Characteristic Basis Function Method Combined with Calder\'{o}n Multiplicative Preconditioner for PMCHWT Formulation

TL;DR

This paper introduces a new characteristic basis function method combined with Calderón multiplicative preconditioning for efficient dielectric scattering analysis, improving convergence and computational speed over traditional methods.

Contribution

The paper presents a novel basis function approach using SVD-orthogonalized currents combined with Calderón preconditioning to enhance dielectric scattering simulations.

Findings

The proposed method matches conventional results accurately.

It demonstrates faster computation times.

It effectively prevents poor convergence issues.

Abstract

We propose a novel characteristic basis function method for analyzing the scattering by dielectric objects based on the Poggio-Miller-Chang-Harrington-Wu-Tsai formulation. In the proposed method, the electric and magnetic currents are orthogonalized with the help of the singular value decomposition, and are used as dual basis functions in a way similar to the RWG and BC basis functions. We show that the use of the Calder\'{o}n multiplicative precondtioner together with the proposed method can prevent from the poor convergence of the solution of the matrix equation in problems involving dielectrics. We considered three different shapes of dielectric scatterers for the purpose of validation. The numerical results agreed well with those obtained by the conventional method of moments and the proposed method was faster than the conventional method. These results indicate that the proposed method is effective for scattering analysis of the dielectrics.