Add to ORKGA modified set of Maxwell's equations is presented that includes complex coordinate stretching along the three Cartesian coordinates. The added degrees of freedom in the modified Maxwell's equations allow the specification of absorbing boundaries with zero reflection at all angles of incidence and all frequencies. The modified equations are also related to the perfectly matched layer that was presented recently for 2D wave propagation. Absorbing-material boundary conditions are of particular interest for finite-difference time-domain (FDTD) computations on a single-instruction multiple-data (SIMD) massively parallel supercomputer. A 3D FDTD algorithm has been developed on a connection machine CM-5 based on the modified Maxwell's equations a...
In this paper, we propose and discuss efficient GPU implementation techniques of absorbing boundary ...
This paper developed a non - split perfectly matched layer (PML) boundary condition (BC) for Finite ...
This paper developed a non - split perfectly matched layer (PML) boundary condition (BC) for Finite ...
Key Terms Maxwells equations coordinate stretching perfectly matched layer nite dierence time do...
The Perfectly Matched Layer (PML) absorbing boundary condition has shown to be an extremely efficien...
The use of perfectly matched layers (PML) has recently been introduced by Berenger as a material abs...
The use of perfectly matched layers (PML) has recently been introduced by Berenger as a material abs...
We present two novel, fully three-dimensional (3-D) finite-difference time-domain (FDTD) schemes in ...
This thesis presents novel concepts for electromagnetic field simulations via partial differential e...
In this paper we propose a geometric formulation to solve 3D electromagnetic wave problems in unboun...
In this paper we propose a geometric formulation to solve 3D electromagnetic wave problems in unboun...
The application of the Finite Difference Time Domain (FDTD) method to open region radiation problems...
The application of the Finite Difference Time Domain (FDTD) method to open region radiation problems...
Three-dimensional (3-D) finite-difference time-domain (FDTD) schemes for transient simulation of ele...
In this paper, we present three-dimensional finite-difference time-domain (FDTD) algorithms for tran...
In this paper, we propose and discuss efficient GPU implementation techniques of absorbing boundary ...
This paper developed a non - split perfectly matched layer (PML) boundary condition (BC) for Finite ...
This paper developed a non - split perfectly matched layer (PML) boundary condition (BC) for Finite ...
Key Terms Maxwells equations coordinate stretching perfectly matched layer nite dierence time do...
The Perfectly Matched Layer (PML) absorbing boundary condition has shown to be an extremely efficien...
The use of perfectly matched layers (PML) has recently been introduced by Berenger as a material abs...
The use of perfectly matched layers (PML) has recently been introduced by Berenger as a material abs...
We present two novel, fully three-dimensional (3-D) finite-difference time-domain (FDTD) schemes in ...
This thesis presents novel concepts for electromagnetic field simulations via partial differential e...
In this paper we propose a geometric formulation to solve 3D electromagnetic wave problems in unboun...
In this paper we propose a geometric formulation to solve 3D electromagnetic wave problems in unboun...
The application of the Finite Difference Time Domain (FDTD) method to open region radiation problems...
The application of the Finite Difference Time Domain (FDTD) method to open region radiation problems...
Three-dimensional (3-D) finite-difference time-domain (FDTD) schemes for transient simulation of ele...
In this paper, we present three-dimensional finite-difference time-domain (FDTD) algorithms for tran...
In this paper, we propose and discuss efficient GPU implementation techniques of absorbing boundary ...
This paper developed a non - split perfectly matched layer (PML) boundary condition (BC) for Finite ...
This paper developed a non - split perfectly matched layer (PML) boundary condition (BC) for Finite ...