数学
一阶偏微分方程
Riccati方程
偏微分方程
数学分析
精确微分方程
相图
同宿轨道
泛微分方程
微分方程
常微分方程
积分微分方程
非线性系统
物理
分叉
量子力学
作者
Yue Kai,Shuangqing Chen,Kai Zhang,Zhixiang Yin
标识
DOI:10.1080/17455030.2022.2044541
摘要
This paper considers a fourth-order time-fractional partial differential equation with Riemann–Liouville definition. We first use the general method of separation of variables to transform the original equation into an ordinary differential equation and subsequently apply the trial equation method to obtain its integral form. The complete discrimination system for polynomial method(CDSPM) is also adopted herein. By applying this method, dynamic properties such as phase portraits are determined. The results suggest that the soliton solution coexists with the periodic solution as long as the homoclinic orbits exist. Moreover, to directly show our conclusions, the corresponding exact solutions to this equation are presented using this method.
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