CFP last date
20 December 2024
Call for Paper
January Edition
IJCA solicits high quality original research papers for the upcoming January edition of the journal. The last date of research paper submission is 20 December 2024

Submit your paper
Know more
The week's pick
Responsive image
Improved Shuffled Frog Leaping Algorithm with Self-Adaptive Shuffling for Fuzzy Logic PD+G Controller Optimization in Robotic Manipulators

Duc Hoang Nguyen
Random Articles
Reseach Article

An Elegant Perturbation Iteration Algorithm for the Lane-Emden Equation

by M. Khalid, Mariam Sultana, Javed Khan, Muhammad Shoaib
journal cover thumbnail

International Journal of Computer Applications
Foundation of Computer Science (FCS), NY, USA
Volume 132 - Number 6
Year of Publication: 2015
Authors: M. Khalid, Mariam Sultana, Javed Khan, Muhammad Shoaib
10.5120/ijca2015907463

M. Khalid, Mariam Sultana, Javed Khan, Muhammad Shoaib . An Elegant Perturbation Iteration Algorithm for the Lane-Emden Equation. International Journal of Computer Applications. 132, 6 ( December 2015), 1-7. DOI=10.5120/ijca2015907463

@article{ 10.5120/ijca2015907463,
author = { M. Khalid, Mariam Sultana, Javed Khan, Muhammad Shoaib },
title = { An Elegant Perturbation Iteration Algorithm for the Lane-Emden Equation },
journal = { International Journal of Computer Applications },
issue_date = { December 2015 },
volume = { 132 },
number = { 6 },
month = { December },
year = { 2015 },
issn = { 0975-8887 },
pages = { 1-7 },
numpages = {9},
url = { https://ijcaonline.org/archives/volume132/number6/23595-2015907463/ },
doi = { 10.5120/ijca2015907463 },
publisher = {Foundation of Computer Science (FCS), NY, USA},
address = {New York, USA}
}
%0 Journal Article
%1 2024-02-06T23:28:24.271363+05:30
%A M. Khalid
%A Mariam Sultana
%A Javed Khan
%A Muhammad Shoaib
%T An Elegant Perturbation Iteration Algorithm for the Lane-Emden Equation
%J International Journal of Computer Applications
%@ 0975-8887
%V 132
%N 6
%P 1-7
%D 2015
%I Foundation of Computer Science (FCS), NY, USA
Abstract

An all new technique has been devised to solve non-linear Lane- Emden type equations. This novel technique is based on the Perturbation Iteration Algorithm. In this paper, a few examples are presented for the illustration of the power and wide usability of the proposed method. Moreover, a compare and contrast with the actual solution is provided. It has been evaluated that by employment of this method, the construction of perturbation solutions converging swiftly to the true solutions usually becomes easy, by giving us room to exactly demonstrate how ε-terms influence linearized equations. This swift convergence of the method gives solutions that are accurate quantitatively through relatively little iteration.

