DocumentCode
1967656
Title
Solution of the Tridiagonal Matrix System in ADI-FDTD
Author
Yuan, Zhiyong ; Li, Tun ; He, Jinliang ; Chen, Shuiming ; Zeng, Rong ; Zhang, Bo ; Gu, Shanqiang
Author_Institution
Dept. of Electr. Eng., Tsinghua Univ., Beijing
fYear
0
fDate
0-0 0
Firstpage
466
Lastpage
466
Abstract
The alternating-direction-implicit finite-difference time-domain method (ADI-FDTD) is considered as a very efficient algorithm. The key problem of the implementation of the ADI-FDTD method is to solve the tridiagonal matrix system. Two numerical algorithms for the tridiagonal matrix system are analyzed in detail in this paper. The interpretations for the stability of the algorithms are also given clearly
Keywords
finite difference time-domain analysis; matrix algebra; algorithms stability; alternating-direction-implicit-FDTD; finite-difference time-domain method; tridiagonal matrix system; Algorithm design and analysis; Books; Finite difference methods; Gaussian processes; Neural networks; Numerical stability; Power system transients; Stability analysis; Tellurium; Time domain analysis;
fLanguage
English
Publisher
ieee
Conference_Titel
Electromagnetic Field Computation, 2006 12th Biennial IEEE Conference on
Conference_Location
Miami, FL
Print_ISBN
1-4244-0320-0
Type
conf
DOI
10.1109/CEFC-06.2006.1633256
Filename
1633256
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