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1.
Summary Using the results of spherical harmonic analyses of the geomagnetic field for some fourteen different epochs, includingGauss' first analysis for epoch 1835, and theErman-Petersen analysis for epoch 1829, the strength and axes of geomagnetic multipoles have been computed. In particular, a dipole from the three first order spherical harmonic coefficients, a quadrupole from five second order coefficients, and an octupole from seven third order coefficients. The axes of the quadrupole and octupole have moved quite rapidly when compared with movements of the dipole axis, and show a general movement westwards. Although the strength of the dipole has generally diminished, the strengths of the quadrupole and octupole have generally increased.On leave National University of La Plata, Argentina 相似文献
2.
R. Thompson 《Physics of the Earth and Planetary Interiors》1984,36(1):61-77
Spherical harmonic coefficients of the geomagnetic field, calculated from historical observations of declination, inclination and intensity, and from archaeomagnetic inclination results, have been used to produce a film of geomagnetic change since 1600 A.D. The non-dipole geomagnetic field is found to be constantly changing: no fixed or standing non-dipole features are observed. Non-dipole foci are seen to have lifetimes of a few hundred years. The westward drift, which was an important feature of the 18th and early 19th century geomagnetic field, was less pronounced in the 17th century. The growth, evolution, decay and replacement of non-dipole foci, but not their movement are found to have been the major features producing century-long secular directional magnetic variation. Most of the low degree and order spherical harmonic coefficients have changed significantly over the last few hundred years. In particular the change in sign of the axisymmetric quadrupole around 1837 A.D. is noted. Sustained, century-long, intensity changes, however, appear to have been dominated by variations in the intensity of the centred dipole, rather than by non-dipole field fluctuations. 相似文献
3.
Denis E. Winch 《Pure and Applied Geophysics》1967,68(1):90-102
Summary The notion of a dipole is generalized to the case of the fifth order spherical harmonic coefficients of the geomagnetic potential. The corresponding five axes and fifth order multipole strength are computed for ten epochs in the interval 1845 to 1965. 相似文献
4.
Summary From a smooth series of spherical harmonic coefficients for the geomagnetic potential, the corresponding multipole parameters have been calculated for five epochs from 1942.5 until 1962.5, at five year intervals. Changes in multipole parameters are discussed in relation to the secular variation field and to theSchmidt eccentric dipole. 相似文献
5.
S. V. Starchenko 《Geomagnetism and Aeronomy》2011,51(3):409-414
The large-scale harmonic magnetic-convective sources of the main geomagnetic field in the Earth’s core have been determined
for the first time. The determination is based on a complete system of eigenfunctions of the magnetic diffusion equation in
a homogeneously conducting sphere, which is surrounded by an insulator. The sources of the main geomagnetic field observed,
which is responsible for the distribution of the electric currents generating this field in the core, are expressed in terms
of large-scale eigenfunctions. In this case, the dipole sources are directly related to the observed geomagnetic dipole, whereas
the quadrupole sources are related to the quadrupole, etc. The time variations in the obtained sources are responsible for
individual spatiotemporal features in the generation or suppression of each Gaussian component of the observed geomagnetic
field. When the commonly accepted observational international geomagnetic reference field (IGRF) models were used to partially
reveal these time variations, it became possible to specify the estimate of the Earth’s core conductivity and determine the
minimum period that can separate us from the commencement of further inversion or excursion. 相似文献
6.
P. Márton 《Pure and Applied Geophysics》1970,81(1):163-176
Summary Recently excellent archeomagnetic data sequences have been bublished from several parts of the world. Using these sequences, an attempt is made to trace the secular variation of the virtual geomagnetic dipole field characterized by the three first order spherical harmonic coefficients
. The archeomagnetic data (declination, inclination and total intensity) are transformed into the first order coefficients mentioned by a simple mathematical method. The secular variations of these coefficients, however, contain both dipole and non-dipole components. The separation of these is also attempted.Paper presented at the IAGA Symposium, Madrid, September 1969. 相似文献
7.
8.
根据2003年中国地磁观测数据(包括135年地磁测点和35个地磁台)以及我国邻近地区38个IGRF计算点的地磁数据,计算中国地磁异常场的分布。选取两种地磁场模型作为地磁正常场,一是国际参考地磁场的球谐模型,二是中国地磁场泰勒多项式模型。根据各个测点的地磁异常值(观测值减去模型计算值),用球冠谐分析方法计算地磁异常场的球冠谐模型,并绘制2003年中国地磁异常(△D,△I,△F,△X,△Y,△Z)。分析和讨论了中国地磁异常场。 相似文献
9.
