Cataloged from PDF version of article.An improved implementation of the magnetic-field integral equation (MFIE) is presented in order to eliminate some of the restrictions on the testing integral due to the singularities. Galerkin solution of the MFIE by the method of moments employing piecewise linear Rao–Wilton–Glisson basis and testing functions on planar triangulations of arbitrary surfaces is considered. In addition to demonstrating the ability to sample the testing integrals on the singular edges, a key integral is rederived not only to obtain accurate results, but to manifest the implicit solid-angle dependence of the MFIE as well
Basis functions with linear variations are investigated in terms of the accuracy of the magnetic fie...
Recent attention has been devoted to the development of nonconforming method-of-moment (MoM) impleme...
The inaccuracy of the classical magnetic field integral equation (MFIE) is a long-studied problem. W...
An improved implementation of the magnetic-field integral equation (MFIE) is presented in order to e...
Cataloged from PDF version of article.In the solution of the magnetic-field integral equation (MFIE...
Cataloged from PDF version of article.Divergence-conforming Rao-Wilton-Glisson (RWG) functions are c...
For electromagnetic analysis using method of moments (MoM), three-dimensional (3-D) arbitrary conduc...
The accuracy of the magnetic-field integral equation (MFIE) for the Method of Moments (MOM) and fast...
The RWG-discretization in Method of Moments (MoM) of the Magnetic-Field and Electric-Field Integral ...
We present the linear-linear (LL) basis functions to improve the accuracy of the magnetic-field inte...
A straightforward implementation of the magnetic field integral equation (MFIE) for perfect conducto...
In this thesis, the magnetic-field integral equation (MFIE) for three-dimensional perfectly conducti...
We present a novel numerical approach to design testing functions for the magnetic-field integral eq...
The integrals arising in magnetic field integral equation (MFIE) can become highly singular, renderi...
We present the linear-linear (LL) basis functions to improve the accuracy of the magnetic-field inte...
Basis functions with linear variations are investigated in terms of the accuracy of the magnetic fie...
Recent attention has been devoted to the development of nonconforming method-of-moment (MoM) impleme...
The inaccuracy of the classical magnetic field integral equation (MFIE) is a long-studied problem. W...
An improved implementation of the magnetic-field integral equation (MFIE) is presented in order to e...
Cataloged from PDF version of article.In the solution of the magnetic-field integral equation (MFIE...
Cataloged from PDF version of article.Divergence-conforming Rao-Wilton-Glisson (RWG) functions are c...
For electromagnetic analysis using method of moments (MoM), three-dimensional (3-D) arbitrary conduc...
The accuracy of the magnetic-field integral equation (MFIE) for the Method of Moments (MOM) and fast...
The RWG-discretization in Method of Moments (MoM) of the Magnetic-Field and Electric-Field Integral ...
We present the linear-linear (LL) basis functions to improve the accuracy of the magnetic-field inte...
A straightforward implementation of the magnetic field integral equation (MFIE) for perfect conducto...
In this thesis, the magnetic-field integral equation (MFIE) for three-dimensional perfectly conducti...
We present a novel numerical approach to design testing functions for the magnetic-field integral eq...
The integrals arising in magnetic field integral equation (MFIE) can become highly singular, renderi...
We present the linear-linear (LL) basis functions to improve the accuracy of the magnetic-field inte...
Basis functions with linear variations are investigated in terms of the accuracy of the magnetic fie...
Recent attention has been devoted to the development of nonconforming method-of-moment (MoM) impleme...
The inaccuracy of the classical magnetic field integral equation (MFIE) is a long-studied problem. W...