Kirkup, Stephen Martin ORCID: 0000-0002-9680-7778 (1998) Solution of discontinuous interior Helmholtz problems by the boundary and shell element method. Computer Methods in Applied Mechanics and Engineering, 140 (3-4). pp. 393-404. ISSN 00457825
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Official URL: http://dx.doi.org/10.1016/S0045-7825(96)01117-6
Abstract
The Helmholtz equation governing an interior domain with shell discontinuities is not efficiently solvable by the traditional boundary element method. In this paper it is shown how the Helmholtz equation can be recast as an integral equation known as the boundary and shell integral equation. The application of collocation to the integral equation gives rise to a method termed the boundary and shell element method. The associated problem of finding the eigenvalues and eigenfunctions of the Helmholtz equation in a discontinuous domain via the same method is also considered. This leads to a non-linear eigenvalue problem. Such a problem may be solved through polynomial interpolation of the matrix components. In this paper methods for solving the Helmholtz equation and the associated eigenvalue problem are implemented and applied to a test problem.
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Solution of discontinuous interior Helmholtz problems by the boundary and shell element method. (deposited 09 Jul 2013 08:22)
- Solution of discontinuous interior Helmholtz problems by the boundary and shell element method. (deposited 26 May 2016 13:35) [Currently Displayed]
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