The Adomian method is a strong tool for solving partial and ordinary differential equations [Cherruault, Y. and N'Dour, M. (1997). The decomposition method applied to a diffusion model, Kybernetes, 26, No. 8, 921–935; Wazwaz, A. M. (1998). A comparison between Adomian decomposion method and Taylor series method in the series solutions, Appl. Math. Comput. 97, 37–44.] In this paper, we apply a new algorithm named the restarted Adomian method used for solving algebraic equations and nonlinear integral equations [Babolian, E. and Javadi, Sh. (2003). Restarted Adomian method for algebraic equations, Appl. Math. Comput., 146, 533–541; Babolian, E., Javadi, Sh. and Sadeghi, H. Restarted Adomian method for nolinear integral equations, Appl. Math. Comput., 153, 353–359.]. By some examples and comparing results in both the methods (restarted and standard Adomian method) with exact solution, we show that the new method gives better numerical results.
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