So just so I understand, you want to show the following, given an arbitrary connection, does there exist a metric compatible with it and what does it look like? You don't care about the signature of the resulting metric, whether it is lorentzian or Riemannian?Jianbing_Shao said:Thanks!
From metric compatibility equation, we can use parallel propagator(defined in Sean Carroll' book) to express the metric with connection.
Then the difference between a metric compatible with a torsion free connection and the metric compatible with the same torsion free connection plus a torsion. in other words if the torsion part have effects on the metric compatible with the connection.
My original problem is just to find out that if an arbitrary connection have a metric compatible with it then we put them into the equation can make the equation work and if such connections do exist then why.
Thanks:renormalize said:Sorry, but I am unclear on what you are asking for mathematically. Rather than guess, can you please post the tensor equation (or equations) that you need to see proved?
Thanks!jbergman said:So just so I understand, you want to show the following, given an arbitrary connection, does there exist a metric compatible with it and what does it look like? You don't care about the signature of the resulting metric, whether it is lorentzian or Riemannian?
On the compatibility of Lorentz-metrics with linear connections on 4-dimensional manifolds
G.S. Hall, D.P. Lonie
This paper considers 4-dimensional manifolds upon which there is a Lorentz metric, h, and a symmetric connection and which are originally assumed unrelated. It then derives sufficient conditions on the metric and connection (expressed through the curvature tensor) for the connection to be the Levi-Civita connection of some (local) Lorentz metric, g, and calculates the relationship between g and h. Some examples are provided which help to assess the strength of the sufficient conditions derived.
Yes, you can always make this equation work!Jianbing_Shao said:So the question is : from the metric compatibility equation
$$\nabla_\rho g_{\mu\nu}=g_{\mu\nu,\rho}-g_{\lambda \nu}\gamma^\lambda_{\rho\mu}-g_{\mu\lambda}\gamma^\lambda_{\rho\nu}=0$$
If we choose an arbitrary connection ##\gamma^\lambda_{\rho\mu}(x)##, then if we always can find a metric field ##g_{\mu\nu}(x)## which can make this equation work.
It looks like you solved for ##\gamma## given ##g##. I think he was asking to go the other way, i.e., solve for ##g## given ##\gamma##.renormalize said:Yes, you can always make this equation work!
Using your metric-compatibility equation written in all-covariant (lower) indices, I begin by cyclically permuting those indices to get 3 versions of the same equation:$$0=g_{\mu\nu,\rho}-\gamma{}_{\nu\rho\mu}-\gamma{}_{\mu\rho\nu}\:,\qquad0=g_{\rho\mu,\nu}-\gamma{}_{\mu\nu\rho}-\gamma{}_{\rho\nu\mu}\:,\qquad0=g_{\nu\rho,\mu}-\gamma{}_{\rho\mu\nu}-\gamma{}_{\nu\mu\rho}\tag{1a,b,c}$$From these, I can form the linear-combination (eq.(1b)+eq.(1c)-eq.(1a))/2 and proceed to solve for the unique symmetric-piece of the general metric-compatible connection ##\gamma##:$$0=\frac{1}{2}\left(g_{\rho\mu,\nu}+g_{\nu\rho,\mu}-g_{\mu\nu,\rho}\right)-\frac{1}{2}\left(\gamma{}_{\mu\nu\rho}+\gamma{}_{\rho\mu\nu}-\gamma{}_{\nu\rho\mu}\right)-\frac{1}{2}\left(\gamma{}_{\rho\nu\mu}+\gamma{}_{\nu\mu\rho}-\gamma{}_{\mu\rho\nu}\right)$$$$=\left\{ \rho,\mu\nu\right\} -\frac{1}{2}\left(\gamma{}_{\rho\mu\nu}+\gamma{}_{\rho\nu\mu}\right)+\frac{1}{2}\left(\gamma{}_{\mu\rho\nu}-\gamma{}_{\mu\nu\rho}\right)+\frac{1}{2}\left(\gamma{}_{\nu\rho\mu}-\gamma{}_{\nu\mu\rho}\right)$$$$=\left\{ \rho,\mu\nu\right\} -\gamma{}_{\rho\{\mu\nu\}}+\frac{1}{2}\left(T_{\mu\rho\nu}+T_{\nu\rho\mu}\right)$$or:$$\gamma{}_{\rho\{\mu\nu\}}=\left\{ \rho,\mu\nu\right\} +\frac{1}{2}\left(T_{\mu\rho\nu}+T_{\nu\rho\mu}\right)\tag{2}$$Adding the identity ##\gamma{}_{\rho[\mu\nu]}\equiv\frac{1}{2}T_{\rho\mu\nu}## to eq.(2) gives finally the most general metric-compatible connection:$$\gamma{}_{\rho\mu\nu}=\left\{ \rho,\mu\nu\right\} +\frac{1}{2}\left(T_{\rho\mu\nu}+T_{\mu\rho\nu}+T_{\nu\rho\mu}\right)\tag{3}$$(Note that this is the same as the first equation in post #15 for the case of vanishing nonmetricity ##Q##.)
