The discussion revolves around the relationship between the metric tensor and gravity in the context of general relativity (GR). Participants explore whether it is possible to derive or convert the metric tensor into a description of gravity, particularly under weak field approximations. The conversation touches on concepts such as geodesic equations, proper acceleration, and the nature of gravity as spacetime curvature.
Participants express differing views on the nature of gravity in GR and the feasibility of deriving a direct relationship between the metric tensor and gravitational acceleration. There is no consensus on whether a straightforward conversion is possible, and the discussion remains unresolved regarding the explicit formulation of this relationship.
Participants note that the discussion is framed within weak field approximations and that assumptions about spacetime curvature and the definitions of gravity are critical to the conversation.
What do you mean “convert” to gravity? It already is gravity.max_zhou said:I am wondering if it is possible to derive/convert metric tensor to gravity,
This is much like asking how you convert gravitational potential to gravity in Newton's gravity. It is already a part of the description of how gravity works.max_zhou said:I am wondering if it is possible to derive/convert metric tensor to gravity
We can read and try to squeeze our own knowledge about what you can do in GR into the OP. However, all of that is going to be conjecture unless the OP can clarify what he is asking about.pervect said:Another possibility is that the OP is interested in how to calculate the proper acceleration of a worldline, so that he'd know how much a test mass would weigh if an observer on said worldline weighed it with a scale.
max_zhou said:gravity force distribution (magnitude and direction of gravity at every point)
max_zhou said:Maybe with metric tensor we can only solve the geodesic equation to get the path of a test particle. But I imagine at least under weak limitation/approximation, i.e. weakly curved spacetime, there would be a way to still use gravity to describe the world, just as what we do with Newtonian gravity. In this case, we could have a conversion between metric tensor and the gravity.
Thanks for the reply!PeterDonis said:Newtonian gravity is just an approximation to GR when speeds are low compared to the speed of light and spacetime curvature is small. So anything that Newtonian gravity can solve, GR can solve as well. (And GR will give more accurate predictions that Newtonian gravity since the latter is only an approximation to the former.)
max_zhou said:Assume we know the metric tensor at the spaceship location g, is there a formula that relates the metric tensor g to the acceleration a?
max_zhou said:will this formula apply to every location?
PeterDonis said:Yes. Modulo a few technical assumptions that I'll leave out for now, the acceleration ##a## will be given by the geodesic equation, which of course we know given the metric tensor.
max_zhou said:So we can only first solve the geodesic equation first, then to calculate the `gravity acceleration`?
max_zhou said:I take this as implicit relationship.
Ah, I see. Thank you!PeterDonis said:The geodesic equation is the equation for what you are calling "gravity acceleration". Of course you have to solve the equation for something to figure out what the formula for it is.
No, it isn't. The geodesic equation gives you an equation with what you are calling "gravity acceleration" on one side, and other stuff on the other. That's as explicit as it gets.