References
  1. Aksoy, Y., Pakdemirli, M. (2010) New perturbationiteration solutions for Bratu-type equations, Computers and Mathematics with Applications, Vol. 59, No. 8, pp. 2802-2808.
  2. Bender, C.M., Milton, K.A., Pinsky, S.S., Simmons, L.M. (1989) A new perturbative approach to nonlinear problems, Journal of Mathematical Physics, Vol. 30, No. 7, pp. 1447-1455.
  3. Bozhkov, Y., Gilli Martins, A.C. (2004) Lie point symmetries and exact solutions of quasilinear differential equations with critical exponents, Nonlinear Analysis: Theory, Methods & Applications, Vol. 57, No. 5, pp. 773-793.
  4. Chandrasekhar, S. (1967) An Introduction to the Study of Stellar Structure, New York: Dover Publications, USA.
  5. El-Gebeily, M., O’Regan, D. (2007) A quasi linearization method for a class of second order singular nonlinear differential equations with non-linear boundary conditions, Nonlinear Analysis: Real World Application, Vol. 8, pp. 174-186.
  6. Goenner, H., Havas, P. (2000) Exact solutions of the generalized Lane-Emden equation, Journal of Mathematical Physics, Vol. 41, No. 10, pp. 7029-7042.
  7. He, J.H. (2003) Variational approach to the Lane-Emden equation, Applied Mathematics and Computation, Vol. 143, No. 2, pp. 539-541.
  8. Liao, S. (2003) A new analytic algorithm of Lane-Emden type equations, Applied Mathematics and Computation, Vol. 142, No. 1, pp. 1-16.
  9. Mandelzweig, V.B., Tabakin, F. (2001) Quasi linearization approach to nonlinear problems in physics with application to nonlinear ODEs, Computer Physics Communications, Vol. 141, No. 2, pp. 268-281.
  10. Momoniat, E., Harley, C. (2006) Approximate implicit solution of a Lane-Emden equation, New Astronomy, Vol. 11, pp. 520-526.
  11. Nouh, M.I. (2004) Accelerated power series solution of polytropic and isothermal gas spheres, New Astronomy, Vol. 9, No. 6, pp. 467-473.
  12. Ozis, T., Yildirim, A. (2007) Solutions of singular IVP’s of Lane-Emden type by homotopy pertutbation method, Physics Letters A, Vol. 369, pp. 70-76.
  13. Ozis, T., Yildirim, A. (2009) Solutions of singular IVP’s of Lane-Emden type by the variational iteration method, Nonlinear Analysis: Theory, Methods & Applications, Vol. 70, No. 6, pp. 2480-2484.
  14. Pakdemirli, M., Aksoy, Y., Boyaci, H. (2011) A new perturbation-iteration approach for first order differential equations, Mathematical and Computational Applications, Vol. 16, No. 4, pp. 890-899.
  15. Parand, K., Razzaghi, M. (2004) Rational Chebyshev tau method for solving higher-order ordinary differential equations, International Journal of Computer Mathematics, Vol. 81, No. 1, pp. 73-80.
  16. Parand, K., Razzaghi, M. (2004) Rational Legendre approximation for solving some physical problems on semiinfinite intervals, Physica Scripta, Vol. 69, pp. 353-357.
  17. Parand, K., Dehghan, M., Rezaei, A.R., Ghaderi, S.M. (2010) An approximation algorithm for the solution of the nonlinear Lane-Emden type equations arising in astrophysics using Hermite functions collocation method, Computer Physics Communications, Vol. 181, No. 6, pp. 1096- 1108.
  18. Parand, K., Shahini, M., Dehghan, M. (2009) Rational Legendre pseudospectral approach for solving nonlinear differential equations of Lane-Emden type, Journal of Computational Physics, Vol. 228, No. 23, pp. 8830-8840.
  19. Ramos, J.I. (2003) Linearization methods in classical and quantum mechanics, Computer Physics Communications, Vol. 153, No. 2, pp. 199-208.
  20. Ramos, J.I. (2008) Series approach to the Lane-Emden equation and comparison with the homotopy perturbation method, Chaos, Solitons and Fractals, Vol. 38, No. 2, pp. 400-408.
  21. Richardson, O.U. (1921) The Emission of Electricity From Hot Bodies, London: Longmans Green and Company, UK.
  22. Shawagfeh, N.T. (1993) Non-perturbative approximate solution for Lane-Emden equation, Journal of Mathematical Physics, Vol. 34, No. 9, pp. 4364-4369.
  23. Wazwaz, A.M. (2001) A new algorithm for solving differential equations of Lane-Emden type, Applied Mathematics and Computation, Vol. 118, No. 2, pp. 287-310.
  24. Wazwaz, A.M. (2002) A new method for solving singular initial value problems in the second-order ordinary differential equations, Applied Mathematics and Computation, Vol. 128, No. 1, pp. 45-57.
Index Terms

Computer Science
Information Sciences

Keywords

Lane-Emden Equation Second-order Initial Value Problems Perturbation Iteration Method Numerical Solution Fast Convergence.

Powered by PhDFocusTM