No, I would call it a reference frame, this might be big, depending from the curvature.Chalnoth said:In curved space-time, there is no speed limit between objects separated by some distance. The speed of light limitation is only a limitation at a single point.
If you measure and you measure from your point of view 0.5c than you measure 0.5c. I expect out there the same equations. I can see the coordinate system. I can transform. GRT doesn't mean that everything is relative, it just means that it makes it more complicated to transform (compared with SRT).That is, the speed limit in General Relativity is the statement that nothing can outrun a beam of light.
The reason for this is that in General Relativity, there is no single definition of relative speed at different points. There are many possible choices and no way to say which is better. What this means is that you can write down your equations one way and say that points A and B are moving away from one another at 0.5c, and then write them down another way and say they're moving away at 2.0c. So there's just no way to answer your question.
Omega0 said:If you measure and you measure from your point of view 0.5c than you measure 0.5c.
Omega0 said:If I go to the limit c then my measurement ends.
Omega0 said:I see a logical break in "comoving coordinates"...
There is no unambiguous way to make a global reference frame. And even if you decide upon a specific global reference frame, you still have multiple options for defining speed.Omega0 said:No, I would call it a reference frame, this might be big, depending from the curvature.
It is fundamentally impossible to directly measure the speed of a faraway object when spacetime is curved. The speed has to be interpreted, and that interpretation varies depending upon how you write down your equations.Omega0 said:If you measure and you measure from your point of view 0.5c than you measure 0.5c. I expect out there the same equations. I can see the coordinate system. I can transform. GRT doesn't mean that everything is relative, it just means that it makes it more complicated to transform (compared with SRT).
If I go to the limit c then my measurement ends. After the limit c I still have a universe which I can't measure, right? When the object would move avay < c I could measure something...
Sorry but I see a logical break in "comoving coordinates"...
That's the point, how we measure this? How me measure which speed have current objects relative to us?PeterDonis said:Measure what? Local measurements are not a problem, and the limit of c applies to those. But how would you measure how fast an object a billion light years away is moving relative to you?
Maybe I gett something wrong but are not that comoving coordinates the same as SR inertial coordinates from a point of say a galaxy?I think you have a misunderstanding of them. They're perfectly logical, but they certainly don't work the same as inertial coordinates in SR do. It seems to me that you are expecting them to work like SR inertial coordinates; that is bound to lead to confusion.
Omega0 said:That's the point, how we measure this? How me measure which speed have current objects relative to us?
Omega0 said:how I can have an accelerating unviverse and dark energy if I can't measure the spead?
Omega0 said:are not that comoving coordinates the same as SR inertial coordinates from a point of say a galaxy?
Omega0 said:It is said (Liddle, An Introduction to Modern Cosmology) that effects of the expansion having effect only to objects millions of lightyears away.
Omega0 said:It something like in QM, the proton doesn't care about the electron mass since the electon charge is so dominant - but the mass is there, if so very very small
Okay.PeterDonis said:And the answer is that there is no way to measure the "speed" of an object a billion light years away from us, relative to us, because that concept is not well-defined.
Okay, this goes into the direction that I may unwrap the nots in my potentential misconception, thanks - but why does angular size play a role in an isotropic homogenieous universe? This should only play a role in a non-isotropic universe?Because the "acceleration" of the universe's expansion is not defined in terms of the "speed" of distant objects. It's defined in terms of the universe's scale factor and the fractional rate at which it increases. We measure the increase of the scale factor over time by making various measurements of the light we receive from distant objects: the redshift of the light, the angular size of the objects on the sky, and their brightness. The observed relationships between these measurements tell us how the scale factor of the universe has behaved over time.
This seems to be a misconception. Everything in the universe is bound to each other, in my point of view. The link can be broken but this demands to be out of the light cone. In my eyes it makes no sense to separate between local and global. If you are introducing a new coordinate system which you call "comoving coordinates" you are introducing something pretty interesting: You feel fine as you did with absolute space and time (or SRT). You have that expansion factor but who cares, we are in our "Local Group". Then we have the void. Now the expansion factor begins to work. Not before...No. Objects at rest in comoving coordinates will be moving away from us in SR inertial coordinates centered on us.
What this means is that objects close enough to use are not "comoving" in the global sense of the comoving coordinates used in cosmology; their motion relative to us is not determined by the expansion of the universe. For example, our "Local Group" of galaxies (our galaxy, the Andromeda galaxy, and a few other smaller ones like the Magellanic Clouds) are gravitationally bound to each other, so their relative motion is not due to the universe's expansion. To see objects whose motion relative to us is due to the universe's expansion, you have to look far enough away.
So we are back again to the roots: We introduce an absolute background. After we have left Galileo transforms and Newtons absolute time we construct physics on expanding space-time-coordinates?The expansion of the universe, in and of itself, is not a "force"; it's just the inertia of objects that were flying apart in the past. So objects which are gravitationally bound don't feel any small "force" pushing them apart.
Back again: Now a suddenly introduced "anti-gravitation influence" plays a role - but it is too small to matter.The accelerated expansion, due to dark energy, can be thought of as exerting a small "force" even on objects that are gravitationally bound, like the solar system or the galaxy; but on those scales it is way, way too small to matter.
Omega0 said:why does angular size play a role in an isotropic homogenieous universe?
Omega0 said:How to solve the problem of the Olbers paradoxon?
Omega0 said:Everything in the universe is bound to each other, in my point of view.
Omega0 said:If you are introducing a new coordinate system which you call "comoving coordinates" you are introducing something pretty interesting: You feel fine as you did with absolute space and time (or SRT).
Omega0 said:You have that expansion factor but who cares, we are in our "Local Group".
Omega0 said:After we have left Galileo transforms and Newtons absolute time we construct physics on expanding space-time-coordinates?
