Physics Asked on November 8, 2021
Given the standard geodesic equation:
$$frac{d^2 x^mu}{dlambda^2}+Gamma ^mu _{sigma rho}frac{d x^sigma}{d lambda}frac{d x^rho}{d lambda}=0$$
we want to apply it to the Schwarzschild metric; conceptually this simply means using the proper $Gamma$ coefficients, but in practice this leads to a gargantuan calculation. But fortunately we can apply some simplification to get the following equation:
$$frac{1}{2}left(frac{dr}{dlambda}right)^2+V(r)=mathcal{E} (1)$$
where:
$$V(r)=frac{1}{2}epsilon-epsilonfrac{GM}{r}+frac{L^2}{2r^2}-frac{GML^2}{r^3}$$
$$mathcal{E}=frac{1}{2}E^2$$
we should also specify that:
End of the setup; my question is: I followed the proof of this statement, involving killing vectors ecc., and I get the mathematical gist of it, but I have problems interpreting the result. Is there an intuitive way to read statement (1)?
(For example: One problem is that it is said that $V(lambda)$ should represent the potential and $mathcal{E}$ should represent the energy, but I don’t see how.)
OP's first-order ODE (3) involves 4 spacetime coordinates, but after using various Killing symmetries of the Schwarzschild solution, we eliminate$^1$ 3 coordinates, and we are left with OP's first-order ODE (1) in a single radial coordinate $r$, which readily has an interpretation as a non-relativistic-looking$^2$ 1D energy conservation law. See also my related Phys.SE answer here.
An additional existence argument comes from the fact that we know from the Kepler problem that some version of OP's eq. (1) must exist in the non-relativistic limit $cto infty$.
--
$^1$ Explicitly this elimination is done by (i) going to equatorial plane, and by using that (ii) specific energy & (iii) angular momentum are conserved.
$^2$ While the "kinetic term" $dot{r}^2$ naively looks non-relativistic, everything is of course fully relativistic!
Answered by Qmechanic on November 8, 2021
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