搜索结果: 1-5 共查到“理论物理学 KP equation”相关记录5条 . 查询时间(0.056 秒)
Generalized Wronskian Solutions to Differential-Difference KP Equation
Wronskian technique DΔKP equation rational solutions Matveev solutions
2007/8/15
2007Vol.47No.5pp.769-772DOI:
Generalized Wronskian Solutions to Differential-Difference KP Equation
JI Jie,1 YAO Yu-Qin,1 LIU Yu-Qing,1,2 and CHEN Deng-Yuan1
1 Departmen...
New Multiple Soliton-like and Periodic Solutions for (2+1)-Dimensional Canonical Generalized KP Equation with Variable Coefficients
(2+1)-dimensional canonical generalized (CGKP) equation with variable coefficients
tanh function method Riccati equation soliton-like and periodic solutions
2007/8/15
2006Vol.46No.5pp.793-798DOI:
New Multiple Soliton-like and Periodic Solutions for (2+1)-Dimensional Canonical Generalized KP Equation with Variable Coefficients
ZHANG Li-Hua,1 LIU...
New Modified Jacobi Elliptic Function Expansion Method and Its Application to (3+1)-Dimensional KP
Equation
modified Jacobi elliptic function expansion method KP equation periodic solutions solitary wave solutions
2007/8/15
2006Vol.45No.6pp.1063-1068DOI:
New Modified Jacobi Elliptic Function Expansion Method and Its Application to (3+1)-Dimensional KP
Equation
DOU Fu-Quan, SUN Jian-An, DUAN Wen-Shan,...
An Invariance for (2+1)-Extension of Burgers Equation and Formulae to Obtain Solutions of KP Equation
invariance (2+1)-extension of Burgers equation
formulae for obtaining solutions of KP equation
2007/8/15
2005Vol.43No.4pp.591-596DOI:
An Invariance for (2+1)-Extension of Burgers Equation and Formulae to Obtain Solutions of KP Equation
TIAN Yong-Bo,1 TIAN Chou,1 and SHAO Nan2
...
Exact Periodic-Wave Solutions for (2+1)-Dimensional Boussinesq
Equation and (3+1)-Dimensional KP Equation
Jacobi elliptic-function method (2+1)-dimensional Boussinesq equation
(3+1)-dimensional KP equation periodic-wave solutions
2007/8/15
2004Vol.42No.2pp.239-241DOI:
Exact Periodic-Wave Solutions for (2+1)-Dimensional Boussinesq
Equation and (3+1)-Dimensional KP Equation
ZHAO Qiang, LIU Shi-Kuo, and FU Zun-Tao
...