数学
可逆矩阵
Korteweg–de Vries方程
分数阶微积分
拉普拉斯变换
非线性系统
伯格斯方程
系列(地层学)
数学分析
核(代数)
应用数学
偏微分方程
纯数学
古生物学
物理
生物
量子力学
作者
Asif Khan,Tayyaba Akram,Arshad Khan,Shabir Ahmad,Kamsing Nonlaopon
出处
期刊:AIMS mathematics
[American Institute of Mathematical Sciences]
日期:2022-10-19
卷期号:8 (1): 1251-1268
被引量:18
摘要
<abstract><p>In this manuscript, the Korteweg-de Vries-Burgers (KdV-Burgers) partial differential equation (PDE) is investigated under nonlocal operators with the Mittag-Leffler kernel and the exponential decay kernel. For both fractional operators, the existence of the solution of the KdV-Burgers PDE is demonstrated through fixed point theorems of $ \alpha $-type $ \digamma $ contraction. The modified double Laplace transform is utilized to compute a series solution that leads to the exact values when fractional order equals unity. The effectiveness and reliability of the suggested approach are verified and confirmed by comparing the series outcomes to the exact values. Moreover, the series solution is demonstrated through graphs for a few fractional orders. Lastly, a comparison between the results of the two fractional operators is studied through numerical data and diagrams. The results show how consistently accurate the method is and how broadly applicable it is to fractional nonlinear evolution equations.</p></abstract>
科研通智能强力驱动
Strongly Powered by AbleSci AI