Solitary Wave Solutions to the KPP Equation by the Homotopy Analysis Method

被引：0

作者：

Lu, Dian-chen ^{[1
]}

Jiang, Yue ^{[1
]}

Cheng, Yue-ling ^{[1
]}

机构：

[1] Jiangsu Univ, Fac Sci, Zhenjiang 212013, Jiangsu, Peoples R China

来源：

INTERNATIONAL CONFERENCE ON SIMULATION, MODELLING AND MATHEMATICAL STATISTICS (SMMS 2015) | 2015年

关键词：

Homotopy analysis method; KPP equation; Solitary wave solutions; KDV EQUATION; SOLVE;

D O I：

暂无

中图分类号：

TP301 [理论、方法];

学科分类号：

081202 ;

摘要：

An analytic technique, named the homotopy analysis method (HAM), is effectively presented for obtaining solitary wave solutions governed by the KPP (Kolmogorov-Petrovskii-Piskunov) equation. The method used here contains an auxiliary parameter h, which is used to adjust the convergence speed and convergence range of the series solution. According to the residual error analysis, we find that it nearly tends to zero. This result shows that the HAM is a valid and accurate method for solving the nonlinear equations.

引用

页码：433 / 438

页数：6

共 50 条

[31] The Homotopy Analysis Method to Solve the Modified Equal Width Wave Equation
Yusufoglu, Elcin
Selam, Cevad
NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS, 2010, 26 (06) : 1434 - 1442
[32] Soliton solutions for the Fitzhugh-Nagumo equation with the homotopy analysis method
Abbasbandy, S.
APPLIED MATHEMATICAL MODELLING, 2008, 32 (12) : 2706 - 2714
[33] Explicit analytic solutions of KDV equation given by the homotopy analysis method
Chen, Chen
Wang, Chun
Liao, Shijun
Advances in Engineering Mechanics - Reflections and Outlooks: IN HONOR OF THEODORE Y-T WU, 2005, : 70 - 83
[34] The Homotopy Perturbation Method to Solve a Wave Equation
Gouder, P. M.
Kolli, V. H.
Page, Md. Hanif
Chavaraddi, Krishna B.
Chandaragi, Praveen
COMMUNICATIONS IN MATHEMATICS AND APPLICATIONS, 2022, 13 (02): : 691 - 701
[35] Approximate analytic solutions of the modified Kawahara equation with homotopy analysis method
Muhammet Kurulay
Advances in Difference Equations, 2012
[36] Approximate analytic solutions of the modified Kawahara equation with homotopy analysis method
Kurulay, Muhammet
ADVANCES IN DIFFERENCE EQUATIONS, 2012,
[37] Solitary Wave Solutions of a Hyperelastic Dispersive Equation
Jiang, Yuheng
Tian, Yu
Qi, Yao
MATHEMATICS, 2024, 12 (04)
[38] Solitary Wave Solutions of the coupled Kawahara Equation
Bharatha, K.
Rangarajan, R.
Neethu, C. J.
BULLETIN OF THE KARAGANDA UNIVERSITY-MATHEMATICS SERIES, 2025, 117 (01): : 63 - 70
[39] Solitary Wave Solutions to a Generalization of the mKdV Equation
Omel'yanov, G.
Rodriguez, J. Noyola
RUSSIAN JOURNAL OF MATHEMATICAL PHYSICS, 2023, 30 (02) : 246 - 256
[40] Solitary wave solutions of coupled boussinesq equation
Abazari, Reza
Jamshidzadeh, Shabnam
Biswas, Anjan
COMPLEXITY, 2016, 21 (S2) : 151 - 155

← 1 2 3 4 5 →