期刊名称:Journal of Interpolation and Approximation in Scientific Computing
印刷版ISSN:2194-3907
电子版ISSN:2194-3907
出版年度:2016
卷号:2016
期号:1
页码:25-37
DOI:10.5899/2016/jiasc-00090
出版社:ISPACS GmbH
摘要:In this paper, an algorithm based on a new modification, developed by Duan and Rach, for the Adomian decomposition method (ADM) is generalized to find positive solutions for boundary value problems involving nonlinear fractional ordinary differential equations. In the proposed algorithm the boundary conditions are used to convert the nonlinear fractional differential equations to an equivalent integral equation and then a recursion scheme is used to obtain the analytical solution components without the use of undetermined coefficients. Hence, there is no requirement to solve a nonlinear equation or a system of nonlinear equations of undetermined coefficients at each stage of approximation solution as per in the standard ADM. The fractional derivative is described in the Caputo sense. Numerical examples are provided to demonstrate the feasibility of the proposed algorithm.
