Astronomy and Astrophysics – Astronomy
Scientific paper
Dec 2007
adsabs.harvard.edu/cgi-bin/nph-data_query?bibcode=2007geoji.171.1308z&link_type=abstract
Geophysical Journal International, Volume 171, Issue 3, pp. 1308-1313.
Astronomy and Astrophysics
Astronomy
1
Depth Migration, Fourier Finite-Difference Method, Padé Approximation
Scientific paper
We present a split-step complex Padé-Fourier migration method based on the one-way wave equation. The downward-continuation operator is split into two downward-continuation operators: one operator is a phase-shift operator and the other operator is a finite-difference operator. A complex treatment of the propagation operator is applied to mitigate inaccuracies and instabilities due to evanescent waves. It produces high-quality images of complex structures with fewer numerical artefacts than those obtained using a real approximation of a square-root operator in the one-way wave equation. Tests on zero-offset data from the SEG/EAGE salt data show that the method improves the image quality at the cost of an additional 10 per cent computational time compared to the conventional Fourier finite-difference method.
Fomel Sergey
Hoversten Michael G.
Rector James W.
Zhang Linbin
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