Login
Register
Submit a Paper
Propose a Special lssue
Open Access
ARTICLE
On the application of the Fast Multipole Method to Helmholtz-like problems with complex wavenumber
Politecnico di Milano, Milan (Italy), attilio.frangi@polimi.it
LMS (UMR CNRS 7649), Ecole Polytechnique, Palaiseau (France), bonnet@lms.polytechnique.fr
Computer Modeling in Engineering & Sciences 2010, 58(3), 271-296. https://doi.org/10.3970/cmes.2010.058.271
Download PDFAbstract
This paper presents an empirical study of the accuracy of multipole expansions of Helmholtz-like kernels with complex wavenumbers of the form k = (α + iβ)ϑ, with α = 0,±1 and β > 0, which, the paucity of available studies notwithstanding, arise for a wealth of different physical problems. It is suggested that a simple point-wise error indicator can provide an a-priori indication on the number N of terms to be employed in the Gegenbauer addition formula in order to achieve a prescribed accuracy when integrating single layer potentials over surfaces. For β ≥ 1 it is observed that the value of N is independent of β and of the size of the octree cells employed while, for β < 1, simple empirical formulas are proposed yielding the required N in terms of β.Keywords
This work is licensed under a Creative Commons Attribution 4.0 International License , which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
Downloads
Citation Tools
