Keuchel, SörenSörenKeuchelVater, KerstinKerstinVaterEstorff, Otto vonOtto vonEstorff2019-12-042019-12-042017-06-01International Journal for Numerical Methods in Engineering 9 (110): 842-861 (2017-06-01)http://hdl.handle.net/11420/3946A fast multipole boundary element method (FMBEM) extended by an adaptive mesh refinement algorithm for solving acoustic problems in three-dimensional space is presented in this paper. The Collocation method is used, and the Burton–Miller formulation is employed to overcome the fictitious eigenfrequencies arising for exterior domain problems. Because of the application of the combined integral equation, the developed FMBEM is feasible for all positive wave numbers even up to high frequencies. In order to evaluate the hypersingular integral resulting from the Burton–Miller formulation of the boundary integral equation, an integration technique for arbitrary element order is applied. The fast multipole method combined with an arbitrary order h-p mesh refinement strategy enables accurate computation of large-scale systems. Numerical examples substantiate the high accuracy attainable by the developed FMBEM, while requiring only moderate computational effort at the same time. Copyright © 2016 John Wiley & Sons, Ltd.en0029-5981International Journal for Numerical Methods in Engineering20179842861adaptive mesh refinementarbitrary element orderboundary element methodBurton–Miller formulationfast multipole methodHelmholtz equationhp Fast multipole boundary element method for 3D acousticsJournal Article10.1002/nme.5434Other