γ=γ,A0=A0,A1=0,B1=4/3A0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U19(ξ)=-A0(eξ-2)3eξ+6,V19(ξ)=2iλA02(ξeξ+2ξ+8)μ(δ2-1)(9eξ+18). (3.57)

Hence, the following exact solution has been reached for equation (1.1):

q19(x,y,t)=(-A0[eξ-2]3eξ+6)ei(αx+βy+γt),ϕ19(x,y,t)=(2iλA02[ξeξ+2ξ+8]μ[δ2-1][9eξ+18])ei(αx+βy+γt). (3.58)

Family 14: We attain the results for p= [ 2,1,1,1 ] and q= [ 1,0,1,0 ], and then we obtain

Ξ(ξ)=2eξ+1eξ+1. (3.59)

Case 1:

α=α,β=i9α2δ4+(2A02λ-9α2+18γ)δ2+2A02λ-18γ3δ2-1δ2,μ=2A0λ3δ2-1δ,δ=δ,γ=γ,A0=A0,A1=0,B1=-4/3A0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U20(ξ)=A0(2eξ-1)6eξ+3,V20(ξ)=2iλA02(2ξeξ+ξ+4)μ(δ2-1)(18eξ+9). (3.60)

Hence, the following exact solution has been reached for equation (1.1):

q20(x,y,t)=(A0[2eξ-1]6eξ+3)ei(αx+βy+γt),ϕ20(x,y,t)=(2iλA02[2ξeξ+ξ+4]μ[δ2-1][18eξ+9])ei(αx+βy+γt). (3.61)

Family 15: We attain the results for p= [ -1,0,1,1 ] and q= [ 0,0,1,0 ], and then we find

Ξ(ξ)=-11+eξ. (3.62)

Case 1:

α=iβ2δ6-β2δ4+(2A02λ+2γ)δ2+2A02λ-2γδ2-1δ,β=β,μ=2A0λδδ2-1,δ=δ,γ=γ,A0=A0,A1=2A0,B1=0.

We have replaced the above values with Eqs. (3.7) and (3.8) together with (3.5)

U21(ξ)=A0(eξ-1)1+eξ,V21(ξ)=2iλA02(ξeξ+ξ+4)μ(δ2-1)(1+eξ) (3.63)

Hence, the following exact solution has been reached for equation (1.1):

q21(x,y,t)=(A0[eξ-1]1+eξ)ei(αx+βy+γt),ϕ21(x,y,t)=(2iλA02[ξeξ+ξ+4]μ[δ2-1][1+eξ])ei(αx+βy+γt). (3.64)

Figure 8 shows the dynamic behavior of modulus of solutions q21x,y,t (left) and ϕ21x,y,t for A0=1,δ=2,γ=0.9,β=0.5,λ=0.7, and t = 1.

Remark 1 In each of the above cases, we take ξ=iμx+y-αδ2+βδ4t.