New exact solutions for a generalized KdV equation with variable coefficients

【Author】

Caier Ye School of Science University of Shanghai for Science and Technology Shanghai 200093,China Weiguo Zhang School of Science University of Shanghai for Science and Technology Shanghai 200093,China

【Abstract】

In the present paper,we construct the new exact solutions for the generalized KdV equation with variable coefficients by the simple direct reduction method.The study confirms the power of the method with the help of symbolic computation.

【Keywords】

generalized KdV equation with variable coefficients;simple direct reduction method;exact solution;soliton solution

References

To explore the background and basis of the node document

Springer Journals Database

Total: 23 articles

  • [1] Liu Cheng-Shi(Department of Mathematics, Daqing Petroleum Institute, Daqing 163318,China), Using trial equation method to solve the exact solutions for two kinds of KdV equations with variable coefficients, Acta Physica Sinica,
  • [2] Xian Da-Quan;;Dai Zheng-De, Application of Exp-function method to potential Kadomtsev–Petviashvili equation, Chaos, Solitons and Fractals,
  • [3] E.J. Parkes;;B.R. Duffy, An automated tanh-function method for finding solitary wave solutions to non-linear evolution equations, Computer Physics Communications,
  • [4] Peng Li;;Zuliang Pan, A new development on Jacobian elliptic function expansion method, Physics Letters A,

More>>

Similar documents

Documents that have the similar content to the node document

Springer Journals Database

Total: 78 articles

More>>