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A numerical scheme for the solution of fractional integro-differential equations using the Adomian decomposition method.

Document Type : Research Paper

Author

University of Anbar - College of Education for Pure Science.

10.37652/juaps.2012.63153

Abstract

The aim of this paper is to apply the Adomian decomposition method for linear fractional differential equations. The definition of Riemann-Liouville for fractional derivative was used in this paper.

Keywords

Main Subjects

References
[1] A. Arikoglu, I. Ozkol, "Solution of boundary value problem for integro-differential equations by using differential transform method, Appl. Math. Comp. in press.
[2] F. Minardi, (1997). Fractional calculus: " Some basic problems in continuum and statistical mechanics",A. Carpinter and F. Minardi (eds), Springer-Verlag, New York, 291-348.
[3] G. Adomian,(1994). Solving Frontier Problems of physics: The Decomposition method, Kluwer, Academic Publisher. Boston, USA
[4] I. Poldubny, (2002). Geometric and physical interpretation of fractional integration and fractional differentiation, Fractal calculus Appl. Anal., 5, 367-386.
[5] K. Abbaoui, Y. Charruault (1996). "New ideas for proving convergence of decomposition methods", Comp. Math. Applications, 29(7) 103-108.
[6] K. Abbaoui, Y. Charruault, (1996).  " Convergence of Adomian's method applied to differential equations", Comp. Math. Applications, 28(5) 103-106.
[7] K. B. Oldham, J. Spanier,(1974)."The fractional calculus", Academic Press, New York, USA.
[8] K. Diethelm, N. J. Ford, A. D. Freed, Yu Luchko, "Algorithms for the fractional calculus, aselection of numerical methods", Comp. method in appl. Mech. And Eng. In press.
[9] M. Caputo (1967). Linear models of dissipation whose Q is almost frequency independent. Part II, J. Roy. Astral. Soc., 13, 529-539.
[10] Y. Charruault, (1989). Convergence of Adomian's method, Kyberenetas, 18 31-38. 
[11] Y. Charruault, G. Adomian (1993), decomposition method a new proof of convergence, Math. Comp. Modeling, 18103-106.
Journal of University of Anbar for Pure Science
Volume 6, Issue 1
April 2012
Page 64-66
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History
  • Receive Date: 14 September 2011
  • Revise Date: 29 March 2012
  • Accept Date: 02 April 2012
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