Removing smearing-effect artifacts in angle-domain common-image gathers from reverse time migration

Local plane-wave decomposition (LPWD) and local shift imaging condition (LSIC) methods for extracting angle-domain common-image gathers (ADCIGs) from prestack reverse time migration are based on the local plane-wave assumption, and both suffer from a trade-off in choosing the local window size. Small windows produce clean ADCIGs, but with low angle resolution, whereas large windows produce noisy ADCIGs, which include smearing-effect artifacts, but with high angle resolution. The cause of the smearing-effect artifacts in LPWD is the crosscorrelation of plane waves obtained by decomposition of the source and receiver wavefronts, at points that do not lie on the source wavefront excitation time trajectory. The cause of the smearing-effect artifacts in LSIC is the decomposition of curved events of offset-domain common-image gathers (ODCIGs) at incorrect depth points at zero offset. These artifacts can occur even if the migration velocity model is correct. Two methods were proposed to remove the artifacts. In the LPWD method, the smearing-effect artifacts were removed by decomposing and crosscorrelating the resulting source and receiver plane waves only at image points and excitation (image) times. In the LSIC method, the artifacts were removed by decomposing curved events in ODCIGs into planar events only at zero-offset target image points. Numerical tests with synthetic data revealed the success of the proposed methods.

[1]  Paul Sava,et al.  Coordinate-independent Angle-gathers For Wave Equation Migration , 2005 .

[2]  Sergey Fomel Theory of 3-D angle gathers in wave-equation seismic imaging , 2011 .

[3]  Yu Zhang,et al.  Antileakage Fourier transform for seismic data regularization , 2005 .

[4]  R. Tatham Multidimensional filtering of seismic data , 1984, Proceedings of the IEEE.

[5]  Rui Yan,et al.  The New Angle-domain Imaging Condition For Elastic RTM , 2010 .

[6]  W. Symes,et al.  Angle‐domain common‐image gathers for migration velocity analysis by wavefield‐continuation imaging , 2004 .

[7]  Jinjun Liu,et al.  Automatic Event Picking And Tomography On 3D RTM Angle Gathers , 2010 .

[8]  Bin Wang,et al.  3D RTM angle gathers from source wave propagation direction and dip of reflector , 2011 .

[9]  George A. McMechan,et al.  Imaging conditions for prestack reverse-time migration , 2008 .

[10]  Rui Yan,et al.  An angle-domain imaging condition for elastic reverse time migration and its application to angle gather extraction , 2012 .

[11]  B. Nguyen,et al.  Excitation amplitude imaging condition for prestack reverse-time migration , 2013 .

[12]  D. Culler,et al.  Comparison of methods , 2000 .

[13]  P. Sava,et al.  Wave‐equation common‐angle gathers for converted waves , 2005 .

[14]  Paul Sava,et al.  Isotropic angle-domain elastic reverse-time migration , 2008 .

[15]  Yilong Qin,et al.  True-amplitude common-shot acoustic reverse time migration , 2013 .

[16]  Paul Sava,et al.  Angle-domain common-image gathers by wavefield continuation methods , 2003 .

[17]  William W. Symes,et al.  Automatic velocity analysis via shot profile migration , 2008 .

[18]  G. McMechan,et al.  Comparison of methods for extracting ADCIGs from RTM , 2014 .

[19]  Thomas A. Dickens,et al.  RTM angle gathers using Poynting vectors , 2011 .

[20]  J. Sun,et al.  Practical issues in reverse time migration: true amplitude gathers, noise removal and harmonic source encoding , 2009 .

[21]  A Full-wave Equation Based Seismic Illumination Analysis Method , 2008 .

[22]  Seismic inverse scattering in the `wave-equation' approach , 2001, math/0112172.

[23]  George A. McMechan,et al.  Direct vector-field method to obtain angle-domain common-image gathers from isotropic acoustic and elastic reverse time migration , 2011 .

[24]  Christiaan C. Stolk,et al.  Kinematic artifacts in prestack depth migration , 2004 .

[25]  Rui Yan,et al.  Angle Gather Extraction For Acoustic And Isotropic Elastic RTM , 2011 .

[26]  Madhav Vyas,et al.  Efficient RTM angle gathers using source directions , 2011 .

[27]  Ru-Shan Wu,et al.  Extracting Angle Domain Information From Migrated Wavefield , 2002 .

[28]  Yu Zhang,et al.  3D angle gathers from reverse time migrationXu et al.RTM 3D angle gathers , 2011 .

[29]  L. Neil Frazer,et al.  Transformation and analysis of record sections , 1981 .

[30]  G. McMechan,et al.  Common-image gathers in the incident phase-angle domain from reverse time migration in 2D elastic VTI media , 2011 .

[31]  Polarization-Based Wave-Equation Migration Velocity Analysis in Acoustic Media , 2012 .

[32]  Lorie K. Bear,et al.  A Comparison of Methods For Obtaining Local Image Gathers In Depth Migration , 2010 .

[33]  George A. McMechan,et al.  Improving input/output performance in 2D and 3D angle-domain common-image gathers from reverse time migration , 2015 .

[35]  Jan M. Rabaey,et al.  Comparison of Methods , 2004 .

[36]  Tariq S. Durrani,et al.  The Radon transform and its properties , 1984 .

[37]  Biondo Biondi,et al.  Angle-domain Common-image Gathers For Steep Reflectors , 2008 .

[38]  G. McMechan,et al.  True-amplitude prestack depth migration , 2007 .

[39]  Yu Zhang,et al.  3D angle gathers from reverse time migration , 2010 .

[40]  Christiaan C. Stolk,et al.  Kinematics of shot-geophone migration , 2009 .

[41]  Hui Yang,et al.  The finite-frequency sensitivity kernel for migration residual moveout and its applications in migration velocity analysis , 2008 .

[42]  George A. McMechan,et al.  Options for source wavefield reconstruction in prestack reverse-time migration , 2009 .

[43]  High Order RMO Picking Using Uncorrelated Parameters , 2007 .

[44]  Non Hyperbolic Moveout Anisotropic MVA , 2011 .

[45]  Rui Yan,et al.  A new angle-domain imaging condition for prestack reverse-time migration , 2009 .

[46]  Huazhong Wang,et al.  Efficient angle-domain common-image gathers using Cauchy-condition-based polarization vectors , 2016 .

[47]  George A. McMechan,et al.  Five ways to avoid storing source wavefield snapshots in 2D elastic prestack reverse time migration , 2015 .

[48]  Yu Zhang,et al.  Antileakage Fourier transform for seismic data regularization in higher dimensions , 2010 .

[49]  Jon F. Claerbout,et al.  VELOCITY ESTIMATION AND DOWNWARD CONTINUATION BY WAVEFRONT SYNTHESIS , 1978 .

[50]  Structurally coherent wide azimuth residual move out surfaces , 2009 .

[51]  Sergey Fomel,et al.  Theory of 3-D angle gathers in wave-equation imaging , 2004 .

[52]  Kurt J. Marfurt,et al.  Reverse-Time Migration using the Poynting Vector , 2006 .