根据青藏高原地磁三分量绝对测量资料,使用泰勒多项式方法和冠谐分析方法,计 算了青藏高原地磁场(X, Y,Z )的泰勒多项式模型和青藏高原地磁剩余场(△X,△Y,△Z)的冠谐 模型,并绘制了相应的理论地磁图.分析了磁异常点对地磁场模型的影响,对比分析了地磁 场的多项式模型和冠谐模型,讨论了地磁场模型的边界效应问题. 相似文献
10.
2009年12月,国际地磁学与高空物理学协会(IAGA)发布了第11代国际地磁参考场(IGRF-11)。第11代IGRF包括1900.0-2010.0年代(间隔为5年)共23个地磁模型与2010.0---2015.0年代地磁长期变化的预测模型,其中1900.0-1995.0年代模型的阶次为N=M=10,相应球谐系数的精度为lnT;2000.0—2010.0年代模型的阶次为N=M=13,其球谐系数的精度为0.1nT;而2010.0—2015.0年代地磁长期变化预测模型的阶次为N=M=8,其球谐系数的精度为0.1nT。本文概述了第11代国际地磁参考场及其2010.0年代地磁模型与2010.0--2015.0年代地磁长期变化的预测模型。 相似文献
11.
通过对欧洲及其邻近地区 MAGSAT 卫星黎明资料进行了处理,得到1°×1°卫星磁异常网格值。本文使用冠谐分析方法,计算该地区卫星矢量磁异常(ΔX,ΔY,ΔZ)冠谐模型。球冠极点位于33°N和26°E,球冠半角为40°.冠谐模型的截断指数为18。根据卫星磁异常冠谐模型和地磁场球谐模型 DGRF1980,计算卫星总强度磁异常(ΔF)的冠谐一球谐模型。根据卫星磁异常的理论模型,计算并绘制不同高度(300,400,500km)的理论卫星磁异常图。对冠谐模型和大磁异常进行了分析和讨论。 相似文献
12.
中国地区地磁场的球冠谐和分析 总被引:12,自引:11,他引:12
本文根据中国及其邻近地区的地磁三分量绝对测量资料,利用球冠谐和分析方法,计算出中国地区地磁剩余场的冠谐模型,地磁剩余场△X,△Y,△Z的模型均方根偏差分别为106.9,89.7,137.6 nT.提出由地磁场的国际参考地磁场和地磁剩余场的冠谐模型组成的联合模型作为中国参考地磁场的模型,它能较好地表示中国地磁场的分布.以地磁场的联合模型为正常背景场,计算出三分量磁异常的冠谐模型,并分析了磁异常的基本特征,它将为深入研究中国岩石层结构提供新证据. 相似文献
13.
根据1936年中国东部和中部地区的地磁测量资料,以及国际地磁参考场DGRF1935和DGRF1940,用冠谐分析方法计算1936年中国地磁参考场(CGRF)的冠谐模型. 冠谐模型的截断阶数为8,球冠极位于36°N和104°E,球冠半角为30°.CGRF1936比相应的国际地磁参考场能更好地表示中国地磁场的分布,本文计算的冠谐模型的均方偏差分别为104.9 nT(X分量),84.8 nT(Y分量)和121.1 nT(Z分量). 根据地磁场的冠谐模型,绘制1936年中国地磁图(X,Y,Z,F)和异常磁场图(ΔX,ΔY,ΔZ,ΔF). 相似文献
14.
根据1998~2000年完成的118个地磁测点 和39个地磁台的三分量绝对测量资料以及IGRF2000,计算2000年中国地磁场冠谐模型(截断 阶数为8),以及2000~2005年中国地磁长期变化冠谐模型(截断阶数为6). 球冠极位于36 °N,104°E,球冠半角为30°. 中国地磁场冠谐模型能更好地表示我国地磁场的时空变化 ,地磁场模型的均方偏差为:104.4 nT(X分量),103.3 nT(Y分量),123.9 nT(Z分量). 依据地磁场及其长期变化的冠谐模型,分别绘制2000年中国地磁图(F,X,Y,Z)和异常磁场图(ΔF,ΔX,ΔY,ΔZ),以及2000~2005年地磁长期变化图(F,X,Y,Z). 指出改善地磁场模型边界效应 的途径,并对如何布设地磁复测点提出了建议. 相似文献
15.
