Gradients in the curvature of space-time

In summary: However, I'm not sure how you'd go about constructing a mass with a constant curvature in space-time.
  • #1
Bob Walance
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Greetings all.

This is my first post. I'm a newbie to general relativity, but I think I'm getting the hang of it thanks to some helpful professors at UC Berkeley.

From what I understand, and now fully believe, there are no external forces applied to an object that is free falling in space-time -- regardless of the degree of curvature in that space-time. An object can transition from relatively flat space-time (i.e. far away from other massive objects) to curvier space-time (e.g. getting close to a planet) and there is no external force. Therefore, this object cannot use simple force meters (one's own skin, or a spring, or similar) to detect whether or not he/she is about to smash into an, for example, atmosphere-free planet (without looking).

However, it does seem that there is an internal force that tends to tear an object apart due to gradients in the curvature of space-time. I believe that this is what tore apart the Shoemaker-Levy 9 comet before it smashed into Jupiter. The easiest way for me to visualize this is to imagine a string of very small beebees heading toward a planet. The beebees that are closest to the planet are subjected to a larger amount of space-time curvature, so an increase in the distance between the beebees occurs with the closest-to-the-planet ones getting farther apart than the ones behind them. Now, instead of beebees it is a person (feet toward the planet), then the toes will tend to be pulled away from the head.

So, it seems that this gradient in curvature is the only method that one could use, when free falling, to detect the magnitude of curvature in one's local region space-time. Does this make sense?

Also, has anyone ever "constructed" a mass (e.g. an oddly-shaped planet), either mathematically or via simulation, that creates a region of space with a constant curvature of space-time?


Thanks much.
Bob
 
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  • #2
mmm.. you are saying using "tidal forces" (over a period of time of falling) to detect the magnitude of curvature in one's local region of spacetime. yeah, make sense to me (although me no expert in GR). Not sure whether you can only get the radial gradient from that
 
  • #3
Hi Bob, and welcome.

You seem to have grasped the essentials of tidal gravity and free falling observers. This paper ( attached) gives a good take on the 'river model' of GR.

Also, has anyone ever "constructed" a mass (e.g. an oddly-shaped planet), either mathematically or via simulation, that creates a region of space with a constant curvature of space-time?

Does it surprise you that the scalar curvature of the Schwarzschild space-time is zero - which is certainly constant ?
 

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  • #4
If you're up to the maths, the texts most people use are Gravitation by Misner, Thorne and Wheeler, or General Relativity by Wald. The first, IMO, is brilliant, eccentric, and at times funny (I guess I am that sad). It also goes to great pains to try and impart intuitive understanding of GR and curvature in general. So if you want some pictures -- go for MTW!
 
  • #5
As far as I understand, the only three types of geometry with constant curvature are elliptical, Euclidean and hyperbolic geometries. So starting with the metric tensor for each of these, if you went through and worked out the respective Einstein tensors, then by the EFE's find the energy-momentum tensor required for such a geometry.
 
  • #6
This gives you the distribution of energy and momentum i.e. your planet
 

FAQ: Gradients in the curvature of space-time

What is a gradient in the curvature of space-time?

A gradient in the curvature of space-time refers to the change in the curvature of space and time over a particular distance. It is a measure of how strongly space and time are warped in a given region.

How is the curvature of space-time measured?

The curvature of space-time is measured using mathematical equations, specifically the Einstein field equations, which describe the relationship between the curvature of space-time and the distribution of matter and energy in the universe.

What causes gradients in the curvature of space-time?

Gradients in the curvature of space-time are caused by the presence of massive objects, such as planets, stars, and galaxies. These objects create a distortion in the fabric of space-time, which is perceived as a gradient by other objects in the vicinity.

How does the concept of gradients in the curvature of space-time relate to Einstein's theory of general relativity?

Einstein's theory of general relativity states that the force of gravity is a result of the curvature of space and time caused by massive objects. Gradients in the curvature of space-time are a fundamental aspect of this theory, as they explain how the presence of matter and energy affects the fabric of the universe.

Can gradients in the curvature of space-time be observed?

Yes, gradients in the curvature of space-time can be observed indirectly through the effects they have on the motion of objects in the universe. For example, the bending of light around massive objects, known as gravitational lensing, is a result of the gradient in the curvature of space-time caused by these objects.

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