Since ##\left\{g,T\right\}## are already arbitrary fields, you cannot write down a more general metric-compatible connection than that given by eq.(3)! The point here is that, starting from your condition for metric-compatibility, we derive and exhibit in eq.(3) the unique form of the most general compatible connection ##\gamma##, strictly using tensor algebra (no integration or differentiation!). That means there is no need to "find a metric field...that can make this work": it works for all metric fields ##g## and all torsion fields ##T## by construction. That's the meaning of the statement that one may arbitrarily specify both the connection ##\gamma## (or equivalently ##\left\{T,Q\right\}##) and the metric ##g## on any spacetime, with no worry that this could somehow lead to an inconsistency or restrictive condition involving the metric and connection.
I understand that's what the OP would like to see. But they cannot hope to solve for the metric ##g## from the metric-compatibility condition ##\nabla_{\rho}g_{\mu\nu}\equiv g_{\mu\nu,\rho}-g_{\lambda\nu}\gamma_{\rho\mu}^{\lambda}-g_{\mu\lambda}\gamma_{\rho\nu}^{\lambda}=0## because, in spite of its appearance, it is not a partial differential equation for ##g##!jbergman said:It looks like you solved for ##\gamma## given ##g##. I think he was asking to go the other way, i.e., solve for ##g## given ##\gamma##.
Thanks a lot!renormalize said:I understand that's what the OP would like to see. But they cannot hope to solve for the metric ##g## from the metric-compatibility condition ##\nabla_{\rho}g_{\mu\nu}\equiv g_{\mu\nu,\rho}-g_{\lambda\nu}\gamma_{\rho\mu}^{\lambda}-g_{\mu\lambda}\gamma_{\rho\nu}^{\lambda}=0## because, in spite of its appearance, it is not a partial differential equation for ##g##!
Thanks!jbergman said:It looks like you solved for ##\gamma## given ##g##. I think he was asking to go the other way, i.e., solve for ##g## given ##\gamma##.
Jianbing_Shao said:Thanks a lot!
But I can not agree with your conclusion. Sean Carroll using parallel propagator $$P(x,x_0;l;\gamma)= P\exp\left(\int_x^{x_0}-\gamma^\nu_{\mu\rho}(x) dx^\rho\right)$$
to describe the parallel trsport of a vector along a particular path ##l##. Simillarly we also can use parallel propagator ##P(x,x_0;l;\gamma)## generated with connection ##\gamma^\nu_{\mu\rho}(x)## to describe the metric ##g##:
Because a metric can be difined with a basis ##e##, ##g=e e^T##. and the parallel transport of a basis ##e(x_0)## can be described using parallel propagator.
$$e(x)=P(x,x_0;l;\gamma)e(x_0)$$
so:
$$g(x)=P(x,x_0;l;\gamma)g(x_0)P^T(x,x_0;l;\gamma)$$
This expression is right because if you differentiate this formula, you can find that we can get metric compatibility equation.
So the problem here is that the parallel propagator ##P(x,x_0;l;\gamma)## is path dependent if the curvature of the connection ##\gamma^\nu_{\mu\rho}(x)## is not zero, then the movement of metric in most cases is also path dependent, this means that we probably can not get a metric field.
