Cosmological expansion effects

In summary, the mass enclosed in a sphere of 1.5*10^11 SI meters (approximately 1au) radius around the sun will not change due to the expansion of the universe. However, effects that are not being modeled by this simple model (like the radiation of the sun decreasing its mass) might contribute to the mass in this sphere.
  • #1
pervect
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In another thread, someone was talking about cosmological expansion effects on planetary orbits. (Actually it was about lunar orbits, but I think planetary orbits are more to the point).

Through a somewhat round-about path, I eventually got to thinking about the following question.

Suppose we look at a sphere that is 1.5*10^11 SI meters (approximately 1au) in radius around the sun. What happens to the total mass (Komar mass) enclosed inside this sphere due to the expansion of the universe?

I'm assuming that the metric is quasi-static so that the Komar mass exists. I don't think this is unreasonable (though I'm willing to listen to arguments that it is).

If "dark energy" is in the form of a cosmological constant, it seems to me that basically nothing should happen to this mass due to universal expansion. The only change should be due to effects that aren't being modeled by this simple model (like the radiation of the sun decreasing its mass).

I suppose that the dark matter might also contribute to the mass in this sphere, but I'm not sure how plausible this really is. Ned Wright seems to think that this is at least possible in his FAQ, but I'm not quite sure how it would be possible to have the dynamics of the solar system understood if there were significant amounts of dark matter around locally - unless it perfectly mimiced the distribution of normal matter, in which case I would expect it to continue to mimic the distribution of normal matter.

I don't see normal matter due to "cosmological background" (say, interstellar dust/radiation) contributing much to the mass in such a sphere, so I wouldn't expect much difference if this "background" mass disappeared.

The FAQ entry I mentioned:

Why doesn't the Solar System expand if the whole Universe is expanding?

This question is best answered in the coordinate system where the galaxies change their positions. The galaxies are receding from us because they started out receding from us, and the force of gravity just causes an acceleration that causes them to slow down, or speed up in the case of an accelerating expansion. Planets are going around the Sun in fixed size orbits because they are bound to the Sun. Everything is just moving under the influence of Newton's laws (with very slight modifications due to relativity). [Illustration] For the technically minded, Cooperstock et al. computes that the influence of the cosmological expansion on the Earth's orbit around the Sun amounts to a growth by only one part in a septillion over the age of the Solar System. This effect is caused by the cosmological background density within the Solar System going down as the Universe expands, which may or may not happen depending on the nature of the dark matter. The mass loss of the Sun due to its luminosity and the Solar wind leads to a much larger [but still tiny] growth of the Earth's orbit which has nothing to do with the expansion of the Universe. Even on the much larger (million light year) scale of clusters of galaxies, the effect of the expansion of the Universe is 10 million times smaller than the gravitational binding of the cluster.

On the average in the universe, the mass in such a constant-volume sphere should be going down as the universe expands, but I don't really see how this would happen in the solar system.
 
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  • #2
I do not understand the quoted part... After a quick look it seams that in the Cooperstock paper it is taken as an assumption that the scale factor may vary within the solar system. The computations are then based on this assumption:

However, it is reasonable to pose the question as to whether there is a cut–off at which systems below this scale do not partake of the expansion. It would appear that one would be hard put to justify a particular scale for the onset of expansion. Thus, in this debate, we are in agreement with Anderson (1995) that it is most reasonable to assume that the expansion does indeed proceed at all scales.

I was not able to find this Anderson paper, however. My understanding is that without an homogeneous and isotropic dark energy permeating the whole space at all scales above the Planck lenght, there should be a cut-off for the expansion of space. This should be determined as a function of some characteristic length at which matter distribution starts to be homogeneous and isotropic.

At that length there should be then a coupling between the cosmological solution and the Schwarzschild or axially-symmetric solution at smaller scales. I would guess that the galactic distribution of matter (and therefore an axially-symmetric solution), rather than the solar system, is the solution that has to be coupled to the cosmological one. I see no reason a priori to think that this coupling would imply an influence of the external metric on the internal one at arbitrary short distances.

Things are different, however, if there exists a homogeneous and isotropic distribution of dark energy at arbitrary small scales above the Planck length. I can imagine that this could imply an expansion of space at every scale, that may be however not noticeable within the solar system.

This is my personal view of this, that seams not to be the "standard" one. At least not the one of Anderson, Cooperstock and Wright. But I fail to see the arguments that may invalidate it.
 
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  • #3
This is a very interesting question.

The problem arises because in GR local gravitational orbits are calculated under the Schwarzschild solution to the GR field equation and cosmological expansion is a prediction of the cosmological solution of that field equation.

The question is how is the Schwarzschild solution, which tends to Minkowskian space-time as r tends to infinity, embedded in a cosmologically expanding space within space-time?

That all is not right with the statement that "cosmological expansion has no effect on local orbits" might be indicated by the Pioneer anomaly, (which is almost equal to cH) however the problem with a naive application of cosmic expansion to Pioneer is that it is being accelerated the wrong way - towards the Sun rather than away from it.

Garth
 
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  • #4
Garth said:
This is a very interesting question.

The problem arises because in GR local gravitational orbits are calculated under the Schwarzschild solution to the GR field equation and cosmological expansion is a prediction of the cosmological solution of that field equation.

The question is how is the Schwarzschild solution, which tends to Minkowskian space-time as r tends to infinity, embedded in a cosmologically expanding space within space-time?

There is a way to embed a Schwazschild solution in De-sitter space.

http://arxiv.org/abs/gr-qc/0602002

for instance, takes this approach.

