Add to ORKGIn this contribution, we present a numerical implementation of recently developed potential integral equations (PIEs) by using nondirective stable plane wave multilevel fast multipole algorithm (NSPWMLFMA). The proposed method is efficient and accurate to solve large scattering problems involving perfectly conducting bodies with geometrical details, which require dense discretizations with respect to the operating wavelength. Numerical results in the form of scattered field from various objects are provided to assess the accuracy and efficiency of PIEs solved using NSPWMLFMA
We present the solution of extremely large electromagnetics problems formulated with surface integra...
Recently introduced incomplete tree structures for the magnetic-field integral equation are modified...
Accurate simulations of real-life electromagnetics problems with integral equations require the solu...
We present efficient and accurate solutions of scattering problems involving dense discretizations w...
We present stable solutions of low-frequency electromagnetic problems involving small objects and th...
A recently introduced potential integral equations for stable analysis of low-frequency problems inv...
A novel method, called the nondirective stable plane wave multilevel fast multipole algorithm (NSPWM...
We consider fast and accurate solutions of scattering problems involving increasingly large dielectr...
In this thesis, recently introduced potential-based formulations that are based on direct usage of m...
In recent years, the computational electromagnetics community has witnessed a rapid increase in the ...
We present fast and accurate solutions of large-scale scattering problems formulated with the combin...
A higher order multilevel fast multipole algorithm (MLFMA) is presented for solving integral equatio...
A higher-order multilevel fast multipole algorithm (MLFMA) for solving integral equations of electro...
We present fast and accurate solutions of large-scale scattering problems involving three-dimensiona...
In this paper, we present an accurate method of moments (MoM) solution of the combined field integra...
We present the solution of extremely large electromagnetics problems formulated with surface integra...
Recently introduced incomplete tree structures for the magnetic-field integral equation are modified...
Accurate simulations of real-life electromagnetics problems with integral equations require the solu...
We present efficient and accurate solutions of scattering problems involving dense discretizations w...
We present stable solutions of low-frequency electromagnetic problems involving small objects and th...
A recently introduced potential integral equations for stable analysis of low-frequency problems inv...
A novel method, called the nondirective stable plane wave multilevel fast multipole algorithm (NSPWM...
We consider fast and accurate solutions of scattering problems involving increasingly large dielectr...
In this thesis, recently introduced potential-based formulations that are based on direct usage of m...
In recent years, the computational electromagnetics community has witnessed a rapid increase in the ...
We present fast and accurate solutions of large-scale scattering problems formulated with the combin...
A higher order multilevel fast multipole algorithm (MLFMA) is presented for solving integral equatio...
A higher-order multilevel fast multipole algorithm (MLFMA) for solving integral equations of electro...
We present fast and accurate solutions of large-scale scattering problems involving three-dimensiona...
In this paper, we present an accurate method of moments (MoM) solution of the combined field integra...
We present the solution of extremely large electromagnetics problems formulated with surface integra...
Recently introduced incomplete tree structures for the magnetic-field integral equation are modified...
Accurate simulations of real-life electromagnetics problems with integral equations require the solu...