So just like the situations in a scalar field, you differentiate a scalar field only can get a zero curl vector field, when you integrate a non-zero curl vector field, you can find a property of path dependence so can not find a scalar field corresponding to a non-zero curl vector field. Only when we try to describe a scalar field using the integration of a vector field, then we can find the property of path dependence.
I'm not sure this is a fruitful approach. We know that curvature in general is not an obstacle to defining a metric so building a metric with this propagator seems to only work in spaces without curvature.Jianbing_Shao said:Thanks a lot!
But I can not agree with your conclusion. Sean Carroll using parallel propagator $$P(x,x_0;l;\gamma)= P\exp\left(\int_x^{x_0}-\gamma^\nu_{\mu\rho}(x) dx^\rho\right)$$
to describe the parallel trsport of a vector along a particular path ##l##. Simillarly we also can use parallel propagator ##P(x,x_0;l;\gamma)## generated with connection ##\gamma^\nu_{\mu\rho}(x)## to describe the metric ##g##:
Because a metric can be difined with a basis ##e##, ##g=e e^T##. and the parallel transport of a basis ##e(x_0)## can be described using parallel propagator.
$$e(x)=P(x,x_0;l;\gamma)e(x_0)$$
so:
$$g(x)=P(x,x_0;l;\gamma)g(x_0)P^T(x,x_0;l;\gamma)$$
This expression is right because if you differentiate this formula, you can find that we can get metric compatibility equation.
So the problem here is that the parallel propagator ##P(x,x_0;l;\gamma)## is path dependent if the curvature of the connection ##\gamma^\nu_{\mu\rho}(x)## is not zero, then the movement of metric in most cases is also path dependent, this means that we probably can not get a metric field.
So just like the situations in a scalar field, you differentiate a scalar field only can get a zero curl vector field, when you integrate a non-zero curl vector field, you can find a property of path dependence so can not find a scalar field corresponding to a non-zero curl vector field. Only when we try to describe a scalar field using the integration of a vector field, then we can find the property of path dependence.
Your assertion here is simply false. If a metric-compatible connection ##\Gamma## could somehow lead to a path-dependent metric tensor ##g##, don't you think that fact would rate at least a mention in every textbook on general relativity? Have you made any attempt to calculate this yourself? It's not hard to do for infinitesimal transport, as I now demonstrate.Jianbing_Shao said:So the problem here is that the parallel propagator ##P(x,x_0;l;\gamma)## is path dependent if the curvature of the connection ##\gamma^\nu_{\mu\rho}(x)## is not zero, then the movement of metric in most cases is also path dependent, this means that we probably can not get a metric field.
Thanks!renormalize said:Your assertion here is simply false. If a metric-compatible connection ##\Gamma## could somehow lead to a path-dependent metric tensor ##g##, don't you think that fact would rate at least a mention in every textbook on general relativity? Have you made any attempt to calculate this yourself? It's not hard to do for infinitesimal transport, as I now demonstrate.
}\right)\tag{7}$$This difference accumulates to ##\Sigma_{i}\delta_{P_{i}}V## as ##V## is parallel-transported along multiple, linked infinitesimal displacements. If those displacements form a closed path such as a parallelogram, it’s well-known that ##\Sigma_{i}\delta_{P_{i}}V\propto RVdA##, where ##R## is the curvature tensor and ##dA## is the infinitesimal area enclosed by the path. Parallel transport of a vector ##V## between any two points in curved spacetime does indeed depend on the particular path linking those points. This fact evidently motivates your claim that the metric tensor itself is similarly path-dependent.
The upshot is: the metric ##g## is never path-dependent for an any connection ##\Gamma## that it is compatible with that metric (##\nabla_{\sigma}g^{\mu\nu}##=0).
Your questions are interesting because you are making me think about these questions in new ways. With a metric compatible connection, I think, parallel transport can change the direction of vectors along different paths but not lengths! So maybe that is the answer to your riddle.Jianbing_Shao said:Thanks!