The metric is

F := 1 -2M/r - [itex]\Lambda[/itex] r^2 / 3

ds^2 = F dt^2 - 1/F dr^2 - r^2(d [itex]\theta[/itex]^2 + sin([itex]\theta[/itex])^2 d [itex]\phi[/itex]^2)

The question is - is this actually the right metric to use to represent the solar system in an expanding universe?

One interesting thing about the above metric is that it has an actual horizion, where F=0 and therefore g_00 = 0, as long as [itex]\Lambda[/itex]>0. The standard FRW space-time always has g_00=1. On the surface, these metrics look different, but they are supposed to be representing similar things. Perhaps there is a simple coordinate transformation that transforms the above metric into the FRW form, but so far I haven't figured out if this is true.

I can two things for sure: that in an orthonormal basis of one-forms

w1=sqrt(F)dt, w2=1/sqrt(F)dr, w3=r, w4=r sin([itex]\theta[/itex])

that [itex]G_{(\mu)(\nu)}[/itex] = [itex]\Lambda[/itex] Diag(1,-1,-1,-1) with respect to the basis vectors

and that the above metric, if it is correct, makes the central mass have a truly static metric as long as [itex]\Lambda[/itex] is not a function of time, even though the De-sitter universe expands, because none of the metric coefficients are functions of time.

It was the fact that this metric was static that made me start to think about whether the mass enclosed in a sphere around the central mass in an expanding universe should be static.

As long as the universe is isotropic, I don't think it shouldn't matter what anything outside the sphere does. The net gravitational effect of a spherical shell should be zero inside the shell, regardless of whether or not the shell is expanding, by Birkhoff's theorem.

(Maybe I have to read the fine print of Birkhoff's theorem to make sure it applies to this situation with a cosmological constant, though).
 
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  • #5
Why should a Schwarzschild solution embedded in an FRW solution be realistic? The solar system is embedded into the non-homogeneous, non-isotropic, axially symmetric, rotating galaxy. What is the reason to neglect this?
 
  • #6
hellfire said:
Why should a Schwarzschild solution embedded in an FRW solution be realistic? The solar system is embedded into the non-homogeneous, non-isotropic, axially symmetric, rotating galaxy. What is the reason to neglect this?
The galaxy is also embedded in the local group, the Virgo cluster and our local super cluster. Apart from perturbations on the spherical symmetry the main question is how iscosmological expansion handed down at each of these scales. One answer, the standard one, is that it isn't, in regions of overdensity cosmological expansion becomes replaced by halo gravitational collapse.

Thank you Pervect. The Birkoff theorem only works for pressureless space, as DE is a form of negative pressure that might complicate matters a little.

Garth
 
  • #7
hellfire said:
Why should a Schwarzschild solution embedded in an FRW solution be realistic? The solar system is embedded into the non-homogeneous, non-isotropic, axially symmetric, rotating galaxy. What is the reason to neglect this?

I think that the position of the solar system in the galaxy would indeed have an effect. I think the effect should be small, but able to be calculated by purely Newtonian means - I don't think relativistic considerations should be significant.

The effects should basically be due to Newtonian tidal forces, if we neglect the motion. (I think we can neglect the effects of motion on the forces, though I can't actually prove this).

For a nearby mass of mass M', I'd expect tidal forces of -2GM'/r^3 in the direction pointing to the mass, and tidal compressive forces of +GM'/r^3 in the perpendicular directions.

Note that these tidal forces cancel each other out for a spherical distribution of mater as one would expect. But we aren't in a spherical distribution. Because we are on the edge of a disk, I would expect some small net tension in the plane of the galaxy, and net compression perpendicular to the galactic plane, though I haven't worked out the magnitude of the tidal forces due to the galaxy.

Because of the r^3 nature of tidal forces, I would expect that nearby galaxies would not produce significant tidal forces, and the "local groups" even less.

What I'm more interested in at the moment, though, is getting a handle on what the cosmological constant does (if anything) to solar system dynamics. It does seem reasonably clear from the literature that the effect is either a very very small change in orbits with time (Cooperstock) or even static (the Einstein-deSitter approach).
 
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What is cosmological expansion?

Cosmological expansion is the observed phenomenon in which the distance between galaxies and other celestial objects in the universe is increasing over time. This expansion is thought to be caused by the constant and uniform stretching of the fabric of space itself.

How is cosmological expansion measured?

Cosmological expansion is measured using various methods, including the redshift of light from distant galaxies, the cosmic microwave background radiation, and the observed relationship between the distance and recessional velocity of galaxies.

What is the role of dark energy in cosmological expansion?

Dark energy is believed to be the driving force behind the acceleration of cosmological expansion. It is a mysterious and unknown form of energy that makes up a large portion of the universe and counteracts the gravitational pull of matter, causing the expansion to accelerate.

What implications does cosmological expansion have for the fate of the universe?

The rate of cosmological expansion is a key factor in determining the ultimate fate of the universe. If the expansion continues to accelerate, it is likely that the universe will continue to expand indefinitely. However, if the expansion slows down or stops, it is possible that the universe could eventually collapse in a "Big Crunch" or reach a state of maximum entropy known as the "Big Freeze."

How does cosmological expansion impact our understanding of the universe?

Cosmological expansion has greatly influenced our understanding of the universe and its history. It has led to the development of the Big Bang theory, which describes the origin of the universe, and has helped scientists to understand the distribution and evolution of galaxies and other celestial objects. It also raises questions about the nature of dark energy and the ultimate fate of the universe.

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