zhangyb_hust 发表于 2017-9-20 11:06:10

材料各向异性的导热系数定义

材料各向异性的导热系数定义,如图所示一环形材料,沿环形材料的导热系数为A, 垂直环形的截面导热系数为B,这个定义如何实现?
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

jiabeiwenwu 发表于 2017-10-23 23:58:07

没有看到插图,不明白你的意思。各向异性导热系数在physics那里面选择就好了,在region的boundary下的physics condition里设置。

chong2 发表于 2017-10-28 21:40:33

楼主这是要定义电机定子铁芯的导热系数吗?楼上说的方法是正解。

zhangyb_hust 发表于 2017-11-23 15:18:18

自己已经解决,其实是想问电机内绕组导热系数如果设定,绕组由绕组槽部与端部构成,形状呈环形,而且导热系数是各向异性
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查看完整版本: 材料各向异性的导热系数定义