@Article{cmes.2015.109.303, AUTHOR = {Liu Liqi, Wang Haitao,2}, TITLE = {A RIM-based Time-domain Boundary Element Method for Three-Dimensional Non-homogeneousWave Propagations}, JOURNAL = {Computer Modeling in Engineering \& Sciences}, VOLUME = {109-110}, YEAR = {2015}, NUMBER = {4}, PAGES = {303--324}, URL = {http://www.techscience.com/CMES/v109-110n4/27302}, ISSN = {1526-1506}, ABSTRACT = {This paper presents a three-dimensional (3-D) boundary element method (BEM) scheme based on the Radial Integration Method (RIM) for wave propagation analysis of continuously non-homogeneous problems. The Kelvin fundamental solutions are adopted to derive the boundary-domain integral equation (BDIE). The RIM proposed by Gao (Engineering Analysis with Boundary Elements 2002; 26(10):905-916) is implemented to treat the domain integrals in the BDIE so that only boundary discretization is required. After boundary discretization, a set of second-order ordinary differential equations with respect to time variable are derived, which are solved using the Wilson-q method. Main advantages of the proposed method are that 1) it can treat wave propagations in non-homogeneous domains with only boundary mesh required, and that 2) coefficient matrices arising from the BEM are evaluated and stored only once so that solving large-scale problems with huge time steps is possible. In the numerical examples, the present method is tested in terms of accuracy, capacity to treat non-homogeneous problems and large-scale potentials.}, DOI = {10.3970/cmes.2015.109.303} }