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Section 21
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Error estimations for some meshless boundary interpolation methods
Article first published online: 27 DEC 2004
DOI: 10.1002/pamm.200410301
Copyright © 2004 WILEY-VCH Verlag GmbH & Co. KGaA, Weinheim
1617-7061/asset/cover.gif?v=1&s=79b6ccfe3470758033c99b476335ce58b5a38819 "PAMM")
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How to Cite
Gáspár, C. (2004), Error estimations for some meshless boundary interpolation methods. Proc. Appl. Math. Mech., 4: 640–641. doi: 10.1002/pamm.200410301
Publication History
- Issue published online: 27 DEC 2004
- Article first published online: 27 DEC 2004
References
- [1], Multiquadtrics - a Scattered Data Approximation Scheme with Application to Computational Fluid Dynakmics I-II, Computers Math. Applic. 19 (8/9, 127-161 (1990).
- [2], Multi-level biharmonic and bi-Helmholtz interpolation with application to the boundary element method. Engineering Analysis with Boundary Elements 24, 559-573 (2000).
- [3], Fast Multi-Level Meshless Methods Based on the Implicit Use of Radial Basis Functions. In: Meshfree methods for partial differential equations, ed. by M.Griebel, M.A.Schweitzer. Lecture notes in computational science and engineering Vol. 26. (Springer, Berlin, Heldelberg, New York, 2002), 143-160.
- [4], Boundary interpolation vs boundary elements: theory and some applications. Proc. of the 26thWorld Conference on Boundary Elements and other Mesh Reduction Methods, Bologna, Italy, 19-21 April, 2004, ed. by C.A.Brebbia, (Witpress, Southampton, 2004) 143-152.
- [5], , , Some recent results and proposals for the use of radial basis functions in the BEM. Engineering Analysis with Boundary Elements, 23, 285-296, (1999).