A cartesian-grid collocation technique with integrated radial basis functions for mixed boundary value problems
Article
Article Title | A cartesian-grid collocation technique with integrated radial basis functions for mixed boundary value problems |
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ERA Journal ID | 187 |
Article Category | Article |
Authors | Le, Phong B. H. (Author), Mai-Duy, Nam (Author), Tran-Cong, Thanh (Author) and Baker, Graham (Author) |
Journal Title | International Journal for Numerical Methods in Engineering |
Journal Citation | 82 (4), pp. 435-463 |
Number of Pages | 29 |
Year | 2010 |
Place of Publication | Bognor Regis, West Sussex. United Kingdom |
ISSN | 0029-5981 |
1097-0207 | |
Digital Object Identifier (DOI) | https://doi.org/10.1002/nme.2771 |
Web Address (URL) | http://onlinelibrary.wiley.com/doi/10.1002/nme.2771/pdf |
Abstract | In this paper, high order systems are reformulated as first order systems which are then numerically solved by a collocation method. The collocation method is based on Cartesian discretisation with 1D-integrated radial basis function networks (1D-IRBFN){MaiDuy_TranCong:2007}. The present method is enhanced by a new boundary interpolation technique based on 1D-IRBFN which is introduced to obtain variable approximation at irregular points in irregular domains. The proposed method is well suited to problems with mixed boundary conditions on both regular and irregular domains. The main results obtained are (a) the boundary conditions for the reformulated problem are of Dirichlet type only; (b) the integrated RBFN approximation avoids the well known reduction of convergence rate associated with differential formulations; (c) the primary variable (e.g. displacement, temperature) and the dual variable (e.g. stress, temperature gradient) have similar convergence order; (d) the volumetric locking effects associated with incompressible materials in solid mechanics are alleviated. Numerical experiments show that the proposed method achieves very good accuracy and high convergence rates. |
Keywords | RBF; collocation method; elasticity; Cartesian grid; mixed formulation; first order system; volumetric locking; incompressibility |
ANZSRC Field of Research 2020 | 490303. Numerical solution of differential and integral equations |
401706. Numerical modelling and mechanical characterisation | |
490404. Combinatorics and discrete mathematics (excl. physical combinatorics) | |
Public Notes | File reproduced in accordance with the copyright policy of the publisher/author. |
Byline Affiliations | Computational Engineering and Science Research Centre |
Deputy Vice-Chancellor's Office (Scholarship) | |
Institution of Origin | University of Southern Queensland |
https://research.usq.edu.au/item/q0789/a-cartesian-grid-collocation-technique-with-integrated-radial-basis-functions-for-mixed-boundary-value-problems
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