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THE MEANING OF THE DSR EQUATION

The double-square-root equation is not easy to understand because it is an operator in a four-dimensional space, namely, (z,s,g,t). We will approach it through various applications, each of which is like a picture in a space of lower dimension. In this section lateral velocity variation will be neglected (things are bad enough already!).

One way to reduce the dimensionality of (14) is simply to set $H \,=\, 0$.Then the two square roots become the same, so that they can be combined to give the familiar paraxial equation:  
 \begin{displaymath}
{dU \over dz }\ \eq 
{ -\,i \omega } \ {2 \over v }\ \sqrt { 1 \ -\ 
\ { v^2 \, k_y^2 \over 4 \, \omega^2 } } \ \ U\end{displaymath} (32)
In both places in equation (32) where the rock velocity occurs, the rock velocity is divided by 2. Recall that the rock velocity needed to be halved in order for field data to correspond to the exploding-reflector model. So whatever we did by setting $H \,=\, 0$,gave us the same migration equation we used in chapter [*]. Setting $H \,=\, 0$ had the effect of making the survey-sinking concept functionally equivalent to the exploding-reflector concept.



 
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Stanford Exploration Project
12/26/2000