Summary
This paper adresses the derivation of well-conditioned generalized Brakhage-Werner integral formulations for the iterative solution of exterior acoustics boundary value problems. These new formulations are suitable to be implemented in a Fast Multipole Method coupled to a Krylov subspace iterative algorithm. Their construction is based on the On-Surface Radiation Condition (OSRC) formalism.
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References
X. Antoine, M. Darbas: ‘Microlocal preconditioning of direct elementary integral formulations in acoustics’ (in preparation).
X. Antoine: ‘Fast approximate computation of a time-harmonic scattered field using the On-Surface Radiation Condition Method’. In: IMA Journal of Applied Mathematics, 66 (2001), pp. 83–110.
X. Antoine, H. Barucq, A. Bendali: ‘Bayliss-Turkel-like radiation condition on surfaces of arbitrary shape’. In: Journal of Mathematical Analysis and Applications, 229 (1999), pp. 184–211.
A. Brakhage, P. Werner: ‘Uber das dirichletsehe aussenraumproblem fur die Helmholtzsche Schwingungsgleichung’. In: Archive fur Mathematik 16 (1965), pp. 325–329.
A.J. Burton, G.F. Miller: ‘The application of integral equation methods to the numerical solution of some exterior boundary-value problems. A discussion on numerical analysis of partial differential equations’. In: Proceedings of the Royal Society Londo A 323, (1971), pp. 201–210.
W.C. Chew, J-M. Jin, E. Michielssen, J. Song: Fast and efficient algorithms in computational electromagnetics (Artech House antennas and propagation library, Norwood, 2001).
G.A. Kriegsmann, A. Taflove, K.R Umashankar: ‘A new formulation of electromagnetic wave scattering using the on-surface radiation condition method’. In: IEEE Transactions on Antennas and Propagation 35, (1987), pp.153–161.
V. Rokhlin: ‘Rapid solution of integral equations of scattering theory in two dimensions’. In: J. Comput. Phys., 86(2) (1990), pp. 414–439.
Y. Saad: Iterative Methods for Sparse Linear Systems (PWS Pub. Co., Boston, 1996).
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Antoine, X., Darbas, M. (2003). Generalized Brakhage-Werner Integral Formulations for the Iterative Solution of Acoustics Scattering Problems. In: Cohen, G.C., Joly, P., Heikkola, E., Neittaanmäki, P. (eds) Mathematical and Numerical Aspects of Wave Propagation WAVES 2003. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-55856-6_43
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DOI: https://doi.org/10.1007/978-3-642-55856-6_43
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