一阶无穷小线段, 线积分, 二阶无穷小精度, 旋度, 电磁场切向边值关系理论," /> 一阶无穷小线段, 线积分, 二阶无穷小精度, 旋度, 电磁场切向边值关系理论,"/> 电磁场切向边值关系的严密数学理论

大学物理 ›› 2019, Vol. 38 ›› Issue (11): 3-.doi: 10.16854 / j.cnki.1000- 0712.180704

• 教学研究 • 上一篇    下一篇

电磁场切向边值关系的严密数学理论

罗凌霄   

  1. 大理大学工程学院,云南大理671003
  • 收稿日期:2019-01-02 修回日期:2019-02-15 出版日期:2019-11-20 发布日期:2019-12-19
  • 作者简介:罗凌霄( 1964—) ,男,白族,云南剑川人,大理大学工程学院教授,主要从事电磁场理论和数学场论的研究工作.

Strict mathematical theory of tangential boundary value relationship of electromagnetic field

LUO Ling-xiao   

  1. Faculty Engineering,Dali University,Dali,Yunnan 671003,China
  • Received:2019-01-02 Revised:2019-02-15 Online:2019-11-20 Published:2019-12-19

摘要: 阐述了矢量场沿一阶无穷小线段的线积分虽然也是一阶无穷小量,但特殊情况下要求计算精度必须达到二阶无穷小量,为此目的需要把一阶无穷小线段分成无穷多个二阶无穷小线元来计算线积分,并且给出如此计算所得结果遵循的规律,即二阶无穷小精度下矢量场沿一阶无穷小线段的线积分定理.最后介绍了这个定理在旋度理论和电磁场切向边值关系理论中的应用.

关键词: 一阶无穷小线段')">一阶无穷小线段, 线积分, 二阶无穷小精度, 旋度, 电磁场切向边值关系理论

Abstract: This paper expounds though the line integral that the vector field along the first-order infinitesimal line is also the first-order dimensionless,but in particular cases demand the computational accuracy must achieve the second-order dimensionless. For this purpose,we need to divide the first-order infinitesimal line segment into infinitely many second-order infinitesimal line element to calculate the line integral,and give the law that followed by the result that obtained through such calculation: the theorem of vector field along first-order infinitesimal line segment’s line integral under second-order infinitesimal accuracy. We introduce application of this theorem in curl theory and in the theory of electromagnetic field tangential boundary value relations.

Key words: the first-order infinitesimal line segment, line integral, the second-order infinitesimal accuracy, curl theory, theory of electromagnetic field tangential boundary value relations