Wavelet-based 3-D inversion for frequency-domain airborne EM data

[1]  M. Long,et al.  Geophysical and geotechnical studies of geology and sediment properties at a quick-clay landslide site at Esp, Trondheim, Norway , 2016 .

[2]  William H. Press,et al.  Numerical recipes in Fortran 90: the art of parallel scientific computing, 2nd Edition , 1996, Fortran numerical recipes.

[3]  Ling-Yun Chiao,et al.  Multiscale seismic tomography , 2001 .

[4]  Colin Farquharson,et al.  Constructing piecewise-constant models in multidimensional minimum-structure inversions , 2008 .

[5]  Michael S. Zhdanov,et al.  Focusing geophysical inversion images , 1999 .

[6]  Clifford H. Thurber,et al.  Adaptive mesh seismic tomography based on tetrahedral and Voronoi diagrams: Application to Parkfield, California , 2005 .

[7]  Kristofer Davis,et al.  Fast solution of geophysical inversion using adaptive mesh, space-filling curves and wavelet compression , 2011 .

[8]  D. Komatitsch,et al.  A 3‐D spectral‐element and frequency‐wave number hybrid method for high‐resolution seismic array imaging , 2014 .

[9]  Ingrid Daubechies,et al.  Ten Lectures on Wavelets , 1992 .

[10]  Eldad Haber,et al.  Computational Methods in Geophysical Electromagnetics , 2014, Mathematics in Industry.

[11]  Shu-Huei Hung,et al.  First multi‐scale, finite‐frequency tomography illuminates 3‐D anatomy of the Tibetan Plateau , 2010 .

[12]  Clifford H. Thurber,et al.  Parameter estimation and inverse problems , 2005 .

[13]  Shu-Huei Hung,et al.  A data‐adaptive, multiscale approach of finite‐frequency, traveltime tomography with special reference to P and S wave data from central Tibet , 2011 .

[14]  Michael S. Zhdanov,et al.  3D inversion of airborne electromagnetic data using a moving footprint , 2010 .

[15]  Douglas W. Oldenburg,et al.  Rapid construction of equivalent sources using wavelets , 2010 .

[16]  D. Donoho For most large underdetermined systems of linear equations the minimal 𝓁1‐norm solution is also the sparsest solution , 2006 .

[17]  Guust Nolet,et al.  Solving or resolving global tomographic models with spherical wavelets, and the scale and sparsity of seismic heterogeneity , 2011 .

[18]  H. Bijwaard,et al.  Optimization of Cell Parameterizations for Tomographic Inverse Problems , 2001 .

[19]  G. Abers,et al.  Deep structure of an arc-continent collision: Earthquake relocation and inversion for upper mantle P and S wave velocities beneath Papua New Guinea , 1991 .

[20]  D. Oldenburg,et al.  Generalized subspace methods for large-scale inverse problems , 1993 .

[21]  D. Oldenburg,et al.  Fast inversion of large-scale magnetic data using wavelet transforms and a logarithmic barrier method , 2003 .

[22]  Ling-Yun Chiao,et al.  Multiresolution parameterization for geophysical inverse problems , 2003 .

[23]  Jean Virieux,et al.  First‐arrival traveltime tomography using second generation wavelets , 2008 .

[24]  Michael Becken,et al.  Inversion of magnetotelluric data in a sparse model domain , 2016 .

[25]  Hongjian Fang,et al.  Wavelet-based double-difference seismic tomography with sparsity regularization , 2014 .

[26]  D. Beamish Airborne EM footprints , 2003 .

[27]  Yongwimon Lenbury,et al.  Three-dimensional magnetotelluric inversion : data-space method , 2005 .

[28]  I. Daubechies,et al.  Tomographic inversion using L1-norm regularization of wavelet coefficients , 2006, physics/0608094.

[29]  Changchun Yin,et al.  3D inversion for multipulse airborne transient electromagnetic data , 2016 .

[30]  I. Daubechies,et al.  An iterative thresholding algorithm for linear inverse problems with a sparsity constraint , 2003, math/0307152.