%0 Journal Article
%T Magnetic potential spectrum analysis and calculating method of magnetic anomalyderivatives based on discrete cosine transform
基于离散余弦变换的磁位谱分析及磁异常导数计算方法
%A ZHANG Feng_Xu
%A ZHANG Feng_Qin
%A MENG Ling_Shun
%A LIU Cai
%A
张凤旭
%A 张凤琴
%A 孟令顺
%A 刘财
%J 地球物理学报
%D 2007
%I
%X A method of magnetic potential spectrum based on the cosine transform is proposed in order to improve the calculating accuracy of magnetic anomaly derivatives. According to the Poisson equation of gravitymagnetic potential, we derive the relation of cosine transform spectrum between magnetic potential and magnetic field constituent and deduce the cosine transform spectrum formula of n degree derivatives using the cosine transform. The horizontal and vertical first derivatives of magnetic anomalies of an infinite cylinder are calculated by the cosine transform method, in which the maximum errors are - 0.28 nT/m and 0.47nT/m, respectively and the percent errors are generally within - 3.57 % - 3.27 % and - 1.94 % - 1.88 %, respectively except several data of the boundary and part are bigger because of remains of Gibbus effect. The calculating curve and theoretical curve are approximately coincident, and there is no influence by effective magnetic dip angle in computing. But the errors with the Fourier transform method are - 10.62nT/m and 14.42nT/m, there is large departure between the calculating curve and theoretical curve and evident influence by effective magnetic dip angle in computing. It indicates that the calculating accuracy of magnetic anomaly derivatives calculated by cosine transform is higher than Fourier transform, and the computing stability is excellent.
%K Discrete cosine transform
%K Magnetic potential
%K Magnetic anomaly derivative
%K Calculating accuracy
离散余弦变换
%K 磁位
%K 磁异常导数
%K 计算精度
%U http://www.alljournals.cn/get_abstract_url.aspx?pcid=E62459D214FD64A3C8082E4ED1ABABED5711027BBBDDD35B&cid=1E44AE713D8A6DE0&jid=14DC41C59CBF6770055A7D610D53AE46&aid=148E98C33255C687&yid=A732AF04DDA03BB3&vid=771152D1ADC1C0EB&iid=CA4FD0336C81A37A&sid=E42CAFB11D4BE21A&eid=8ED630AD8C61FAE8&journal_id=0001-5733&journal_name=地球物理学报&referenced_num=8&reference_num=12