摘要
针对具有场域结构对称,场分布不对称特征的工程类问题,提出新型有限元降阶技术.该技术可将N阶有限元方程降阶为2个具有相同刚度矩阵的0.5N阶有限元方程,大大节省了计算机内存空间和CPU时间.为了提高计算的准确性,采用负载法计算稳态参数.该方法不仅考虑了实际工况下磁性材料的饱和情况,同时也考虑了d、q轴之间磁场的相互作用.文章还处理非线性收敛问题以及嵌套迭代收敛问题,收敛速度明显提高.最后给出了应用实例及计算结果,与试验值相比吻合较好.
The paper presents a new ranks reduction approach of FEM for the problem with symmetrical geometry and asymmetrical field distribution. By this approach, N ranks FE equation can be transformed into two FE equations with about 0 5N ranks. Therefore, both storage capacity and CPU time may be saved significantly. The steady state parameters are calculated by loading method, which takes the magnetic saturation and the interaction of d and q axes magnetic fields into consideration. The convergence problem caused by nonlinear and overlap iteration has been treated,which leads to the convergence rate to increase obviously. Finally,a calculation example is given. There exists a close agreement between the numerical calculations and experimental results.
出处
《西安交通大学学报》
EI
CAS
CSCD
北大核心
1996年第11期33-38,共6页
Journal of Xi'an Jiaotong University
