The three-dimensional scattering by rough surfaces is analyzed using a combined steepest descent-fast multipole method algorithm (SDFMM) technique. The feature of this approach are: advantage is taken of the fact that a rough surface is nearly planar to derive efficient numerical integration rules for the Sommerfield integral representation of the free space Green's function; the Hankel functions arising in such an integration are evaluated using a Fast Multiple Method (FMM)-like algorithm that is tailored towards rough surfaces; and the proposed algorithm has O(N) CPU time and storage requirements. The technique is numerically rigorous and its accuracy can be controlled as desired.link_to_subscribed_fulltex
This paper reviews the state of the art in fast integral equation techniques for solving large scale...
In this paper, we present an accurate method of moments (MoM) solution of the combined-field integra...
The electromagnetic (EM) scattering from three-dimensional (3D) conducting bodies has been studied. ...
A new technique, the steepest descent-fast multipole method (SDFMM), is developed to efficiently ana...
A novel multilevel algorithm to analyze scattering from dielectric random rough surfaces is presente...
The applicability of the steepest descent fast multipole method (SDFMM) to the analysis of scatterin...
A fast algorithm for reconstructing the profile of random rough surfaces using electromagnetic scatt...
A novel algorithm for accelerating the iterative solution of integral equations governing scattering...
Electromagnetic propagation and scattering problems are important in many application areas such as ...
The fast multipole method (FMM) speeds up the matrix-vector multiply in the conjugate gradient metho...
Recently, a set of novel, grid-robust, higher-order vector basis functions were proposed for the met...
A higher order multilevel fast multipole algorithm (MLFMA) is presented for solving integral equatio...
96 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2002.Recent advances in the develop...
In this paper, we present an accurate method of moments (MoM) solution of the combined field integra...
Steepest descent fast multipole method (SDFMM) is applied to the full-wave analysis of microstrip st...
This paper reviews the state of the art in fast integral equation techniques for solving large scale...
In this paper, we present an accurate method of moments (MoM) solution of the combined-field integra...
The electromagnetic (EM) scattering from three-dimensional (3D) conducting bodies has been studied. ...
A new technique, the steepest descent-fast multipole method (SDFMM), is developed to efficiently ana...
A novel multilevel algorithm to analyze scattering from dielectric random rough surfaces is presente...
The applicability of the steepest descent fast multipole method (SDFMM) to the analysis of scatterin...
A fast algorithm for reconstructing the profile of random rough surfaces using electromagnetic scatt...
A novel algorithm for accelerating the iterative solution of integral equations governing scattering...
Electromagnetic propagation and scattering problems are important in many application areas such as ...
The fast multipole method (FMM) speeds up the matrix-vector multiply in the conjugate gradient metho...
Recently, a set of novel, grid-robust, higher-order vector basis functions were proposed for the met...
A higher order multilevel fast multipole algorithm (MLFMA) is presented for solving integral equatio...
96 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2002.Recent advances in the develop...
In this paper, we present an accurate method of moments (MoM) solution of the combined field integra...
Steepest descent fast multipole method (SDFMM) is applied to the full-wave analysis of microstrip st...
This paper reviews the state of the art in fast integral equation techniques for solving large scale...
In this paper, we present an accurate method of moments (MoM) solution of the combined-field integra...
The electromagnetic (EM) scattering from three-dimensional (3D) conducting bodies has been studied. ...