The quasi-wavelet solutions of MKdV equations

被引：18

作者：

Tang, JS ^{[1
]}

Lu, ZY

Li, XP

机构：

[1] Hunan Univ, Dept Engn Mech, Changsha 410082, Peoples R China

[2] Zhongshan Univ, Inst Civil & Architectural Engn, Changsha 410075, Peoples R China

来源：

ACTA PHYSICA SINICA | 2003年 / 52卷 / 03期

关键词：

MKdV equation; quasi-wavelet method; soliton solution;

D O I：

10.7498/aps.52.522

中图分类号：

O4 [物理学];

学科分类号：

0702 ;

摘要：

The quasi-wavelet method is used for obtaining the numerical solution of the MKdV equation. The quasi-wavelet discrete scheme is adopted to make the spatial derivatives discrete, while the fourth-order Runge-Kutta method is adopted to make the temporal derivative discrete. One of the MKdV equation u(t) + 6 u(2)u(x) + u(xxx) = 0, which has an analytical solution, is solved numerically. The numerical results are well consistent with the analytical solutions, even at t = 10000s.

引用

页码：522 / 525

页数：4

共 7 条

[1] Simulation of the MKDV equation with lattice Boltzmann method
Li, HB
Huang, PH
Liu, MR
Kong, LJ
[J]. ACTA PHYSICA SINICA, 2001, 50 (05) : 837 - 840
[2] New periodic solutions to a kind of nonlinear wave equations
Liu, SK
Fu, ZT
Liu, SD
Zhao, Q
[J]. ACTA PHYSICA SINICA, 2002, 51 (01) : 10 - 14
[3] On the use of wavelets in computational combustion
Prosser, R
Cant, RS
[J]. JOURNAL OF COMPUTATIONAL PHYSICS, 1998, 147 (02) : 337 - 361
[4] Wan DC, 2000, APPL MATH MECH-ENGL, V21, P1099
[5] Discrete singular convolution for the solution of the Fokker-Planck equation
Wei, GW
[J]. JOURNAL OF CHEMICAL PHYSICS, 1999, 110 (18): : 8930 - 8942
[6] Zhang G X, 2000, SCI CHINA SER A, V12, P1103
[7] The theory of the perturbation equation of MKdV
Zhao, YM
Yan, JR
[J]. ACTA PHYSICA SINICA, 1999, 48 (11) : 1976 - 1982

← 1 →