A note on the (\(G^{\prime }/G\))-expansion method again
From MaRDI portal
Publication:711347
DOI10.1016/j.amc.2010.05.097zbMath1200.65056OpenAlexW2091287271MaRDI QIDQ711347
Publication date: 25 October 2010
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: http://hdl.handle.net/11147/2661
exact solutionnonlinear ordinary differential equationnonlinear evolution equationsimplest equation method(\(G^{\prime }/G\))-expansion method
Related Items
Comment on ``Application of (\(G'/G\))-expansion method to travelling-wave solutions of three nonlinear evolution equation ⋮ Exact solutions for a coupled discrete nonlinear Schrödinger system with a saturation nonlinearity ⋮ Some exact solutions for Toda type lattice differential equations using the improved (G′/G)-expansion method ⋮ Comment on: ``The (G\(^{\prime}\)/G)-expansion method for the nonlinear lattice equations ⋮ The two-variable \((G'/G, 1/G)\)-expansion method for solving the nonlinear KdV-mKdV equation ⋮ The extended multiple \(\left(G'/ G\right)\)-expansion method and its application to the Caudrey-Dodd-Gibbon equation ⋮ The \((G'/ G, 1 / G)\)-expansion method and its applications to find the exact solutions of nonlinear PDEs for nanobiosciences ⋮ The \((G' / G, 1 / G)\)-expansion method and its applications for solving two higher order nonlinear evolution equations ⋮ Quasi-exact solutions of the dissipative Kuramoto-Sivashinsky equation ⋮ Traveling wave solutions of the nonlinear \((3 + 1)\)-dimensional Kadomtsev-Petviashvili equation using the two variables \((G/G, 1/G)\)-expansion method ⋮ Different methods for \((3+1)\)-dimensional space-time fractional modified KdV-Zakharov-Kuznetsov equation ⋮ The method and topological soliton solution of the \(K(m, n)\) equation ⋮ Traveling Wave Solutions for Nonlinear Differential-Difference Equations of Rational Types ⋮ Symbolic computation of exact solutions for fractional differential-difference equation models ⋮ An analytic approach to a class of fractional differential‐difference equations of rational type via symbolic computation
Cites Work
