论文信息 - Finite-difference time-domain algorithm for solving Maxwell's equations in rotationally symmetric geometries

Finite-difference time-domain algorithm for solving Maxwell's equations in rotationally symmetric geometries

In this paper, an efficient finite-difference time-domain algorithm (FDTD) is presented for solving Maxwell's equations with rotationally symmetric geometries. The azimuthal symmetry enables us to employ a two-dimensional (2-D) difference lattice by projecting the three-dimensional (3-D) Yee-cell in cylindrical coordinates (r, /spl phi/, z) onto the r-z plane. Extensive numerical results have been derived for various cavity structures and these results have been compared with those available in the literature. Excellent agreement has been observed for all of the cases investigated.

[1] F. Harris. On the use of windows for harmonic analysis with the discrete Fourier transform , 1978, Proceedings of the IEEE.

[2] K. Yee. Numerical solution of initial boundary value problems involving maxwell's equations in isotropic media , 1966 .

[3] D. Mirshekar-Syahkal,et al. Accurate determination of modes in dielectric-loaded cylindrical cavities using a one-dimensional finite element method , 1989 .

[4] N. Marcuvitz. Radial transmission lines , 1987 .

[5] Raj Mittra,et al. A study of the nonorthogonal FDTD method versus the conventional FDTD technique for computing resonant frequencies of cylindrical cavities , 1992 .

[6] Darko Kajfez,et al. Analysis of dielectric resonator cavities using the finite integration technique , 1989 .