Omega0 said:Now a suddenly introduced "anti-gravitation influence" plays a role - but it is too small to matter.
Sorry, but this seems to me like a logical misconception.
If I imagine the perfect fluid, then the accelerated expansion works at any scale, regardless how small. But in contrast to the fluid, our universe is homogeneus only on very large scales. A galaxy is gravitationally bound and its average matter density is much larger than the matter density of the universe. So, I would have expected, that the accelerated expansion exerts zero force, not a very small one on a galaxy. Am I wrong?PeterDonis said:The accelerated expansion, due to dark energy, can be thought of as exerting a small "force" even on objects that are gravitationally bound, like the solar system or the galaxy; but on those scales it is way, way too small to matter.
timmdeeg said:I would have expected, that the accelerated expansion exerts zero force, not a very small one on a galaxy. Am I wrong?
timmdeeg said:According to Friedmann the dynamics of the the expansion of the universe depends on the amounts of matter density and lambda.
timmdeeg said:let's compare the effect of the expansion on the scale of a galaxy regarding two cases, both with the same matter denisity and lambda: (i) the universe is perfectly homogeneous and (ii) the universe shows a large-scale structure like ours. With (ii) we should distinguish the effect of the expansion on a galaxy and on a void of the same size.
Could you please explain the outcome?
timmdeeg said:There are two versions to explain why galaxies don't expand. Often people mention the gravitationally bound system, but others talk about overdensity. What is correct?
timmdeeg said:if two stars orbit each other in a distance of galaxy scale (other masses very far away), it's a gravitationally bound system then and one can hardly talk about overdensity.
Thanks for you answer. If I understand you correctly, this means that the Milky Way doesn't expand at all. And it should also mean that the 'force' which the dark energy exerts on all scales has zero (not marginal) effect on gravitationally bound systems.PeterDonis said:So you won't be able to see the effects of expansion on the scale of the Milky Way, because there are no pieces of matter actually moving on "comoving" worldlines, so their relative motion won't tell you anything about the expansion.
timmdeeg said:If I understand you correctly, this means that the Milky Way doesn't expand at all.
timmdeeg said:it should also mean that the 'force' which the dark energy exerts on all scales has zero (not marginal) effect on gravitationally bound systems.
timmdeeg said:I'm interested in this question, because I never understood this paper: http://arxiv.org/pdf/astro-ph/9803097v1.pdf
PeterDonis said:It is not correct to say that dark energy has zero effect. Dark energy does affect which worldlines are "comoving" ones, so it does affect (by a very small amount) how much the worldlines of objects in a gravitationally bound system like the Milky Way deviate from being "comoving". This effect can be thought of as a very small amount of tidal gravity.
Understand, thanks for providing a new insight!
Correct.PeterDonis said:That means the average gravitational influence of distant matter on local systems is zero, by the shell theorem.
That's what I wanted to say, obviously in the wrong way.Comoving coordinates do no such thing. They are just convenient to use in cosmology because observers who see the universe as homogeneous and isotropic, on average, are at rest in these coordinates. There is no claim about absolute space and time involved.
I think I understand that galaxies are bound gravitationally to each other.I didn't say the universe was not expanding in our local region. I said that the relative motion of galaxies in our Local Group is not due to that expansion, because those galaxies are gravitationally bound to each other. See above for more on how that works.
Sorry if didn't find the right words - I just wanted to say that it would be an logical issue to say that there is no (=0) influence to local systems.As I said above, we choose comoving coordinates because they are convenient: they make the description look simple so it's easier to work with.
It plays a role on large scales--large distances and long times. It is too small to matter on local scales and over short times. There's no logical problem.
It depends on what you mean, if you say "effect". As Peter Donis explained, gravitationally bound systems don't expand (not even tiny), but experience a tiny tidal force due to accelerated expansion (second derivative of the scale factor ##> 0##), which makes a difference.Omega0 said:To summarize: The effect locally is peanuts but its' existing.
Omega0 said:there is an influence which is really really small (http://arxiv.org/pdf/astro-ph/9803097v1.pdf).
Finny said:"From what point in time there was a possible velocity between point A and B > c?
Lineweaver and Davis have a really nice discussion in the 2005 Scientific American [available online]: Misconceptions about the Big Bang.
Finny said:the homogeneous and isotropic assumptions which lead to FLRW model expansion don't apply in a local, lumpy environment
Finny said:"...in our universe the expansion is accelerating, and that exerts a gentle outward force on bodies. Consequently bound bodies are slightly larger than they would be in a non accelerating universe...
Finny said:hasn't the CMBR source expansion resulted in a change of wavelength of about a thousand, that is from about 3,000 K to about 3K today...an expansion of about a thousand?
PeterDonis said:Yes. But the CMBR is not a locally bound system; it is very well approximated as a homogeneous and isotropic "fluid" of radiation filling the universe. So the overall dynamics of the expanding universe should describe the CMBR very well.
Finny said:merely wondering if Chronos' calculation wasn't wildly too big regarding the solar system in comparsion with such distant expansion
Finny said:"...Cooperstock et al computes that the influence of the cosmological expansion on the Earth's orbit asround the sun amounts to a growth by only one part in a septillion over the age of the Solar System."
Finny said:my comparison is not so good as his is in a much more recent timeframe. Mine started shortly after the big bang, his only 4.5B or so years ago...apples and oranges...
PeterDonis said:This calculation takes into account the fact that the solar system is a locally bound system. Chronos's calculation does not, which is why it gives a very different answer.
That makes a difference, but it still leaves a large variance between the expansion of the universe as a whole (which is, IIRC, about a factor of 2 over that time period) and that of the solar system (which is much, much, much less, as the Cooperstock calculation shows--see above).