Exact Traveling Wave Solutions of Certain Nonlinear Partial Differential Equations Using the G′/G2-Expansion Method
Published 2018 View Full Article
- Home
- Publications
- Publication Search
- Publication Details
Title
Exact Traveling Wave Solutions of Certain Nonlinear Partial Differential Equations Using the G′/G2-Expansion Method
Authors
Keywords
-
Journal
Advances in Mathematical Physics
Volume 2018, Issue -, Pages 1-15
Publisher
Hindawi Limited
Online
2018-06-04
DOI
10.1155/2018/7628651
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- The G′G,1G-expansion method and its applications for constructing many new exact solutions of the higher-order nonlinear Schrödinger equation and the quantum Zakharov–Kuznetsov equation
- (2018) Elsayed M. E. Zayed et al. OPTICAL AND QUANTUM ELECTRONICS
- A combined method for solving 2D incompressible flow and heat transfer by spectral collocation method and artificial compressibility method
- (2017) Jing-Kui Zhang et al. INTERNATIONAL JOURNAL OF HEAT AND MASS TRANSFER
- Solving second order non-linear elliptic partial differential equations using generalized finite difference method
- (2017) L. Gavete et al. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS
- Two Reliable Methods for Solving the (3 + 1)-Dimensional Space-Time Fractional Jimbo-Miwa Equation
- (2017) Sekson Sirisubtawee et al. MATHEMATICAL PROBLEMS IN ENGINEERING
- A comparison of numerical simulations of breaking wave forces on a monopile structure using two different numerical models based on finite difference and finite volume methods
- (2017) Jithin Jose et al. OCEAN ENGINEERING
- Applications of extended simple equation method on unstable nonlinear Schrödinger equations
- (2017) Dianchen Lu et al. OPTIK
- Jacobi elliptic solutions, soliton solutions and other solutions to four higher-order nonlinear Schrodinger equations using two mathematical methods
- (2017) Elsayed M.E. Zayed et al. OPTIK
- Analysis of transient wave scattering and its applications to site response analysis using the scaled boundary finite-element method
- (2017) Mohammad Hossein Bazyar et al. SOIL DYNAMICS AND EARTHQUAKE ENGINEERING
- Efficient diffusion coefficient for image denoising
- (2016) Hossein Khodabakhshi Rafsanjani et al. COMPUTERS & MATHEMATICS WITH APPLICATIONS
- The G′G,1G-expansion method and its applications to two nonlinear Schrödinger equations describing the propagation of femtosecond pulses in nonlinear optical fibers
- (2016) E.M.E. Zayed et al. OPTIK
- The variational iteration method is a special case of the homotopy analysis method
- (2015) Robert A. Van Gorder APPLIED MATHEMATICS LETTERS
- Exact solutions to the Benney–Luke equation and the Phi-4 equations by using modified simple equation method
- (2015) Jesmin Akter et al. Results in Physics
- Soliton wave solutions for the nonlinear transmission line using the Kudryashov method and the -expansion method
- (2014) Malwe Boudoue Hubert et al. APPLIED MATHEMATICS AND COMPUTATION
- A novel (G′/G)-expansion method and its application to the Boussinesq equation
- (2014) Md. Nur Alam et al. Chinese Physics B
- The (G′/G,1/G)-Expansion Method and Its Applications to Find the Exact Solutions of Nonlinear PDEs for Nanobiosciences
- (2014) E. M. E. Zayed et al. MATHEMATICAL PROBLEMS IN ENGINEERING
- An approximate-analytical solution for the Hamilton–Jacobi–Bellman equation via homotopy perturbation method
- (2012) H. Saberi Nik et al. APPLIED MATHEMATICAL MODELLING
- On the application of the Exp-function method to the KP equation for N-soliton solutions
- (2012) İsmail Aslan APPLIED MATHEMATICS AND COMPUTATION
- Homotopy perturbation method in quantum mechanical problems
- (2012) P.K. Bera et al. APPLIED MATHEMATICS AND COMPUTATION
- The Two-Variable -Expansion Method for Solving the Nonlinear KdV-mKdV Equation
- (2012) E. M. E. Zayed et al. MATHEMATICAL PROBLEMS IN ENGINEERING
- Application of the Kudryashov method for finding exact solutions of the high order nonlinear evolution equations
- (2011) Pavel N. Ryabov et al. APPLIED MATHEMATICS AND COMPUTATION
- Symbolic computation of some new nonlinear partial differential equations of nanobiosciences using modified extended tanh-function method
- (2011) Dalibor L. Sekulić et al. APPLIED MATHEMATICS AND COMPUTATION
- The correct traveling wave solutions for the high-order dispersive nonlinear Schrödinger equation
- (2010) Yeqiong Shi et al. APPLIED MATHEMATICS AND COMPUTATION
- Solitonic Ionic Currents Along Microtubules
- (2010) M. V. Satarić et al. Journal of Computational and Theoretical Nanoscience
- Applications of an Extended -Expansion Method to Find Exact Solutions of Nonlinear PDEs in Mathematical Physics
- (2010) E. M. E. Zayed et al. MATHEMATICAL PROBLEMS IN ENGINEERING
- Some applications of the -expansion method to non-linear partial differential equations
- (2009) E.M.E. Zayed et al. APPLIED MATHEMATICS AND COMPUTATION
- The (ω/g)-expansion method and its application to Vakhnenko equation
- (2009) Li Wen-An et al. Chinese Physics B
- The Hirota’s direct method for multiple-soliton solutions for three model equations of shallow water waves
- (2008) Abdul-Majid Wazwaz APPLIED MATHEMATICS AND COMPUTATION
- The Hirota’s direct method and the tanh–coth method for multiple-soliton solutions of the Sawada–Kotera–Ito seventh-order equation
- (2007) Abdul-Majid Wazwaz APPLIED MATHEMATICS AND COMPUTATION
- Solution of non-linear Klein–Gordon equation with a quadratic non-linear term by Adomian decomposition method
- (2007) Kartik Chandra Basak et al. Communications in Nonlinear Science and Numerical Simulation
- The ()-expansion method and travelling wave solutions of nonlinear evolution equations in mathematical physics
- (2007) Mingliang Wang et al. PHYSICS LETTERS A
Find the ideal target journal for your manuscript
Explore over 38,000 international journals covering a vast array of academic fields.
SearchAsk a Question. Answer a Question.
Quickly pose questions to the entire community. Debate answers and get clarity on the most important issues facing researchers.
Get Started