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Dipping-reflector shifts

A little geometry gives simple expressions for the horizontal and vertical position errors on the zero-offset section, which are to be corrected by migration. Figure 2 defines the required quantities for a reflection event recorded at S corresponding to the reflectivity at R.

 
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Figure 2
Geometry of the normal ray of length d and the vertical ``shaft'' of length z for a zero-offset experiment above a dipping reflector.

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The two-way travel time for the event is related to the length d of the normal ray by  
 \begin{displaymath}
t \eq {2\,d \over v}
\ \ ,\end{displaymath} (1)
where v is the constant propagation velocity. Geometry of the triangle CRS shows that the true depth of the reflector at R is given by  
 \begin{displaymath}
z \eq d\ \cos\theta \ \ ,\end{displaymath} (2)
and the lateral shift between true position C and false position S is given by  
 \begin{displaymath}
\Delta x \eq d\ \sin\theta \eq {v\,t \over 2}\ \sin\theta \ \ .\end{displaymath} (3)
It is conventional to rewrite equation (2) in terms of two-way vertical traveltime $\tau$: 
 \begin{displaymath}
\tau \eq {2\,z \over v} \eq t\, \cos\theta \ \ .\end{displaymath} (4)
Thus both the vertical shift $t - \tau$ and the horizontal shift $\Delta x$are seen to vanish when the dip angle $\theta$ is zero.


next up previous print clean
Next: Hand migration Up: MIGRATION DEFINED Previous: A dipping reflector
Stanford Exploration Project
12/26/2000