A synchronous frame is a reference frame in which the time coordinate defines proper time for all co-moving observers. It is built by choosing some constant time hypersurface as an origin, such that has in every point a normal along the time line and a light cone with an apex in that point can be constructed; all interval elements on this hypersurface are space-like. A family of geodesics normal to this hypersurface are drawn and defined as the time coordinates with a beginning at the hypersurface. In terms of metric-tensor components
gik
g00=1, g0\alpha=0
where
\alpha=1,2,3.
\tau
cd\tau=\sqrt{g00
x\alpha+dx\alpha
The line element, with separated space and time coordinates, is:where a repeated Greek index within a term means summation by values 1, 2, 3. The interval between the events of signal arrival and its immediate reflection back at point A is zero (two events, arrival and reflection are happening at the same point in space and time). For light signals, the space-time interval is zero and thus setting
ds=0
dx0(1)=
| 1 | |
| g00 |
\left(-g0\alphadx\alpha-\sqrt{\left(g0\alphag0\beta-g\alphag00\right)dx\alphadx\beta}\right),
dx0(2)-dx0(1)=
| 2 | |
| g00 |
\sqrt{\left(g0\alphag0\beta-g\alphag00\right)dx\alphadx\beta}.
The respective proper time interval is obtained from the above relationship by multiplication by
\sqrt{g00
This is the required relationship that defines distance through the space coordinate elements.
It is obvious that such synchronization should be done by exchange of light signals between points. Consider again propagation of signals between infinitesimally close points A and B in Fig. 1. The clock reading in B which is simultaneous with the moment of reflection in A lies in the middle between the moments of sending and receiving the signal in B; in this moment if Alice's clock reads y0 and Bob's clock reads x0 then via Einstein Synchronization condition,
y0=
| (x0+dx0(1))+(x0+dx0(2)) | |
| 2 |
=x0+\tfrac{1}{2}\left(dx0(2)+dx0(1)\right)=x0+\Deltax0.
However, it is impossible, in general, to synchronize clocks along a closed contour: starting out along the contour and returning to the starting point one would obtain a Δx0 value different from zero. Thus, unambiguous synchronization of clocks over the whole space is impossible. An exception are reference frames in which all components g0α are zeros.
The inability to synchronize all clocks is a property of the reference frame and not of the spacetime itself. It is always possible in infinitely many ways in any gravitational field to choose the reference frame so that the three g0α become zeros and thus enable a complete synchronization of clocks. To this class are assigned cases where g0α can be made zeros by a simple change in the time coordinate which does not involve a choice of a system of objects that define the space coordinates.
In the special relativity theory, too, proper time elapses differently for clocks moving relatively to each other. In general relativity, proper time is different even in the same reference frame at different points of space. This means that the interval of proper time between two events occurring at some space point and the time interval between the events simultaneous with those at another space point are, in general, different.
Consider a rest (inertial) frame expressed in cylindrical coordinates
r'\phi',z'
t'
ds2=c2dt'2-dr'2-r'2d\phi'2-dz'2.
(r,\phi,z)
x0/c=t=t',x1=r=r',x2=\phi=\phi'-\Omegat',x3=z=z'
ds2=(c2-\Omega2r2)dt2-2\Omegar2d\phidt-dr2-r2d\phi2-dz2.
Of course, the rotating frame is valid only for
r<c/\Omega
g00=1-\Omega2r2/c2,
g02=-2\Omegar2/c,
g11=-1,
g22=-r2
g33=-1.
\Deltax0=-
| g0\alpha | |
| g00 |
dx\alpha=
| \Omegar2/c | |
| 1-\Omega2r2/c2 |
d\phi
can be used to synchronize clocks. However, along any closed curve, synchronization is impossible because
\oint\Deltax0=\oint
| d\phi\Omegar2/c | |
| 1-\Omega2r2/c2 |
≠ 0.
For instance, when
\Omegar/c\ll1
\oint\Deltax0=
| \Omega | |
| c |
\ointr2d\phi=\pm
| 2\Omega | |
| c |
S
where
S
The proper time element in the rotating frame is given by
d\tau=\sqrt{1-\Omega2r2/c2}dt=\sqrt{1-\Omega2r2/c2}d\tauaxis
indicating that time slows down as we move away from the axis. Similarly the spatial element can be calculated to find
dl=\left[dr2+
| r2d\phi2 | |
| 1-\Omega2r2/c2 |
+dz2\right]1/2.
