An accelerated symmetric time-domain boundary element formulation for elasticity
- Autores: Matthias Messner, Martin Schanz
- Localización: Engineering analysis with boundary elements, ISSN 0955-7997, Vol. 34, Nº. 11, 2010 (Ejemplar dedicado a: Special issue on the advances in mesh reduction methods- In honor of Professor Subrata Mukherjee on the occasion of his 65th birthday), págs. 944-955
- Idioma: inglés
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Resumen
Wave propagation phenomena occur often in semi-infinite regions. It is well known that such problems can be handled well with the boundary element method (BEM). However, it is also known that the BEM, with its dense matrices, becomes prohibitive with respect to storage and computing time. Focusing on wave propagation problems, where a formulation in time domain is preferable, the mentioned limit of the method becomes evident. Several approaches, amongst them the adaptive cross approximation (ACA), have been developed in order to overcome these drawbacks mainly for elliptic problems. The present work focuses on time dependent elastic problems, which are indeed not elliptic. The application of the presented fast boundary element formulation on such problems is enabled by introducing the well known Convolution Quadrature Method (CQM) as time stepping scheme. Thus, the solution of the time dependent problem ends up in the solution of a system of decoupled Laplace domain problems. This detour is worth since the resulting problems are again elliptic and, therefore, the ACA can be used in its standard fashion. The main advantage of this approach of accelerating a time dependent BEM is that it can be easily applied to other fundamental solutions as, e.g., visco- or poroelasticity.
