Title :
An algebraic preconditioner based on properties of the skew-hermitian part of the linear systems arising from the discretization of the e-field integral equation
Author :
Angiulli, G. ; Quattrone, P. ; Tringali, S.
Author_Institution :
Dipt. di Inf., Mat., Elettron. e Trasporti, Univ. degli Studi Mediterranea di Reggio Calabria, Reggio Calabria, Italy
Abstract :
It is well established in literature that the rate of convergence of the Generalized Minimum Residual Method (GMRES), when it is applied to the solution of the (generally dense and unstructured) linear systems of equations coming out from the discretization process of the Electrical Field Integral Equation (EFIE) through the Method of Moments (MoM), can be significantly improved by a suitable preconditioning strategy. Along those lines the present paper inquiries the advantages of employing an easy-to-build algebraic preconditioner based on some expected properties of the skew-Hermitian part S of the MoM impedance matrix Z. Some numerical results are presented in order to evaluate its performances and numerically validate the proposed approach.
Keywords :
Hermitian matrices; electric field integral equations; electromagnetic wave scattering; impedance matrix; method of moments; MoM impedance matrix; algebraic preconditioner; e-field integral equation discretization; electromagnetic scattering phenomena; generalized minimum residual method; method-of-moments; skew-Hermitian linear system; Convergence; Electromagnetic scattering; Impedance; Integral equations; Iterative methods; Linear systems; Mathematical model; Moment methods; Performance evaluation; Physics computing;
Conference_Titel :
Electromagnetics in Advanced Applications, 2009. ICEAA '09. International Conference on
Conference_Location :
Torino
Print_ISBN :
978-1-4244-3385-8
Electronic_ISBN :
978-1-4244-3386-5
DOI :
10.1109/ICEAA.2009.5297269
