An effective high-order point-collocation numerical approach based on integrated approximants for elliptic differential equations
Edited book (chapter)
Chapter Title | An effective high-order point-collocation numerical approach based on integrated approximants for elliptic differential equations |
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Book Chapter Category | Edited book (chapter) |
ERA Publisher ID | 2797 |
Book Title | Leading-edge applied mathematical modeling research |
Authors | Mai-Duy, N. (Author) and Tran-Cong, T. (Author) |
Editors | Alvarez, Matias P. |
Page Range | 215-250 |
Chapter Number | 6 |
Number of Pages | 36 |
Year | 2008 |
Publisher | Nova Science Publishers |
Place of Publication | New York, NY. United States |
ISBN | 9781600219771 |
Web Address (URL) | https://www.novapublishers.com/catalog/product_info.php?products_id=6085 |
Abstract | This chapter presents the basic features of high-order integral collocation techniques and demonstrates their |
Keywords | radial basis functions; chebyshev polynomials; integral collocation formulation; multiple boundary conditions; complex geometries; domain decompositions |
ANZSRC Field of Research 2020 | 490303. Numerical solution of differential and integral equations |
401204. Computational methods in fluid flow, heat and mass transfer (incl. computational fluid dynamics) | |
401706. Numerical modelling and mechanical characterisation | |
Public Notes | Files associated with this item cannot be displayed due to copyright restrictions. |
Byline Affiliations | Computational Engineering and Science Research Centre |
https://research.usq.edu.au/item/9yx29/an-effective-high-order-point-collocation-numerical-approach-based-on-integrated-approximants-for-elliptic-differential-equations
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