Closed-form expressions for the numerical errors caused by finite-element discretization of problems involving materials of biaxial permittivity and permeability tensors are developed. In particular, we derive expressions for the numerical dispersion and reflection in both first-order node and edge basis function finite-element formulations in an equilateral triangular mesh. Results using these closed-form expressions are compared to practical numerical simulations. The application of these expressions to the analysis of the performance of the perfectly matched layer boundary is suggeste
Abstract- The perfectly matched layer boundary con-dition is incorporated into the beam propagation ...
There are many methods for truncating finite element (FE) meshes for unbounded problems. Among them...
In chapter (1) we present numerical simulations of the eigenstates of a MBS-model (Multi-Body-System...
Abstract—Closed-form expressions for the numerical errors caused by finite-element discretization of...
The application of integrated optics has broadened from well established areas, such as high-speed m...
Numerical errors encountered when using the perfectly matched layer (PML) absorbing boundary conditi...
The perfectly matched layer (PML) has recently been introduced by Berenger as a material absorbing b...
The paper offers a comparative study of numerical methods of analysis of electromagnetic fields. The...
Este trabalho desenvolve um formalismo para analisar a propagação de ondas em guias de onda dielétri...
A numerical dispersion analysis for the finite-element (FE) method in time domain (TD) is presented....
An edge based finite element formulation with vector absorbing boundary conditions is presented for ...
The paper offers a comparative study of numerical methods of analysis of electromagnetic fields. The...
Abstract The multiaxial perfectly matched layer (M-PML) is a stable and effective nonreflecting boun...
In this paper, we present a detailed theoretical and numerical investigation of the perfectly matche...
This dissertation aims at developing sophisticated finite-element based numerical algorithms for eff...
Abstract- The perfectly matched layer boundary con-dition is incorporated into the beam propagation ...
There are many methods for truncating finite element (FE) meshes for unbounded problems. Among them...
In chapter (1) we present numerical simulations of the eigenstates of a MBS-model (Multi-Body-System...
Abstract—Closed-form expressions for the numerical errors caused by finite-element discretization of...
The application of integrated optics has broadened from well established areas, such as high-speed m...
Numerical errors encountered when using the perfectly matched layer (PML) absorbing boundary conditi...
The perfectly matched layer (PML) has recently been introduced by Berenger as a material absorbing b...
The paper offers a comparative study of numerical methods of analysis of electromagnetic fields. The...
Este trabalho desenvolve um formalismo para analisar a propagação de ondas em guias de onda dielétri...
A numerical dispersion analysis for the finite-element (FE) method in time domain (TD) is presented....
An edge based finite element formulation with vector absorbing boundary conditions is presented for ...
The paper offers a comparative study of numerical methods of analysis of electromagnetic fields. The...
Abstract The multiaxial perfectly matched layer (M-PML) is a stable and effective nonreflecting boun...
In this paper, we present a detailed theoretical and numerical investigation of the perfectly matche...
This dissertation aims at developing sophisticated finite-element based numerical algorithms for eff...
Abstract- The perfectly matched layer boundary con-dition is incorporated into the beam propagation ...
There are many methods for truncating finite element (FE) meshes for unbounded problems. Among them...
In chapter (1) we present numerical simulations of the eigenstates of a MBS-model (Multi-Body-System...