Journal of Jilin University(Earth Science Edition) ›› 2018, Vol. 48 ›› Issue (1): 261-270.doi: 10.13278/j.cnki.jjuese.20160359
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Chen Hui1,2, Yin Min2, Yin Changchun1, Deng Juzhi2
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[1] Newman G A. A Review of High-Performance Com-putational Strategies for Modeling and Imaging of Electromagnetic Induction Data[J]. Surveys in Geophysics, 2014, 35(1): 85-100. [2] Smith R. Electromagnetic Induction Methods in Mi-ning Geophysics from 2008 to 2012[J]. Surveys in Geophysics, 2014, 35(1): 123-156. [3] Siripunvaraporn W. Three-Dimensional Magnetotellu-ric Inversion: An Introductory Guide for Developers and Users[J]. Surveys in Geophysics, 2012, 33(1): 5-27. [4] 谭捍东,余钦范,Booker John,等. 大地电磁法三维交错采样有限差分数值模拟[J]. 地球物理学报,2003,46(5):706-711. Tan Handong, Yu Qinfan, Booker J, et al. Magnetotelluric Three-Dimensional Modelling Using the Staggered-Grid Fnite Difference Method[J]. Chinese Journal of Geophysics, 2003, 46(5): 706-711. [5] 沈金松. 用交错网格有限差分法计算三维频率域电磁响应[J]. 地球物理学报,2003,46(2):281-289. Shen Jinsong. Modelling of 3-D Eectromagnetic Responses in Frequency Domain by Using Straggered-Grid Finite Difference Method[J]. Chinese Journal of Geophysics, 2003, 46(2): 281-289. [6] Mackie R L, Madden T R, Wannamaker P E. Three-Dimensional Magnetotelluric Modeling Using Difference Equations: Theory and Comparisons to Integral Equation Solutions[J]. Geophysics, 1993, 58(2): 215-226. [7] 李焱, 胡祥云, 杨文采, 等. 大地电磁三维交错网格有限差分数值模拟的并行计算研究[J]. 地球物理学报,2012,55(12):4036-4043. Li Yan, Hu Xiangyun, Yang Wencai, et al. A Study on Parallel Computation for 3D Magnetotelluric Modeling Using the Staggered-Grid Finite Difference Method[J]. Chinese Journal of Geophysics, 2012, 55(12): 4036-4043. [8] Haber E, Ascher U M. Fast Finite Volume Simulation of 3D Electromagnetic Problems with Highly Discontinuous Coefficients[J]. SIAM Journal on Scientific Computing, 2000, 22(6): 1943-1961. [9] Haber E, Ruthotto L. A Multiscale Finite Volume Method for Maxwell's Equations at Low Frequencies[J]. Geophysical Journal International, 2014, 199(2): 1268-1277. [10] 陈辉,殷长春,邓居智. 基于Lorenz规范条件下磁矢势和标势耦合方程的频率域电磁法三维正演[J]. 地球物理学报,2016,59(8):3087-3097. Chen Hui, Yin Changchun, Deng Juzhi. A Finite-Volume Solution to 3D Frequency-Domain Electromagnetic Modelling Using Lorenz-Gauged Magnetic Vector and Scalar Potentials[J]. Chinese Journal of Geophysics, 2016, 59(8): 3087-3097. [11] Ren Z, Kalscheuer T, Greenhalgh S, et al. A Finite-Element-Based Domain-Decomposition Approach for Plane Wave 3D Electromagnetic Modeling[J]. Geophysics, 2014, 79(6): E255-E268. [12] 黄临平,戴世坤. 复杂条件下3D电磁场有限元计算方法[J]. 地球科学:中国地质大学学报,2002,27(6):775-779. Huang Linping, Dai Shikun. Finite Element Calculation Method of 3D Electromagnetic Field under Complex Condition[J]. Earth Science: Journal of China University of Geoscineces, 2002, 27(6): 775-779. [13] Mitsuhata Y, Uchida T. 3D Magnetotelluric Mode-ling Using the T-Omega Finite-Element Method[J]. Geophysics, 2004, 69(1): 108-119. [14] 李俊杰,严家斌,皇祥宇. 无单元Galerkin法大地电磁三维正演模拟[J]. 地质与勘探,2015,51(5):946-952. Li Junjie, Yan Jiabin, Huang Xiangyu. Three-Dimensional Forward Modeling of Magnetotellurics Using the Element-Free Galerkin Method[J]. Geology and Exploration, 2015, 51(5): 946-952. [15] 严家斌,皇祥宇. 大地电磁三维矢量有限元正演[J]. 吉林大学学报(地球科学版),2016,46(5):1538-1549. Yan Jiabin, Huang Xiangyu. 3D Forward Modeling of Magnetotelluric Field by Vector Finite Element Method[J]. Journal of Jilin University (Earth Science Edition), 2016, 46(5): 1538-1549. [16] Kruglyakov M, Geraskin A, Kuvshinov A. Novel Accurate and Scalable 3-D MT Forward Solver Based on a Contracting Integral Equation Method[J]. Computers & Geosciences, 2016, 96: 208-217. [17] Wannamaker P E. Advances in Three-Dimensional Magnetotelluric Modeling Using Integral Equations[J]. Geophysics, 1991, 56(11): 1716-1728. [18] 王书明,李德山,胡浩. 