Suggested Reading

Resistivity and IP (Induced Polarization) Inversion Processing

  • Constable, S., Parker, R.L., and Constable, C.G., 1987, Occam’s inversion: A practical algorithm for generating smooth models from electromagnetic sounding data, Geophysics, 52, 289-300.

  • DeGroot-Hedlin, D. and Constable, S., 1990, Occam’s inversion to generate smooth, two-dimensional models from magnetotelluric data, Geophysics, 55, 1613-1624.

  • Dey, A., Morrison, H.F., 1979, Resistivity modeling for arbitrarily shaped two-dimensional structures, Geophysical Prospecting, 27, 106-136.

  • Edwards, L.S., 1977, A modified pseudosection for resistivity and induced polarization: Geophysics, 42, 1020-1036.

  • Farquharson C. G., and Oldenburg D.W., 1998, Non-linear inversion using general measures of data misfit and model structure, Geophys. J. Int., 134, 213-227.

  • Fink, J.B., Sternberg, B.K., McAlister, E.O., and Wieduwilt W.G. (Editors), 1990, Induced Polarization, Applications and Case Histories, Investigations In Geophysics, No. 4, Society of Exploration Geophysicists.

  • Gradshteyn, I.S., and Ryzhik, I.M., 2000, Tables of integrals, series, and products, 6th edition, Academic Press.

  • Holcombe, H. Truman, and Jiracek, George R., 1984, Three-dimensional terrain corrections in resistivity surveys, Geophysics, 49, 439-452.

  • Huebner, K.H., and Thornton, E.A., 1995, The finite element method for engineers, John Wiley and Sons.

  • Lines, L.R., and Treitel, S., 1984, A review of least squares inversion and its applications to geophysical problems, Geophysical Prospecting, 32, 159-186.

  • Oldenburg, D. and Li, Y., 1994, Inversion of induced polarization data, Geophysics, 59, 1327-1341.

  • Golub G.H., and Van Loan C.F., 1996, Matrix computations, third edition, John Hopkins University Press.

  • Menke, W., 1989, Geophysical data analysis: Discrete inverse theory, Academic Press.

  • Nelson, P.H., and Van Voorhis, G.D., 1973, Letter to editor regarding paper “Complex resistivity spectra of porphyry copper mineralization, Geophysics, 1973, 38(1) by Voorhis et al.”, 38, p.984.

  • Sasaki, Y., 1992, Resolution of resistivity tomography inferred from numerical simulation, Geophysical Prospecting, 40, 453-464.

  • Stummer, P., Maurer, H., and Green, A.G., 2004, Experimental design: Electrical resistivity data sets that provide optimum subsurface information, Geophysics, vol. 69, 120-139.

  • Sumner, J.S., 1976, Principles of induced polarization for geophysical exploration, Elsevier Scientific.

  • Tarantola, A., 1987, Inverse problem theory: Methods for data fitting and model parameter estimation, Elsevier.

  • Telford, W.M., Geldart, L.P., and Sheriff, R.E., 1990, Applied geophysics, 2nd Edition, Cambridge University Press.

  • Tikhonov, A.N., and Arsenin, V.Y., 1977, Solutions of ill-posed problems, John Wiley & Sons, New York.

  • Wannamaker, P.E., 1992, IP2DI-v1.00, Finite element program for dipole-dipole resistivity/IP forward modeling and parameterized inversion of two-dimensional earth resistivity structure, User Documentation, University of Utah Research Institute, Earth Science Laboratory, Salt Lake City, Utah.

  • Ward, S.H. (Editor), 1990, Geotechnical and environmental geophysics, Volumes I, II, and III, Investigations In Geophysics, No. 5, Society of Exploration Geophysicists.

  • Yang, Xianjin, 1999, Stochastic inversion of 3D ERT data, Ph.D. thesis, the University of Arizona, Tucson, Arizona, USA.

  • Zhou, B., and Greenhalph, S.A., Cross-hole resistivity tomography using different electrode configurations, Geophysical Prospecting, 2000, 48, 887-912.