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Optimization, conditioning and accuracy of radial basis function method for partial differential equations with nonlocal boundary conditions - a case of two-dimensional Poisson equation
Type of publication
Straipsnis Web of Science ir Scopus duomenų bazėje / Article in Web of Science and Scopus database (S1)
Author(s)
Vilniaus universitetas |
Title
Optimization, conditioning and accuracy of radial basis function method for partial differential equations with nonlocal boundary conditions - a case of two-dimensional Poisson equation
Publisher (trusted)
Pergamon-Elsevier science LTD
Date Issued
Date Issued |
---|
2013 |
Extent
p. 788-804
Is part of
Engineering analysis with boundary elements. Oxford : Pergamon-Elsevier, 2013, Vol. 37, iss. 4.
Field of Science
Abstract
Various real-world processes usually can be described by mathematical models consisted of partial differential equations (PDEs) with nonlocal boundary conditions. Therefore, interest in developing computational methods for the solution of such nonclassical differential problems has been growing fast. We use a meshless method based on radial basis functions (RBF) collocation technique for the solution of two-dimensional Poisson equation with nonlocal boundary conditions. The main attention is paid to the influence of nonlocal conditions on the optimal choice of the RBF shape parameters as well as their influence on the conditioning and accuracy of the method. The results of numerical study are presented and discussed.
Type of document
type::text::journal::journal article::research article
ISSN (of the container)
0955-7997
WOS
000317450000015
eLABa
3141565
Coverage Spatial
Jungtinė Karalystė / United Kingdom of Great Britain and Northern Ireland (GB)
Language
Anglų / English (en)
Bibliographic Details
80