三维/三维构造下大地电磁相位张量数值模拟[J]. 地球物理学报,2013,56(5):1745-1752. Wang Shuming, Li Deshan, Hu Hao. Numerical Modeling of Magnetotelluric Phase Tensor in the Context of 3D/3D Formation[J]. Chinese Journal of Geophysics, 2013, 56(5): 1745-1752. [19] de Groot-Hedlin C. Finite-Difference Modeling of Magnetotelluric Felds: Error Estimates for Uniform and Nonuniform Grids[J]. Geophysics, 2006, 71(3): G225-G233. [20] Han N, Nam M J, Kim H J, et al. A Comparison of Accuracy and Computation Time of Three-Dimensional Magnetotelluric Modelling Algorithms[J]. Journal of Geophysics and Engineering, 2009, 6(2): 136. [21] Smith J T. Conservative Mmodeling of 3-D Electro-magnetic Fields: Part Ⅱ: Biconjugate Gradient Solution and an Accelerator[J]. Geophysics, 1996, 61(5): 1319-1324. [22] Siripunvaraporn W, Egbert G, Lenbury Y. Nume-rical Accuracy of Magnetotelluric Modelling: A Comparison of Finite Difference Approximations[J]. Earth Planets Space, 2002, 54: 721-725. [23] Mackie R L, Madden T R. Conjugate Direction Relaxation Solutions for 3-D Magnetotelluric Modeling[J]. Geophysics, 1993, 58(7): 1052-1057. [24] Weiss C J, Newman G A. Electromagnetic Induction in a Generalized 3D Anisotropic Earth: Part 2: The LIN Preconditioner[J]. Geophysics, 2003, 68(3): 922-930. [25] 陈辉,邓居智,谭捍东,等. 大地电磁三维交错网格有限差分数值模拟中的散度校正方法研究[J]. 地球物理学报,2011,54(6):1649-1659. Chen Hui, Deng Juzhi, Tan Handong, et al. Study on Divergence Correction Method in Three-Dimensional Magnetotelluric Modeling with Staggered-Grid Finite Fifference Method[J]. Chinese Journal Geophysics, 2011, 54(6): 1649-1659. [26] Streich R. 3D Finite-Difference Frequency-Domain Modeling of Controlled-Source Electromagnetic Data: Direct Solution and Optimization for High Accuracy[J]. Geophysics, 2009, 74(5): 95-105. [27] Puzyrev V, Koric S, Wilkin S. Evaluation of Parallel Direct Sparse Linear Solvers in Electromagnetic Geophysical Problems[J]. Computers & Geosciences, 2016, 89: 79-87. [28] Koldan J, Puzyrev V, de la Puente J, et al. Algebraic Multigrid Preconditioning Within Parallel Finite-Element Solvers for 3-D Electromagnetic Modelling Problems in Geophysics[J]. Geophysical Journal International, 2014, 197(3): 1442-1458. [29] Mulder W A. Geophysical Modelling of 3D Electro-magnetic Diffusion with Multigrid[J]. Computing and Visualization in Science, 2008, 11(3): 129-138. [30] Pan K, Tang J. 2.5-D and 3-D DC Resistivity Modelling Using an Extrapolation Cascadic Multigrid Method[J]. Geophysical Journal International, 2014, 197(3): 1459-1470. [31] Trottenberg U, Clees T. Multigrid Software for Industrial Applications: From MG00 to SAMG[M]. Heidelberg: Springer, 2009: 423-436. [32] Notay Y. An Aggregation-Based Algebraic Multigrid Method[J]. Electronic Transactions on Numerical Analysis, 2010, 37(6): 123-146. [33] Henson V E, Yang U M. Boomer AMG: A Parallel Algebraic Multigrid Solver and Preconditioner[J]. Applied Numerical Mathematics, 2002, 41(1): 155-177. [34] Saad Y. Iterative Methods for Sparse Linear Systems[M]. Philadelphia: SIAM, 2003. [35] Pflaum C. A Multigrid Conjugate Gradient Method[J]. Applied Numerical Mathematics, 2008, 58: 1803-1817. [36] MT 3D Inversion Workshop. Dublin Test Model 1(DTM1)[EB/OL].[2016-10-20] http://www.complete-mt-solutions.com/mtnet/workshops/mt3di-nv/2008_Dublin/Dublin/3dmodel.html. [37] Kelbert A, Meqbel N, Egbert G D, et al. ModEM: A Modular System for Inversion of Electromagnetic Geophysical Data[J]. Computers & Geosciences, 2014, 66: 40-53. |
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