根据中国、前苏联和蒙古等地区的地磁复测点和地磁台站资料,使用泰勒多项式方法和冠谐分析方法,计算东亚地磁场(X,Y,Z)的泰勒多项式模型和冠谐模型,以及东亚剩余磁场(ΔX,ΔY,ΔZ)的冠谐模型和泰勒多项式模型,并绘制了相应的理论地磁图. 泰勒多项式模型的展开原点位于45°N和100°E,截断阶数为7.地磁场泰勒多项式模型的均方偏差为:X分量是133.0nT,Y分量是107.4nT,Z分量是14.0nT. 球冠极点位于45°N和100°E,球冠半角为42°,冠谐模型的截断阶数为10. 剩余磁场冠谐模型的均方偏差分别为131.2nT(ΔX),112.6nT(ΔY)和13.7nT(ΔZ). 对比分析了上述两种模型. 提出了确定区域模型截断阶数的判据. 相似文献
16.
An analytical expression is derived for the cutoff rigidity of cosmic rays arriving at a point in an arbitrary direction, when the main geomagnetic field is approximated by that of an eccentric dipole. This expression is used to determine changes in geomagnetic cutoffs due to secular variation of the geomagnetic field since 1835. Effects of westward drift of the quadrupole field and decrease in the effective dipole moment are seen in the isorigidity contours. On account of the immense computer time required to determine the cutoff rigidities more accurately using the particle trajectory tracing technique, the present formulation may be useful in estimating the transmission factor of the geomagnetic field in cosmic ray studies, modulation of cosmogenic isotope production by geomagnetic secular variation, and the contribution of geomagnetic field variation to long term changes in climate through cosmic ray related modulation of the current flow in the global electric circuit. 相似文献
17.
Magnetospheric contributions to geomagnetic daily variations 总被引:1,自引:0,他引:1
N. Olsen 《Annales Geophysicae》1996,14(5):538-544
The contribution of magnetospheric current systems to geomagnetic daily variations is analyzed by means of a spherical harmonic analysis (SHA) using elementary models as well as the Tsyganenko model of the magnetosphere. It is discovered that the magnetospheric contribution to some SHA coefficients is much higher than the known average value of about 20%, especially when considering non-local time terms and solstitial conditions. 相似文献
18.
计算震磁背景场的数学方法 总被引:2,自引:2,他引:0
安振昌 《地震地磁观测与研究》2000,21(5):9-15
如何计算地磁场 (或地磁剩余场 )及其长期变化的趋势变化 ,是提取震磁异常的关键。文章简要介绍了计算震磁背景场的数学方法 :多项式方法、球冠谐和分析方法、矩谐分析方法和曲面样条函数方法 相似文献
19.
The specific features of the spatial structure and time dynamics of the main geomagnetic field during the 20th century, proceeding
from the present-day concepts of geomagnetic jerks have been studied. The variations, caused by global dissipation of the
geomagnetic field dipole part, have been separated from the regional variations, described by nondipole spatial harmonics
of the spherical harmonic expansion series. It has been indicated that the geomagnetic field westward drift manifests itself
in a limited region of the Earth’s surface, forming the known Brazil anomaly. However, the drift component in the variations
in the geomagnetic field morphological structures is globally found out during the considered almost 100-year period along
the narrow belt around the geomagnetic axis. However, this drift is northwestward in the Northern Hemisphere, and the structures
drift southeastward in the Southern Hemisphere. The detected variations of the drift nature are reflected in the variations
in the integral geomagnetic characteristic, when changes in the position of the Earth’s magnetic center are considered. The
direct correlation between the global geomagnetic variations of the drift nature and the trend variations in the orientation
of the vector of the Earth daily rotation velocity has been detected. 相似文献
20.
A simple method for obtaining a space-time model of the main magnetic field from the high-precision satellite survey data is described. At the first stage, the CHAMP satellite data for one-day interval are expanded into the spherical harmonics with constant coefficients. This yields a set of daily mean spherical harmonic models (DMSHM) over the survey interval of a few years. At the second stage, the coefficients of this set are used as source data for expansion into the natural orthogonal components (NOC). It is shown that the terms of the NOC series decrease rapidly, and the accuracy of the space-time model of the main geomagnetic field over the time interval under discussion is not worse than the accuracy of the models obtained by traditional methods. 相似文献