Dr. Morteza  Rafei
My Social Links

Dr. Morteza Rafei

Guest Researcher
Delft University of Technology, Netherlands


Highest Degree
Ph.D. in Physical Science Engineering from Delft University of Technology, Netherlands

Share this Profile

Area of Interest:

Mathematics
100%
Nonlinear Dynamics
62%
Applied Mathematics
90%
Differential Equations
75%
Mathematical Physics
55%

Research Publications in Numbers

Books
0
Chapters
0
Articles
0
Abstracts
0

Selected Publications

  1. Rafei, M. and W.T.V. Horssen, 2013. On Constructing Accurate Approximations of First Integrals for Difference Equations. Commun. Nonlinear Sci. Numer. Simul., 18: 835-850.
    CrossRef  |  Direct Link  |  
  2. Rafei, M. and W.T.V. Horssen, 2012. Solving systems of nonlinear difference equations by the multiple scales perturbation method. Nonlinear Dynamics, 69: 1509-1516.
    CrossRef  |  Direct Link  |  
  3. Rafei, M. and W.T. van Horssen, 2011. On the multiple scales perturbation method for a system of nonlinear difference equations. Proceedings of the 7th European Nonlinear Oscillations Conferences, July 24-29, 2011, Rome, Italy -.
  4. Rafei, M. and W.T.V. Horssen, 2010. On asymptotic approximations of first integrals for second order difference equations. Nonlinear Dynamics, 61: 535-551.
    CrossRef  |  Direct Link  |  
  5. Rafei, M., H. Daniali, D.D. Ganji and H. Pashaei, 2007. Solution of the prey and predator problem by homotopy perturbation method. Applied Math. Comput., 188: 1419-1425.
    CrossRef  |  Direct Link  |  
  6. Rafei, M., H. Daniali and D.D. Ganji, 2007. Variational iteration method for solving the epidemic model and the prey and predator problem. Applied Math. Comput., 186: 1701-1709.
    CrossRef  |  
  7. Rafei, M., D.D. Ganji, H.R. Mohammadi Daniali and H. Pashaei, 2007. Application of homotopy perturbation method to the RLW and generalized modified Boussinesq equations. Phys. Lett., 364: 1-6.
    CrossRef  |  Direct Link  |  
  8. Rafei, M., D.D. Ganji, H. Danialia and H. Pashaei, 2007. The variational iteration method for nonlinear oscillators with discontinuities. J. Sound Vibr., 305: 614-620.
    CrossRef  |  Direct Link  |  
  9. Rafei, M., D.D. Ganji and H. Daniali, 2007. Solution of the epidemic model by homotopy perturbation method. Applied Math. Comput., 187: 1056-1062.
    CrossRef  |  Direct Link  |  
  10. Rafei, M. and H. Daniali, 2007. Application of the variational iteration method to the Whitham-Broer-Kaup equations. Comput. Math. Applic., 54: 1079-1085.
    CrossRef  |  Direct Link  |  
  11. Ganji, D. and M. Rafei and J. Vaseghi, 2007. Application of homotopy-perturbation method for systems of nonlinear momentum and heat transfer equations. Heat Transfer Res., 38: 363-379.
    CrossRef  |  
  12. Rafei, M. and D.D. Ganji, 2006. Explicit solutions of Helmholtz equation and fifth-order KdV equation using homotopy perturbation method. Int. J. Nonlinear Sci. Numer. Simul., 7: 321-328.
    Direct Link  |  
  13. Ganji, D.D. and M. Rafei, 2006. Solitary wave solutions for a generalized Hirota–Satsuma Coupled KdV equation by homotopy perturbation method. Applied Phys. Lett. A., 356: 131-137.
    Direct Link  |