基于二次场二维起伏地形MT有限元数值模拟

基于二次场二维起伏地形MT有限元数值模拟

赵广茂，李桐林，王大勇，李建平

吉林大学地球探测科学与技术学院，长春 130026

收稿日期:2008-04-11 修回日期:1900-01-01 出版日期:2008-11-26 发布日期:2008-11-26
通讯作者: 赵广茂

Secondary FieldBased Two-Dimensional Topographic Numerical Simulation in Magnetotellurics by Finite Element Method

ZHAO Guang-mao, LI Tong-lin, WANG Da-yong, LI Jian-ping

College of GeoExploration Science and Technology，Jilin University, Changchun 130026, China

Received:2008-04-11 Revised:1900-01-01 Online:2008-11-26 Published:2008-11-26
Contact: ZHAO Guang-mao

摘要/Abstract

摘要： 通过计算二次场来进行二维大地电磁数值模拟；导出了二维大地电磁二次场的微分方程，利用有限单元法来解微分方程；对矩形网格进行对角线的二次剖分，更容易且真实地模拟起伏地形。对几个典型模型进行了试算，与前人总场法的计算结果做了比较，两者视电阻率曲线一致，证明本文算法是正确的；通过2个简单的算例说明复杂地表下2种极化模式的MT观测资料都有明显的异常，视电阻率在TM模式下比TE模式更易受地形影响，TE模式下视电阻率曲线形态与地形呈“正相关”，TM模式下反之。

关键词: 大地电磁场, 二次场, 起伏地形, 有限元法

Abstract: An efficient method has been presented which is named secondary field finite element method for two-dimentional magnetotelluric numerical modeling. The two-dimentional electromagnetic differential equations of secondary field have been derived, and the equations of secondary field can be solved by finite element method when the boundary conditions are simple; it is easier to simulate topographic earth by taking subdivision to the rectangle mesh. We have calculated several models and compared with previous researcher’s results using total field method. The results obtained indicated that the algorithm provided in this paper was correct. And it can be confirmed that the topographic abnormalities both in TE mode and TM mode are obvious. The apparent resistivity of H-polarization is affected by terrain more easily than that of E-polarization. The shape of apparent resistivity is positive correlation with terrain in TE mode, but that is opposite in TM mode.

Key words: magnetotelluric, secondary field, topographic, finite element method

中图分类号:

P631.325

赵广茂，李桐林，王大勇，李建平. 基于二次场二维起伏地形MT有限元数值模拟[J]. J4, 2008, 38(6): 1055-1059.

ZHAO Guang-mao, LI Tong-lin, WANG Da-yong, LI Jian-ping. Secondary FieldBased Two-Dimensional Topographic Numerical Simulation in Magnetotellurics by Finite Element Method[J]. J4, 2008, 38(6): 1055-1059.

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