So at first we all acknowledge that just as Sean Carroll pointed the parallel propagator ##P(x,x_0)## can solve the parallel transport equation. then if the curvature of the connection is not zero, the parallel propagator ##P(x,x_0)## is path dependent,
it is just because this that I try to find out if there exist connections which can make the movement of a metric is path dependent, But if you only start from a metric field, because a field just implicitly means that the change of the metric is path independent. so if you demand that ##(8)=(9)##, it will put some restrictions on the choose of the connection.
So I start from parallel propagator generated with an arbitrary connection, and the metric can be expressed as: ##g(x)=P(x,x_0)g(x_0)P^T(x,x_0)##, conbine with ##\partial_\mu P(x,x_0)=\gamma_\mu P(x,x_0)##. we can get:
$$\partial_\rho g(x)= \partial_\rho P(x,x_0)g(x_0)P^T(x,x_0)+P(x,x_0)g(x_0)\partial_\rho P^T(x,x_0)$$
$$=\gamma_\rho g(x)+(\gamma_\rho g(x))^T$$
This is just the metric compatibility equation. So ##\gamma_\mu## is compatible with metric ##g(x)##. because the parallel propagator ##P(x,x_0)## is possibly path dependent, so why the metric defined with ##P(x,x_0)## can not be path dependent.
I also can give an example from which we can get a strange result. If a connection is defined in such a way: ##\gamma_\mu= \partial_\mu G(x)G^{-1}(x)## ,(##G(x)## is an invertible matrix function ) , then an easy calculation can reveal that the curvature of ##\gamma_\mu## is zero. and the parallel propagator is very simple ##P(x,x_0)=G(x)G^{-1}(x_0)##, it is path independent. so we can get a metric field:
$$g(x)=G(x)G^{-1}(x_0)g(x_0)(G^{-1})^T(x_0)G^T(x)$$
it obviously is not always a flat metric. so it seems that there are many non-flat metric fields who is compatible with a zero curvature connection. This result seems to be very strange in GR. but I can not find any problem in the calculations, So where is the problem?
Do you see the inconsistency here? First you say: "So I start from parallel propagator generated with an arbitrary connection...", yet you conclude with: "So ##\gamma_\mu## is compatible with metric ##g(x)##." But a truly arbitrary connection ##\gamma_\mu## is not metric-compatible because it can include nonmetricity ##Q##. There is a flaw in your derivation: can you spot it?Jianbing_Shao said:So I start from parallel propagator generated with an arbitrary connection, and the metric can be expressed as: ##g(x)=P(x,x_0)g(x_0)P^T(x,x_0)##, conbine with ##\partial_\mu P(x,x_0)=\gamma_\mu P(x,x_0)##. we can get:
$$\partial_\rho g(x)= \partial_\rho P(x,x_0)g(x_0)P^T(x,x_0)+P(x,x_0)g(x_0)\partial_\rho P^T(x,x_0)$$
$$=\gamma_\rho g(x)+(\gamma_\rho g(x))^T$$
This is just the metric compatibility equation. So ##\gamma_\mu## is compatible with metric ##g(x)##. because the parallel propagator ##P(x,x_0)## is possibly path dependent, so why the metric defined with ##P(x,x_0)## can not be path dependent.
Thanks!renormalize said:Do you see the inconsistency here? First you say: "So I start from parallel propagator generated with an arbitrary connection...", yet you conclude with: "So ##\gamma_\mu## is compatible with metric ##g(x)##." But a truly arbitrary connection ##\gamma_\mu## is not metric-compatible because it can include nonmetricity ##Q##. There is a flaw in your derivation: can you spot it?
Thanks a lot!jbergman said:Your questions are interesting because you are making me think about these questions in new ways. With a metric compatible connection, I think, parallel transport can change the direction of vectors along different paths but not lengths! So maybe that is the answer to your riddle.
But as @renormalize said there exists connections from which you can't construct metric compatible connections because they don't satisfied a required algebraic relationship.
I'm too lazy to try and work out the details via the propagator.
