Application of rational function approximation technique to hybrid FE/BI/MLFMA for 3D scattering

A direct rational approximation method based on Thiele interpolating continued fractions theory is proposed for fast frequency sweep analysis of electromagnetic problems. And an adaptive algorithm is also formed. Compared with the conventional rational approximation method, the proposed method can get a rational approximation directly without a great number of matrix inverse computations and doesn't need to allocate much memory for high derivatives of the dense impedance matrix. Meanwhile, the computation of surface currents by continued fractions can be sped up as compared with the traditional rational approximation. Numerical simulations for broad band scattering analysis of different shaped objects are discussed to shown the effectiveness of the present method. Index Terms -Computational Electromagnetics, Thiele interpolating continued fractions, method of moments, fast frequency sweep analysis.

show abstract

Application of Interpolative Decomposition to FE-BI-MLFMA for Fast Computation of Monostatic Scattering from 3-D Complex Composite Objects

Gao

Hao

Pan

et al. 2014

Antennas Wirel. Propag. Lett.

View full text Add to dashboard Cite

Application of rational function approximation technique to hybrid FE/BI/MLFMA for 3D scattering

Cited by 5 publications

References 20 publications

Fast frequency sweep method for indirect boundary element models arising in acoustics

Fast frequency sweep method for indirect boundary element models arising in acoustics

Adaptive Frequency sweep analysis for electromagnetic problems using the Thiele interpolating continued fractions

Application of Interpolative Decomposition to FE-BI-MLFMA for Fast Computation of Monostatic Scattering from 3-D Complex Composite Objects

Contact Info

Product

Resources

About