Open AccessADOMIAN POLYNOMIALS: A POWERFUL TOOL FOR ITERATIVE METHODS OF SERIES SOLUTION OF NONLINEAR EQUATIONS
Author(s) -
A. Elsaid
Publication year - 2012
Publication title -
journal of applied analysis and computation
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.55
H-Index - 21
eISSN - 2158-5644
pISSN - 2156-907X
DOI - 10.11948/2012028
Subject(s) - adomian decomposition method , mathematics , homotopy analysis method , nonlinear system , boundary value problem , algebraic equation , mathematical analysis , series (stratigraphy) , partial differential equation , homotopy , paleontology , physics , quantum mechanics , pure mathematics , biology
In this article, we illustrate how the Adomian polynomials can be utilized with different types of iterative series solution methods for nonlinear equations. Two methods are considered here: the differential transform method that transforms a problem into a recurrence algebraic equation and the homotopy analysis method as a generalization of the methods that use inverse integral operator. The advantage of the proposed techniques is that equations with any analytic nonlinearity can be solved with less computational work due to the properties and available algorithms of the Adomian polynomials. Numerical examples of initial and boundary value problems for differential and integro-differential equations with different types of nonlinearities show good results.
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