Title :
Stability and fidelity of the finite element time domain method with distorted mesh
Author :
Butrylo, Boguslaw ; Vollaire, Christian ; Nicolas, Laurent
Author_Institution :
Dept. of Theor. Electrotechnics & Metrol., Bialystok Tech. Univ., Poland
fDate :
3/1/2004 12:00:00 AM
Abstract :
Properties of the three-dimensional formulation of the finite element time domain algorithm for the wave equation are analyzed. First-order edge elements are implemented in the formulation. Several issues associated with deformation of the structured mesh and efficiency of the time integration scheme are presented. The convergence and stability of the time domain algorithm depending on the spatial discretization are discussed. The numerical accuracy of the simulation is studied.
Keywords :
integration; mesh generation; numerical stability; time-domain analysis; wave equations; convergence; distorted mesh; fidelity; finite element time domain; first-order edge elements; spatial discretization; stability; structured mesh; three-dimensional formulation; time domain algorithm; time integration; wave equation; Algorithm design and analysis; Boundary conditions; Computational modeling; Convergence; Differential equations; Finite element methods; Numerical models; Partial differential equations; Stability analysis; Time domain analysis;
Journal_Title :
Magnetics, IEEE Transactions on
DOI :
10.1109/TMAG.2004.825426
