Generalized Minimal Residual Iteration Method for Finite Element Based Domain Decomposition Technique for Electric Field Problem

被引：0

作者：

Tao R. ^{[1
]}

Wang Z. ^{[1
]}

机构：

[1] Beijing Key Laboratory of High Voltage and Electromagnetic Compatibility, North China Electric Power University, Beijing

来源：

Diangong Jishu Xuebao/Transactions of China Electrotechnical Society | 2018年 / 33卷 / 02期

关键词：

Domain decomposition method; Electric field; Finite element method; Generalized minimal residual method;

D O I：

10.19595/j.cnki.1000-6753.tces.161575

中图分类号：

学科分类号：

摘要：

Based on the idea of finite element method, the three-dimensional multi-scale model is calculated by domain decomposition method, in other words, using domain decomposition method to decompose the domain of original problem into micro-model and macro-model and solving sub-domain problem separately by finite element method. In this way, the calculation results of micro-model and macro-model are both obtained under the condition of limited computing resources. In view of slow rate of convergence of domain decomposition iterative algorithm, the generalized minimal residual (GMRES) iterative algorithm for domain decomposition method is derived without coefficient matrix. Specifically, the coefficient matrix of linear equations can't be given literally. Compared with 2-D finite element method, the correctness of the generalized minimal residual iteration algorithm is proved and this algorithm can be used to calculate the ground current field of high voltage direct current (HVDC), the results of electric field distribution near and far from the ground electrode are both obtained. © 2018, Electrical Technology Press Co. Ltd. All right reserved.

引用

页码：225 / 231

页数：6

共 20 条

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