Homotopy Analysis Method to Mkdv Equation

被引：0

作者：

Chen, Xiurong ^{[1
]}

Yu, Jiaju ^{[1
]}

机构：

[1] Qingdao AgricuUniv, Sch Sci & Informat, Qingdao 266109, Peoples R China

来源：

2010 INTERNATIONAL CONFERENCE ON INFORMATION, ELECTRONIC AND COMPUTER SCIENCE, VOLS 1-3 | 2010年

关键词：

Mkdv Equation; Homotopy Analysis Method; Nonlinear;

D O I：

暂无

中图分类号：

TP [自动化技术、计算机技术];

学科分类号：

0812 ;

摘要：

Mkdv Equation was solved by using the Homotopy analysis method (HAM) in the paper, and the numerical solution of the equation for the initial conditions was obtained. The obtained solution, was compared with the exact solution, proved that the analytically approximate solution obtained by this method is a high accuracy. Therefore, the HAM is feasible and valid for the ecological model studies.

引用

页码：1646 / 1648

页数：3

共 10 条

[1]

FU HAIMING, 2009, J NINGXIA TEACHERS U, V30, P1

[2] Simulation of the MKDV equation with lattice Boltzmann method [J].

Li, HB ;

Huang, PH ;

Liu, MR ;

Kong, LJ .

ACTA PHYSICA SINICA, 2001, 50 (05) :837-840

[3]

LI XY, 2004, J HENAN U SCI TECHNO, V25, P86

[4]

Liao S. J., 1998, APPL MATH MECH, V19, P885

[5]

LIAO SJ, 1997, SHANGHAI J MECH, V18, P196

[6]

LIAO SJ, 2006, PERTURBATION INTRO H

[7]

MA CF, 2007, J APPL MECH, V24, P519

[8]

SHA L, 2006, TRANSATIONS SHENYANG, V25, P89

[9] The quasi-wavelet solutions of MKdV equations [J].

Tang, JS ;

Lu, ZY ;

Li, XP .

ACTA PHYSICA SINICA, 2003, 52 (03) :522-525

[10]

ZHANG EM, 2007, NATURAL SCI J HARBIN, V23, P26

← 1 →