Weak field Newtonian limit

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lailola
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Hello,

I have to calculate the gravitational field strength g given by the De Sitter-Schwarzschild spacetime.

If G=c=1 I get:

[itex]R_{00}\simeq -kT_{00}+\frac{1}{2}kT\eta_{00}+\Lambda \eta_{00}\simeq[/itex]

[itex]-kT_{00}+\frac{1}{2}kT_{00}\eta^{00}\eta_{00} +\Lambda \eta_{00}\simeq -\frac{1}{2}kT_{00}+ \Lambda =-\frac{1}{2}k\rho+ \Lambda[/itex]

On the other side:

[itex]R_{00}\simeq -\Gamma_{00,j}^j \simeq -\frac{1}{2}\bigtriangledown^2g_{00}\simeq -\bigtriangledown^2 \phi[/itex]

Equaling:

[itex]\bigtriangledown^2 \phi=\frac{1}{2}k\rho-\Lambda=4piG\rho-\Lambda[/itex]

The first problem I have is that I don't know how to get this result in normal units, and the second problem is that, from here, I have to find the gravitational field strength g, and I don't know how to do it.

thanks for any help!
 
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What precisely are "normal units"? I would say the units as you use here are just fine. Second, the gravitational field strength is given by

[tex] g^i \equiv \partial^i \phi [/tex]

whereas you have found an expression for [itex]\partial_i \partial^i \phi[/itex]. Looking at the general method to solve the Poisson equation for lambda=0 should help you, e.g. here:

http://cass.ucsd.edu/~ppadoan/new_website/physics105b/Lecture3.pdf

You have an extra constant, which modifies this solution. See also

http://arxiv.org/abs/gr-qc/0004037,

eqn.2.6.
 
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With 'normal' units I mean G=c=1
 
haushofer said:
What precisely are "normal units"? I would say the units as you use here are just fine. Second, the gravitational field strength is given by

[tex] g^i \equiv \partial^i \phi [/tex]

whereas you have found an expression for [itex]\partial_i \partial^i \phi[/itex]. Looking at the general method to solve the Poisson equation for lambda=0 should help you, e.g. here:

http://cass.ucsd.edu/~ppadoan/new_website/physics105b/Lecture3.pdf

You have an extra constant, which modifies this solution. See also

http://arxiv.org/abs/gr-qc/0004037,

eqn.2.6.

Thank you haushofer, those links have helped me a lot.
 
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