Does Schwarzschild Solution work inside a massive body?

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nickyrtr
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The Schwarzschild Solution to Einstein's Field Equations for gravity are said to be exact when outside a spherically symmetric massive body. My question is, can the Schwarzschild Solution also be used inside the massive body, such as a neutron star.

In Newtonian gravity we can find the gravity potential at some position inside the body; just find the distance to the center of mass, and count the total mass enclosed by a sphere whose radius equals that distance. It is similar to Gauss' Law in electrostatics.

Does a similar procedure work in general relativity? To find the gravity field at some position inside a neutron star, can I just calculate an effective Schwarzschild radius by finding the mass enclosed by a sphere passing through that position? If not, is there a correction to the Schwarzschild solution for the interior of a spherically symmetric massive body.
 
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No, it doesn't work inside the body. (Huh, does it work inside in Newton, I'd forgotten!) Try the Tolman-Oppenheimer-Volkov (TOV) equations to start.
 
atyy said:
No, it doesn't work inside the body. (Huh, does it work inside in Newton, I'd forgotten!) Try the Tolman-Oppenheimer-Volkov (TOV) equations to start.

Thank you for the reference to the TOV equation, it is most helpful. Is there a similar equation if the body has some radial flow, for example a dense star that undergoes a rapid expansion such as during a supernova?
 
nickyrtr said:
The Schwarzschild Solution to Einstein's Field Equations for gravity are said to be exact when outside a spherically symmetric massive body. My question is, can the Schwarzschild Solution also be used inside the massive body, such as a neutron star.
For constant density, there is also the interior Schwarzschild Solution:
https://www.physicsforums.com/showthread.php?p=1543402#post1543402
 
nickyrtr said:
Thank you for the reference to the TOV equation, it is most helpful. Is there a similar equation if the body has some radial flow, for example a dense star that undergoes a rapid expansion such as during a supernova?

I don't know exactly, but maybe you can find a useful reference here:

Quasi-Normal Modes of Stars and Black Holes
Kostas D. Kokkotas, Bernd G. Schmidt
http://relativity.livingreviews.org/Articles/lrr-1999-2/

Rotating Stars in Relativity
Nikolaos Stergioulas
http://relativity.livingreviews.org/Articles/lrr-2003-3/
 
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