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Wave-equation migration velocity analysis beyond the Born approximation Paul Sava* Stanford University Sergey Fomel UT Austin (UC.

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Presentation on theme: "Wave-equation migration velocity analysis beyond the Born approximation Paul Sava* Stanford University Sergey Fomel UT Austin (UC."— Presentation transcript:

1 paul@sep.stanford.edu Wave-equation migration velocity analysis beyond the Born approximation Paul Sava* Stanford University Sergey Fomel UT Austin (UC Berkeley)

2 paul@sep.stanford.edu Imaging=MVA+Migration Migration wavefield based Migration velocity analysis (MVA) traveltime based Compatible migration and MVA methods

3 paul@sep.stanford.edu Imaging: the “big picture” Kirchhoff migration traveltime tomography wavefronts wave-equation migration wave-equation MVA (WEMVA) wavefields

4 paul@sep.stanford.edu Agenda Theoretical background WEMVA methodology Scattering Imaging Image perturbations Wavefield extrapolation Born linearization Alternative linearizations

5 paul@sep.stanford.edu Wavefields or traveltimes?

6 paul@sep.stanford.edu Wavefields or traveltimes?

7 paul@sep.stanford.edu Scattered wavefield Medium perturbation Wavefield perturbation

8 paul@sep.stanford.edu Agenda Theoretical background WEMVA methodology Scattering Imaging Image perturbations Wavefield extrapolation Born linearization Alternative linearizations

9 paul@sep.stanford.edu Imaging: Correct velocity Background velocity Migrated image Reflectivity model What the data tell us...What migration does... location depth location depth

10 paul@sep.stanford.edu Imaging: Incorrect velocity Perturbed velocity Migrated image Reflectivity model What the data tell us...What migration does... location depth location depth

11 paul@sep.stanford.edu Wave-equation MVA: Objective Velocity perturbation Image perturbation slowness perturbation (unknown) WEMVA operator image perturbation (known) location depth location depth

12 paul@sep.stanford.edu –migrated images –moveout and focusing –use amplitudes –parabolic wave equation –multipathing –slow –picked traveltimes –moveout –ignore amplitudes –eikonal equation –fast Comparison of MVA methods Wave-equation MVATraveltime tomography

13 paul@sep.stanford.edu Agenda Theoretical background WEMVA methodology Scattering Imaging Image perturbations Wavefield extrapolation Born linearization Alternative linearizations

14 paul@sep.stanford.edu What is the image perturbation? FocusingFlatness Residual process: moveout migration focusing slowness perturbation (unknown) WEMVA operator image perturbation (known) location depth angle

15 paul@sep.stanford.edu Agenda Theoretical background WEMVA methodology Scattering Imaging Image perturbations Wavefield extrapolation Born linearization Alternative linearizations

16 paul@sep.stanford.edu Double Square-Root Equation Fourier Finite Difference Generalized Screen Propagator Wavefield extrapolation

17 paul@sep.stanford.edu “Wave-equation” migration

18 paul@sep.stanford.edu Slowness perturbation

19 paul@sep.stanford.edu slowness perturbation background wavefield perturbation Wavefield perturbation

20 paul@sep.stanford.edu Agenda Theoretical background WEMVA methodology Scattering Imaging Image perturbations Wavefield extrapolation Born linearization Alternative linearizations

21 paul@sep.stanford.edu Born approximation Small perturbations! Born linearization Non-linear WEMVA slowness perturbation (unknown) WEMVA operator image perturbation (known) Unit circle

22 paul@sep.stanford.edu Does it work? What if the perturbations are not small? Location [km] Depth [km]

23 paul@sep.stanford.edu Synthetic example

24 paul@sep.stanford.edu Born approximation 1%10%

25 paul@sep.stanford.edu Agenda Theoretical background WEMVA methodology Scattering Imaging Image perturbations Wavefield extrapolation Born linearization Alternative linearizations

26 paul@sep.stanford.edu Wavefield continuation Bilinear Implicit Explicit(Born approximation)

27 paul@sep.stanford.edu Exponential approximations Unit circle

28 paul@sep.stanford.edu A family of linearizations Linear WEMVA slowness perturbation (unknown) WEMVA operator image perturbation (known)

29 paul@sep.stanford.edu Improved linearizations 1%10% 40%

30 paul@sep.stanford.edu Agenda Theoretical background WEMVA methodology Scattering Imaging Image perturbations Wavefield extrapolation Born linearization Alternative linearizations

31 paul@sep.stanford.edu Summary Wave-equation MVA wavefield-continuation improved focusing image space (improve the image) interpretation guided Improved WEMVA better approximations no additional cost further refinement

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