Since this is obviously false, your reasoning that leads to it must be wrong somewhere. I suggest taking a look at post #49.Jianbing_Shao said:there exist infinite metric field different from flat metric ##\eta## compatible with a zero curvature connection
Your answer is dancing around the mathematical inconsistency I pointed out in post #49. Below are the step-by-step details of your argument in post #47, as I understand them. I claim your deductive reasoning is manifestly self-contradictory:Jianbing_Shao said:Just because the parallel propagator is also called path ordered product, So when we talked about the parallel propagator, a particular path ##l## have been chosen at first. when I say "So ##\gamma_\mu## is compatible with metric ##g(x)##." I mean that metric ##g(x)## only well defined on the path we choose. it is not a global metric field.
Thanks!renormalize said:Your answer is dancing around the mathematical inconsistency I pointed out in post #49. Below are the step-by-step details of your argument in post #47, as I understand them. I claim your deductive reasoning is manifestly self-contradictory:
I ask you to please clarify whether: 1) I have misunderstood your logic or made a mistake in one or more of my steps; if so could you please post your corrected version? Or, 2) you agree your logic is flawed and post #47 really proves nothing about the possible path-dependence of the metric tensor. Thanks!
- Premise: ##\gamma## is an arbitrary, general connection ##\Rightarrow Q\neq0##
- ##g(x)=P(x,x_0,\gamma)g(x_0)P^{T}(x,x_0,\gamma)##
- ##\partial_{\mu}g(x)=\partial_{\mu}P(x,x_0,\gamma)g(x_0)P^{T}(x,x_0,\gamma)+P(x,x_0,\gamma)g(x_0)\partial_{\mu}P^{T}(x,x_0,\gamma)##
- ##\partial_{\mu}P(x,x_0,\gamma)=\gamma_{\mu}(x)P(x,x_0,\gamma)##
- ##\partial_{\mu}g(x)=\gamma_{\mu}(x)P(x,x_0,\gamma)g(x_{0})P^{T}(x,x_0,\gamma)+P(x,x_0,\gamma)g(x_0)P^{T}(x,x_0,\gamma)\gamma^{T}_{\mu}(x)##
- ##\partial_{\mu}g(x)=\gamma_{\mu}(x)g(x)+g(x)\gamma^{T}_{\mu}(x)##
- ##\partial_{\mu}g(x)-\gamma_{\mu}(x)g(x)-g(x)\gamma^{T}_{\mu}(x)=0##
- Conclusion: ##\nabla_\mu g(x)=0\Rightarrow Q=0## Contradiction!
So I can express my idea in such a way: From metric compatibility equation##\nabla_\mu g(x)=0##, if choose a particular path ##l##, we can construct a metric confined on path ##l## ##g(x)=P(x,x_0;l;\gamma)g(x_0)P^T(x,x_0;l;\gamma)##, here ##g(x)## and ##\gamma## are compatible with each other. Here ##\gamma## can be arbitrary.renormalize said:Your answer is dancing around the mathematical inconsistency I pointed out in post #49. Below are the step-by-step details of your argument in post #47, as I understand them. I claim your deductive reasoning is manifestly self-contradictory:
I ask you to please clarify whether: 1) I have misunderstood your logic or made a mistake in one or more of my steps; if so could you please post your corrected version? Or, 2) you agree your logic is flawed and post #47 really proves nothing about the possible path-dependence of the metric tensor. Thanks!
- Premise: ##\gamma## is an arbitrary, general connection ##\Rightarrow Q\neq0##
- ##g(x)=P(x,x_0,\gamma)g(x_0)P^{T}(x,x_0,\gamma)##
- ##\partial_{\mu}g(x)=\partial_{\mu}P(x,x_0,\gamma)g(x_0)P^{T}(x,x_0,\gamma)+P(x,x_0,\gamma)g(x_0)\partial_{\mu}P^{T}(x,x_0,\gamma)##
- ##\partial_{\mu}P(x,x_0,\gamma)=\gamma_{\mu}(x)P(x,x_0,\gamma)##
- ##\partial_{\mu}g(x)=\gamma_{\mu}(x)P(x,x_0,\gamma)g(x_{0})P^{T}(x,x_0,\gamma)+P(x,x_0,\gamma)g(x_0)P^{T}(x,x_0,\gamma)\gamma^{T}_{\mu}(x)##
- ##\partial_{\mu}g(x)=\gamma_{\mu}(x)g(x)+g(x)\gamma^{T}_{\mu}(x)##
- ##\partial_{\mu}g(x)-\gamma_{\mu}(x)g(x)-g(x)\gamma^{T}_{\mu}(x)=0##
- Conclusion: ##\nabla_{\mu}g(x)=0\Rightarrow Q=0## Contradiction!
