New exact soliton solutions, bifurcation and multistability behaviors of traveling waves for the (3+1)-dimensional modified Zakharov-Kuznetsov equation with higher order dispersion

Mathematical Sciences and Applications E-Notes Pub Date : 2021-10-27 DOI:10.22541/au.163533971.16788809/v1

A. Saha, S. B. G. Karakoç, K. Ali

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Abstract

The goal of the present paper is to obtain and analyze new exact travelling wave solutions and bifurcation behavior of modified Zakharov-Kuznetsov (mZK) equation with higher order dispersion term. For this purpose, first and second simple methods are used to build soliton solutions of travelling wave solutions. Furthermore, bifurcation behavior of traveling waves including new type of quasiperiodic and multi-periodic traveling wave motions have been examined depending on the physical parameters. Multistability for the nonlinear mZK equation has been investigated depending on fixed values of physical parameters with various initial conditions. The suggested methods for the analytical solutions are powerful and benefical tools to obtain the exact travelling wave solutions of nonlinear evolution equations (NLEEs). Two and three-dimensional plots are also provided to illustrate the new solutions. Bifurcation and multistability behaviors of traveling wave solution of the nonlinear mZK equation with higher order dispersion will add some value in the literature of mathematical and plasma physics.

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具有高阶色散的(3+1)维修正Zakharov-Kuznetsov方程的新的精确孤子解、分岔和行波的多稳定性行为

本文的目的是得到并分析具有高阶色散项的修正zakharov - kuznetsov (mZK)方程的新的精确行波解和分岔行为。为此，采用第一种和第二种简单的方法来建立行波解的孤子解。此外，研究了基于物理参数的新型准周期和多周期行波运动的行波分岔行为。研究了具有不同初始条件的非线性mZK方程在物理参数固定值下的多稳定性问题。本文提出的解析解方法是求解非线性演化方程行波精确解的有力工具。还提供了二维和三维图来说明新的解决方案。具有高阶色散的非线性mZK方程行波解的分岔和多稳定性行为在数学和等离子体物理文献中具有一定的价值。

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Mathematical Sciences and Applications E-Notes

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