Title : ( RBFs meshless method of lines for time dependent PDEs with decomposition of interior and boundary data centers )
Authors: Maryam Arab Ameri , Ali Reza Soheili , Mahdiar Barfeie ,Access to full-text not allowed by authors
Abstract
The meshless method of lines (MOL) is proposed for the numerical solution of time dependent partial differential equations (PDEs). After approximating spatial derivatives of equation and boundary condition by radial basis functions the resulting system will be a system of differential-algebraic equations. The differential-algebraic equation is converted to a system of ordinary differential equations (ODEs) by decomposing of interior and boundary centers and replacing expansion coeffcients of boundary centers as a function of interior ones. Computational experiments are performed for two-dimensional Burgers' equations and Brusselator reaction-diffusion system. The numerical results compete very well with the analytical solutions.
Keywords
, Meshless method of lines, Radial basis functions, Collocation method, Burgers' equations@article{paperid:1055862,
author = {Maryam Arab Ameri and Soheili, Ali Reza and Mahdiar Barfeie},
title = {RBFs meshless method of lines for time dependent PDEs with decomposition of interior and boundary data centers},
journal = {Iranian Journal of Science and Technology-Transaction A: Science},
year = {2018},
volume = {42},
number = {1},
month = {March},
issn = {1028-6276},
pages = {47--58},
numpages = {11},
keywords = {Meshless method of lines; Radial basis functions; Collocation method; Burgers' equations},
}
%0 Journal Article
%T RBFs meshless method of lines for time dependent PDEs with decomposition of interior and boundary data centers
%A Maryam Arab Ameri
%A Soheili, Ali Reza
%A Mahdiar Barfeie
%J Iranian Journal of Science and Technology-Transaction A: Science
%@ 1028-6276
%D 2018