Would it be possible for you to provide me a list of body masses, and a snapshot of their coordinates and velocities? I'd love to try this out.Janus said:
What metric does that simulator use, Newtonian or relativistic? Orbits around black holes can look much different under Einstein than they would under Newton as shown in this thread where the same initial conditions give very different results for Newton and Einstein: Black hole orbitsJanus said:
I think bearing in mind the very short observational period we are working with, any effects due to particles outside about ##10R_s## to ##100R_s## would be "lost in the noise", so I'm comfortable with a Newtonian approach. Not that I feel we have much choice in the matter ;)Yukterez said:
When the observed velocity at the perihelion at 10rs is for example 0.2236068c there would be a notable difference between the Newtonian and the relativistic orbit:m4r35n357 said:
We could simulate it in Schwarzschild metric (if the simulations we already have aren't already)m4r35n357 said:
With the listed eccentricity, I get a precession of apsides of ~ 0.17 degrees per orbit. With a 14.53 year orbit, this works out to ~30500 years for the apsides to rotate a full 360 degrees. ( Compare this to the 43 seconds of arc per century precession for Mercury, which would take ~3,000,000 years to complete a full rotation.)Yukterez said:
Agreed, but my point was we don't have enough actual data to check our predictions accurately against (order of 15 year orbits).Yukterez said:
Yes, I suppose we could use the potential (with extra term due to GR) in a n-body simulation. We would also need to consider interactions between stars that pass nearby each other around the perihelion (we'd need to use that potential for all the stars), so I'd call that a modified Newtonian analysis really.Yukterez said: