Parameters for calculation of three-dimensional electromagnetic field by asymptotic expansion method

Yuriy Vasetskyi, Iryna Mazurenko
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Abstract

The paper deals with an approximate analytical solution of a three-dimensional problem of the theory of electromagnetic field, which is based on the use of asymptotic expansion under the condition of a strong skin-effect for a field produced by a closed current-carrying loop located near a conducting half-space. It is noted that each member of an asymptotic series is determined with an error, the value of which depends on the value of a small parameter and increases with increasing the index of series member resulting in limited number of its members. It is identified that when using the method of asymptotic expansion, the number of members of a series can be limited by the relatively small number, which is determined by the specified limits of the allowable accuracy of calculation (relative error). The authors determine the optimal number of asymptotic series members, and indicate that calculation accuracy depends on the value of a small parameter, and for a specific conducting material it depends on the field frequency and the minimum distance from external field sources to a conducting body.
用渐近展开法计算三维电磁场的参数
本文涉及电磁场理论中一个三维问题的近似解析解,其基础是在位于导电半空间附近的闭合载流环产生的场的强趋肤效应条件下使用渐近展开法。据指出,渐近级数的每个成员都是通过误差确定的,误差值取决于一个小参数的值,并且随着级数成员指数的增加而增加,导致其成员数量有限。研究发现,在使用渐近展开法时,数列成员的数量会受到相对较小数量的限制,而这是由允许的计算精度(相对误差)的指定限制决定的。作者确定了渐近级数的最佳成员数,并指出计算精度取决于一个小参数的值,对于特定导电材料,它取决于场频率和外部场源到导电体的最小距离。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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