Least‐squares reverse‐time migration in a matrix‐based formulation |
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| Authors: | Gang Yao Helmut Jakubowicz |
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| Institution: | Department of Earth Science and Engineering, Imperial College London, UK |
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| Abstract: | This paper describes least‐squares reverse‐time migration. The method provides the exact adjoint operator pair for solving the linear inverse problem, thereby enhancing the convergence of gradient‐based iterative linear inversion methods. In this formulation, modified source wavelets are used to correct the source signature imprint in the predicted data. Moreover, a roughness constraint is applied to stabilise the inversion and reduce high‐wavenumber artefacts. It is also shown that least‐squares migration implicitly applies a deconvolution imaging condition. Three numerical experiments illustrate that this method is able to produce seismic reflectivity images with higher resolution, more accurate amplitudes, and fewer artefacts than conventional reverse‐time migration. The methodology is currently feasible in 2‐D and can naturally be extended to 3‐D when computational resources become more powerful. |
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| Keywords: | Adjoint migration Least‐squares reverse‐time migration Cross‐correlation imaging condition Deconvolution imaging condition |
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