Bright Soliton Solution of ( 1 + 1 )-Dimensional Quantum System with Power-Law Dependent Nonlinearity

We study the nonlinear dynamics of (1+1)-dimensional quantum system in power-law dependent media based on the nonlinear Schrödinger equation (NLSE) incorporating power-law dependent nonlinearity, linear attenuation, self-steepening terms, and third-order dispersion term. The analytical bright soliton solution of this NLSE is derived via the F-expansion method. The key feature of the bright soliton solution is pictorially demonstrated, which together with typical analytical formulation of the soliton solution shows the applicability of our theoretical treatment.


Introduction
In the fascinating study of physical reality, nonlinear phenomena have attracted significant attention.Besides experimental observation of nonlinear behaviors, for the theoretical investigation of nonlinearity, the nonlinear Schrödinger equation (NLSE) has proved to be a reliable model under certain experimental settings because it is closely related to many nonlinear problems and people have conducted extensive research on finding solutions [1][2][3][4][5][6][7][8][9][10][11][12][13][14][15] of particular nonlinear features.For a practical theoretical treatment, the one-dimensional scenario of the NLSE model is typical not only because of the integrability of the system under many parametric settings, but also because that actual experimental observation identifies stable soliton behavior under such a scenario.Therefore, the (1+1)-dimensional case of the NLSE is the focus of many theoretical works, including this study.
For the analytical study of various categories of the (1+1)dimensional NLSE, many approaches have been proposed, such as the Bäcklund transformation method [16], homotopy analysis method [17], variational iteration method, and Expfunction method [2].For a typical analytical solution investigation of the NLSE in this study, we utilize the -expansion method, which features the Jacobian elliptic function expansion to solve NLSE for typical traveling wave solutions.It is a very effective method to solve partial differential equations such as NLSE.Basically, it is implemented by expressing the solutions of the equations in the form of power expansion of Jacobian function [18,19].Moreover, for the nonlinear study of the NLSE, the soliton-type solution is usually the ultimate goal of the analytical solution search.This usually comes from the desirable features of soliton.Because it is wave solution of a nonlinear wave equation, it can propagate for a long distance without deformation, and its amplitude, shape, and speed remain unchanged when it meets other similar solitary waves.In this paper, we study the soliton behavior of the NLSE by modeling the nonlinear dynamics in power-law dependent media such as an optical fiber system, where the group velocity dispersion term and nonlinear term are present and adjustable.The linear attenuation term, selfsteepening term, and third-order dispersion term also exist [20].We identify that, under an appropriate experimental setting, the bright soliton solutions can be derived via the expansion method, and the typical bright soliton feature is pictorially demonstrated.This paper is organized as follows.The next section gives the NLSE model formulation of this study, Section 3 describes 2 Advances in Mathematical Physics the procedural detail of the -expansion method, Section 4 gives the concrete calculation steps of solving the NLSE for its solition solution, and the last section gives the conclusive remarks.

Model and Method
. .NLSE Model in Power-Law Dependent Media.For studying the soliton dynamics in a (1+1)-dimensional power-law dependent media [2,10,15,20], the NLSE in dimensionless format is The independent variables in  include the space  and time  coordinates,   describes the evolution of wave function, ()  is the term of group velocity dispersion, ()|| 2  is the nonlinear term, () and () are the real valued functions of time , () is the time-dependent coefficient of linear attenuation term, () is the time-dependent coefficient of self-steepening term, and () is the time-dependent coefficient of the third-order dispersion term.Here, we consider the case where the coefficient parametric functions of various terms in (1) do not vary with time within a certain period but can be freely adjusted according to the experimental setting.
. .e -Expansion Method.The -expansion method is used to solve general partial differential equations of the following form: where (, ) is the unknown function to be solved and  is the polynomial of (, ) and its partial derivatives of various orders.The F-expansion method is implemented through the use of the polynomial of base function () to express (, ), where () is defined as where Here , ,  0 ,  1 ,  2 ,  3 are parametric constants to be determined in the problem-solving steps.(, ) is expressed through () and it takes the following form: where the highest order number  is determined by balancing the highest order of nonlinearity and highest order of derivatives.By inserting (5) into (2) and using the definition of (), we obtain a polynomial of ().After setting the coefficients of various terms of the polynomial, we obtain a set of ordinary differential equations (ODEs) of time .Solving the ODEs consistently, we obtain the analytical expressions of the parametric constants in (3) and ℎ  () in (5), and ( 2) is solved accordingly.
We can see that the solution (32) obtained by our method is of bright soliton type.The pictorial demonstration of the soliton forms for different power index values  is shown in Figure 1.We see that the NLSE modeling (1+1)dimensional system in power-law dependent media supports bright soliton solution.

Conclusion
This study investigatied the nonlinear dynamics for the (1+1)dimensional quantum system in the power-law dependent media with the corresponding NLSE model.Using the expansion method, we derived typical bright soliton solutions under appropriate parameter settings, with key features pictorially demonstrated.Our theoretical treatment showed that a (1+1)-dimensional quantum system with power-law dependent nonlinearity supports bright soliton behavior.The analytical results obtained can be used to guide relevant experimental observation of the soliton dynamics in the (1+1)-dimensional system with power-law dependent nonlinearity.