Traveltime approximations for transversely isotropic media with an inhomogeneous background
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Alkhalifah: TI traveltimes in
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Acknowledgments
Bibliography
Alkhalifah, T., 1995, Efficient syntheticâseismogram generation in transversely isotropic, inhomogeneous media: Geophysics,
60
, 1139-1150.
----, 1998, Acoustic approximations for processing in transversely isotropic media: Geophysics,
63
, 623-631.
----, 2000a, An acoustic wave equation for anisotropic media: Geophysics,
65
, 1239-1250.
----, 2000b, The offset-midpoint traveltime pyramid in transversely isotropic media: Geophysics,
65
, 1316-1325.
----, 2010, Scanning anisotropy parameters in general inhomogeneous media: submitted to Geophysics.
Alkhalifah, T., and J. Bednar, 2000, Building a 3-D anisotropic model: Its implications to traveltime calculation and velocity analysis: 70th Ann. Internat. Mtg, Soc. of Expl. Geophys., 965-968.
Alkhalifah, T., and S. Fomel, 2001, Implementing the fast marching eikonal solver: spherical versus Cartesian coordinates: Geophys. Prosp.,
49
, 165-178.
Alkhalifah, T., and K. Larner, 1994, Migration error in transversely isotropic media: Geophysics,
59
, 1405-1418.
Alkhalifah, T., and P. Sava, 2010, A transversely isotropic medium with a tilted symmetry axis normal to the reflector: Geophysics,
75
, A19-A24.
Audebert, F. S., A. Pettenati, and V. Dirks, 2006, TTI anisotropic depth migration - which tilt estimate should we use?: EAGE, Expanded Abstracts, P185.
Ball, G., 1995, Estimation of anisotropy and anisotropic 3-D prestack depth migration, offshore Zaire: Geophysics,
60
, 1495-1513.
Behera, L., and I. Tsvankin, 2009, Migration velocity analysis for tilted transversely isotropic media: Geophysical Prospecting,
57
, 13-26.
Bender, C. M., and S. A. Orszag, 1978, Advanced mathematical methods for scientists and engineers: McGraw-Hill.
Cerveny, V., 2001, Seismic ray theory: Cambridge University Press.
Grechka, V., and A. Pech, 2006, Quartic reflection moveout in a weakly anisotropic dipping layer: Geophysics,
71
, no. 1, D1-D13.
Grechka, V., and I. Tsvankin, 2000, Inversion of azimuthally dependent NmO velocity in transversely isotropic media with a tilted axis of symmetry: Geophysics,
65
, 232-246.
Ohlsen, F., and C. MacBeth, 1999, Elliptical anisotropy: Regression or advance?: SEG, Expanded Abstracts,
18
, 1600-1603.
Pech, A., I. Tsvankin, and V. Grechka, 2003, Quartic moveout coefficient: 3D description and application to tilted Ti media: Geophysics,
68
, 1600-1610.
Peng, C., and K. Steenson, 2001, 3-D prestack depth migration in anisotropic media: A case study at the Lodgepole reef play in North Dakota: The Leading Edge,
20
, 524-527.
Popovici, M., 1991, Finite difference travel time maps,
in
SEP-70: Stanford Exploration Project, 245-256.
Sena, A. G., 1991, Seismic traveltime equations for azimuthally anisotropic and isotropic media: Estimation of interval elastic properties: Geophysics,
56
, 2090-2101.
Tsvankin, I., 1997, Moveout analysis for tranversely isotropic media with a tilted symmetry axis: Geophysical Prospecting,
45
, 479-512.
van Trier, J., and W. W. Symes, 1991, Upwind finite-difference calculation of traveltimes: Geophysics,
56
, 812-821.
Vidale, J. E., 1990, Finite-difference calculation of traveltimes in three dimensions: Geophysics,
55
, 521-526.
Wang, Y., T. Nemeth, and R. T. Langan, 2006, An expanding-wavefront method for solving the eikonal equations in general anisotropic media: Geophysics,
71
, T129-T135.
2013-04-02