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LSMF for Suppressing Multiples

Published byErna Kristoffersen Modified over 4 years ago

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Presentation on theme: "LSMF for Suppressing Multiples"— Presentation transcript:

1 LSMF for Suppressing Multiples
Jianhua Yu University of Utah

2 Contents Motivation LSMF Inversion Numerical Examples Conclusions

3 Contents Motivation LSMF Inversion Numerical Examples: Conclusions

4 Demultiple Methods Radon transform Inverse scattering theory
Prediction+subtraction

5 Benefits: Demultiple for coarse acquisition geometry
Use both primary and multiple information

6 Contents Motivation LSMF Inversion Numerical Examples: Conclusions

7 Assuming that seismic data can be written mathematically as
D : seismic data L : Primary forward operator p L : Multiple forward operator m R : Primary model R : Multiple model

8 LSMF equation (Nemeth, 1996) :
Minimize the misfit function D : seismic data obs R : Primary model p R : Multiple model m

9 LSMF Inversion: Algorithm: Conjugate Gradient (CG)

10 Primary Modeling Operator
W p a weight R A primary model d primary reflections

11 Multiple Modeling Operator
W m a weight R m A multiple model d m multiples reflections

12 Operators for primary and multiple migration are the transpose of modeling operators
Multiple initial model Wang (Geophys, 2003)

13 Demultiple Using LSMF Input CMP gathers
Solving the following equation by CG algorithm

14 Demultiple using LSMF P=D-M Predicted multiple M
Subtract multiple M from raw data D and get primary P P=D-M

15 Contents Motivation LSMF Inversion Numerical Examples Conclusions

16 Model Time (s) P+M P M LSMF P+M P M

17 CMP 300 (NS) Time (s) P+M M P

18 CMP 1700 (NS) Time (s) P+M M P

19 CMP 1300 (NS) Time (s) P+M M P

20 Before LSMF After LSMF Velocity Time (s) CMP 1300 (NS) 3.5 1.4 4

21 Before LSMF After LSMF Velocity Time (s) CMP 1300 (NS) 3.5 1.4 4

22 CMP 800 (Unocal) Time (s) P+M M P

23 CMP 900 (Unocal) Time (s) P+M M P

24 CMP 1100 (Unocal) Time (s) P+M M P

25 Velocity Velocity 1.4 3.2 1.4 3.2 Time (s) 4 Before LSMF After LSMF

26 Contents Motivation LSMF Inversion Numerical Examples: Conclusions

27 Conclusions Works for synthetic data and real data
No limit to coarse geometry Straightforward to extend to 3D Regularization strategy required for shallow reflections 1-D model

28 ACKNOWLEDGMENTS 2003 UTAM Sponsors Unocal and Mobil for 2-D field data
CHPC

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