Identyfikatory
Warianty tytułu
Języki publikacji
Abstrakty
In this paper, the couette flow of fluid with variable viscosity is studied analytically by using Homotopy Pertubation Method (HPM). At first the basic idea of Homotopy Pertubation Method (HPM) is presented. The mathematical formulation and application of HPM to nonlinear problem are presented in section three. In order to check the validity of solution the analytical results are compared with exact ones for various numerical cases. The good agreement between exact method and Homotopy Pertubation Method has been assures us about the solution accuracy.
Czasopismo
Rocznik
Tom
Strony
5--8
Opis fizyczny
Bibliogr., 16 poz., rys., tab., wykr.
Twórcy
autor
- Department of Chemical Engineering, College of Chemical Engineering, Islamic Azad University, Mahshahr Branch, Mahshahr, Farhangsara Street, Iran
autor
- Faculty of New Sciences and Technologies, Department of Aerospace, University of Tehran, Tehran, North Kargar, Amirabad, Iran
autor
- Faculty of Mechanical Engineering, Babol University of Technology, Shariati Street, Babol, Iran
Bibliografia
- 1. Abbasbandy S. (2006), The application of homotopy analysis method to nonlinear equations arising in heat transfer, Physics Letter, A 360, 109–113.
- 2. Allan F., Al-Khaled K. (2006), An approximation of the analytic solution of the shock wave equation, Journal of Computational and Applied Mathematics, 192, 301–309.
- 3. Aziz A., Na T. Y. (1984), Perturbation methods in heat transfer, Hemisphere Publishing Corp.
- 4. Ghosh S., Roy A., Roy D. (2007), An adaptation of Adomian decomposition for numeric-analytic integration of strongly nonlinear and chaotic oscillators, Computer Methods in Applied Mechanics and Engineering, 196, 1133–1153.
- 5. Ghotbi A. R., Barari A. Ganji D. D. (2011), Solving ratio-dependent predator-prey system with constant effort harvesting using homotopy perturbation method, Mathematical Problems in Engineering, ID 945420.
- 6. He J. H. (1999), Variational iteration method: A kind of nonlinear analytical technique: Some examples, International Journal of NonLinear Mechanics, 344, 699–708.
- 7. He J. H. (2004a), Comparison of homotopy perturbation method and homotopy analysis method, Appl. Math Comput., 156, 527–39.
- 8. He J. H. (2004b), The homotopy perturbation method for nonlinear oscillators with discontinuities, Appl. Math Comput., 151, 287–92.
- 9. He J. H. (2005), Homotopy perturbation method forbifurcation of nonlinear problems, Int. J. Nonlinear Sci. Numer. Simul., 6(2), 207-215.
- 10. Jalaal M., Nejad M. G., Jalili P. (2011), Homotopy perturbation method for motion of a spherical solid particle in plane couette fluid flow, Computers and Mathematics with Applications, 61, 2267–2270.
- 11. Lesnic D. (2005), Decomposition methods for non-linear, noncharacteristic Cauchy heat problems, Communications in Nonlinear Science and Numerical Simulation, 10, 581–596.
- 12. Moghimi S. M., Ganji D. D., Bararnia H., Hosseini M., Jalaal M. (2011), Homotopy perturbation method for nonlinear MHD JefferyHamel problem, Computers and Mathematics with Applications, 61, 2213–2216.
- 13. Pamuk S. (2005), Solution of the porous media equation by Adomian's decomposition method, Physics Letters, A 344, 184–188.
- 14. Rashidi R. R., Beg O.A., Rastegari M.T., Mehmood A. (2012), Homotopy study of buoyancy-induced flow of non-newtonian fluids over a non-isothermal surface in a porous medium, International Journal of Applied Mathematics and Mechanics, 8, 34-52.
- 15. Sharma P. R., Methi G. (2010), Solution of coupled nonlinear partial differential equations using homotopy perturbation method, International Journal of Applied Mathematics and Mechanics, 6, 33-49.
- 16. Turian R. M., Bird R. B. (1963), Viscous heating in the cone-andplate viscometer II, Chem. Eng. Sci., 18, 689-96.
Typ dokumentu
Bibliografia
Identyfikator YADDA
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