Title :
Lossy parallel-plate line analysis using an unconditionally stable compact method
Author :
Shao, Wei ; Wang, Bing-Zhong ; Liu, Hui-Lai
Author_Institution :
Inst. of Appl. Phys., Univ. of Electron. Sci. & Technol. of China, Chengdu
Abstract :
An unconditionally stable time-domain method with reduced grid size is proposed to deal with Maxwell´s differential equations. The proposed method uses Yee´s finite difference scheme in the space domain, and expands electromagnetic fields in a series of basis functions and treats them in a moment method procedure in the time domain. We use triangle basis functions and Galerkin´s testing procedure to get an implicit formulation. At the same time, the analytical nature of the fields along the wave propagation direction is taken into consideration and the grid size can be greatly reduced. Compared with the traditional finite-difference time-domain (FDTD) method, the propose method notably improves computational efficiency
Keywords :
Galerkin method; Maxwell equations; differential equations; electromagnetic field theory; electromagnetic wave propagation; finite difference methods; method of moments; time-domain analysis; transmission line theory; Galerkin testing procedure; Maxwell differential equations; Yee finite difference scheme; basis functions; electromagnetic fields; finite-difference time-domain method; lossy parallel-plate line analysis; moment method procedure; reduced grid size; space domain; triangle basis functions; unconditionally stable compact method; unconditionally stable time-domain method; wave propagation direction; Differential equations; Finite difference methods; Moment methods; Physics; Space technology; Sparse matrices; Stability; Testing; Time domain analysis; Transmission line matrix methods;
Conference_Titel :
Antennas and Propagation Society International Symposium 2006, IEEE
Conference_Location :
Albuquerque, NM
Print_ISBN :
1-4244-0123-2
DOI :
10.1109/APS.2006.1710760
