Curtis J. Saxton , Kinwah Wu , Helen Pongracic, PASA, 14 (2), in press.
| Title/Abstract Page: Stability of Accretion Shocks Previous Section: APPENDIX A. The composite | Contents Page: Volume 14, Number 2 |
APPENDIX B. The perturbed boundary conditions
Consider a reference frame which is co-moving with the shock surface. Let the subscripts ``1'' and ``2'' denote the quantities in the pre-shock and the post-shock regions respectively, and the `prime' and `un-prime' denote the observers' and the new reference frame (co-moving with the shock surface) respectively. If the velocity in the observer's frame is u, then the velocity in the new reference frame is 
From eqn (4), we therefore obtain the velocity of the accretion matter 
From the continuity equation we have 
Since 
(where 
is the density above the shock surface), we have 
. For a strong shock, 
. It follows that 
and 
On the other hand, we have 
and 
Hence, 
The gas pressure of the pre-shock gas near the shock surface is given by 
Since 
we have 
| Title/Abstract Page: Stability of Accretion Shocks Previous Section: APPENDIX A. The composite | Contents Page: Volume 14, Number 2 |
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