How can you possibly be unsure of this? The definition of metric compatibility is: ##\nabla_{\mu}g\equiv 0##. The definition of of nonmetricity is: ##Q_{\mu}\equiv\nabla_{\mu}g##. So by definition, the statements "##\gamma_{\mu}## is metric compatible" and "##Q_{\mu}\neq 0##" are mutually exclusive; i.e., they can never be true simultaneously. Your self-contradictory statement above seems to be based on your feelings about how things should work, or might work, instead of accepting the logical conclusion that your understanding of path-dependent metrics is simply wrong.Jianbing_Shao said:So I am not sure that the metric compatiblility equation can necesserily result in the conclusion ##Q=0##.
No, the only condition that the connection needs to satisfy is metric compatibility. Compatibility guarantees that, unlike every other parallel-transported tensor, the metric tensor remains path-independent under transport. That's what I proved in post #46. I ask that you please re-read that post and take the effort to understand it. Realizing that the metric is the only inherently path-independent tensor-field should eliminate your concerns that motivated this thread. (Or if you find an error in that proof, please do let me know!)Jianbing_Shao said:If we try to find a global metric field compatible with the connection ##\gamma##, To two arbitrary path ##l## and ##l'## connect point ##x## and ##x_0##. we demand that:$$
P(x,x_0;l;\gamma)g(x_0)P^T(x,x_0;l;\gamma)=P(x,x_0;l';\gamma)g(x_0)P^T(x,x_0;l';\gamma)$$Then ##g(x)## can be a global metric field. this condition obviously put some restraints on the choose of the connection. and not all connection field can fulfill this condition.
Thanks a lot!renormalize said:No, the only condition that the connection needs to satisfy is metric compatibility. Compatibility guarantees that, unlike every other parallel-transported tensor, the metric tensor remains path-independent under transport. That's what I proved in post #46. I ask that you please re-read that post and take the effort to understand it. Realizing that the metric is the only inherently path-independent tensor-field should eliminate your concerns that motivated this thread. (Or if you find an error in that proof, please do let me know!)
Did you read and absorb post #46, as I asked you too? It proves that:Jianbing_Shao said:If you are sure that an arbitrary connection can compatible with a metric field defined in the whole space. as I noted above you obviously can prove that:
$$P(x,x_0;l;\gamma)g(x_0)P^T(x,x_0;l;\gamma))=P(x,x_0;l';\gamma)g(x_0)P^T(x,x_0;l';\gamma))$$
In fact I have constructed a global metric field from a connection. and It seemed that the path independence is related to the cuvature of the connection. and In this question I think perhaps there is no need to classify different kind of connection.
Thanks!renormalize said:Did you read and absorb post #46, as I asked you too? It proves that:
- All tensor fields, including the metric, are path-dependent under parallel transport for a general connection that includes nonmetricity.
- But if the nonmetricity vanishes (i.e., the connection is metric compatible, but can still include torsion) the metric becomes the one and only tensor field that is path independent under transport, even in curved spacetime. All other tensor fields remain path-dependent.
It's frustrating when you continue to make these statements about what you "think". What matters is what you can prove! The whole point of my post #46 is to demonstrate (prove!) that the metric ##g## is unchanged by parallel-transport through an infinitesimal-distance along a path by any metric-compatible connection ##\Gamma## (see eq.(10)), regardless of the curvature or torsion. So I must cease commenting in this thread unless you do me the courtesy of one of the following:Jianbing_Shao said:I think it perhaps a conbination of rotation invariance of metric and curvature determine the property of path dependence of metric.