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Solving a class of linear partial differential equations with Dirichlet‐boundary conditions by the Adomian method

Solving a class of linear partial differential equations with Dirichlet‐boundary conditions by... Considers the Adomian decomposition method to be a powerful technique that can solve efficiently a large class of linear and nonlinear differential equations. Describes a general method for approximating the solution of the Laplace equation with Dirichlet‐boundary conditions and which can be applied to a large class of problems. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Kybernetes Emerald Publishing

Solving a class of linear partial differential equations with Dirichlet‐boundary conditions by the Adomian method

Kybernetes , Volume 33 (8): 20 – Sep 1, 2004

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Publisher
Emerald Publishing
Copyright
Copyright © 2004 Emerald Group Publishing Limited. All rights reserved.
ISSN
0368-492X
DOI
10.1108/03684920410545270
Publisher site
See Article on Publisher Site

Abstract

Considers the Adomian decomposition method to be a powerful technique that can solve efficiently a large class of linear and nonlinear differential equations. Describes a general method for approximating the solution of the Laplace equation with Dirichlet‐boundary conditions and which can be applied to a large class of problems.

Journal

KybernetesEmerald Publishing

Published: Sep 1, 2004

Keywords: Cybernetics; Linear structure equation modelling

References