At a fixed value of
r
z
dl=(1-\Omega2r2/c2)-1/2rd\phi
| 2\pi | |
| \sqrt{1-\Omega2r2/c2 |
which is greater than by
2\pi
can be rewritten in the form
where
is the three-dimensional metric tensor that determines the metric, that is, the geometrical properties of space. Equations give the relationships between the metric of the three-dimensional space
\gamma\alpha
gik
In general, however,
gik
\gamma\alpha
The tensor
-\gamma\alpha
g\alpha
gikgkl=
| i | |
| \delta | |
| l |
g\alphag\beta+g\alphag0=
| \alpha, | |
| \delta | |
| \gamma |
g0g\beta+g00g00=1.
Determining
g\alpha
This result can be presented otherwise by saying that
g\alpha
\gamma\alpha
The determinants g and
\gamma
gik
\gamma\alpha
In many applications, it is convenient to define a 3-dimensional vector g with covariant components
Considering g as a vector in space with metric
\gamma\alpha
g\alpha=\gamma\alphag\beta
From the third of, it follows
As concluded from, the condition that allows clock synchronization in different space points is that metric tensor components g0α are zeros. If, in addition, g00 = 1, then the time coordinate x0 = t is the proper time in each space point (with c = 1). A reference frame that satisfies the conditionsis called synchronous frame. The interval element in this system is given by the expressionwith the spatial metric tensor components identical (with opposite sign) to the components gαβ:In synchronous frame time, time lines are normal to the hypersurfaces t = const. Indeed, the unit four-vector normal to such a hypersurface ni = ∂t/∂xi has covariant components nα = 0, n0 = 1. The respective contravariant components with the conditions are again nα = 0, n0 = 1.
The components of the unit normal coincide with those of the four-vector u = dxi/ds which is tangent to the world line x1, x2, x3 = const. The u with components uα = 0, u0 = 1 automatically satisfies the geodesic equations:
| dui | |
| ds |
+
| i | |
| \Gamma | |
| kl |
ukul=
| i | |
| \Gamma | |
| 00 |
=0,
| \alpha | |
| \Gamma | |
| 00 |
| 0 | |
| \Gamma | |
| 00 |
These properties can be used to construct synchronous frame in any spacetime (Fig. 2). To this end, choose some spacelike hypersurface as an origin, such that has in every point a normal along the time line (lies inside the light cone with an apex in that point); all interval elements on this hypersurface are space-like. Then draw a family of geodesics normal to this hypersurface. Choose these lines as time coordinate lines and define the time coordinate t as the length s of the geodesic measured with a beginning at the hypersurface; the result is a synchronous frame.
An analytic transformation to synchronous frame can be done with the use of the Hamilton–Jacobi equation. The principle of this method is based on the fact that particle trajectories in gravitational fields are geodesics. The Hamilton–Jacobi equation for a particle (whose mass is set equal to unity) in a gravitational field iswhere S is the action. Its complete integral has the form:
Note that the complete integral contains as many arbitrary constants as the number of independent variables which in our case is
4
The gauge conditions do not fix the coordinate system completely and therefore are not a fixed gauge, as the spacelike hypersurface at
t=0
(\tilde{t},\tilde{x}\alpha)
\tilde{x}
\xii(\tilde{x})
gik(\tilde{x})
\tilde{x}
| (new) | |
| g | |
| ik |
(\tilde{x})
\tilde{x}
\xii(\acute{x})
\tilde{x}\alpha
For a more elementary geometrical explanation, consider Fig. 2. First, the synchronous time line ξ0 = t can be chosen arbitrarily (Bob's, Carol's, Dana's or any of an infinitely many observers). This makes one arbitrarily chosen function:
\xi0=f0\left(\tilde{x}1,\tilde{x}2,\tilde{x}3\right)
\xi\alpha=f\alpha\left(\tilde{x}1,\tilde{x}2,\tilde{x}3\right)
When discussing general solutions gαβ of the field equations in synchronous gauges, it is necessary to keep in mind that the gravitational potentials gαβ contain, among all possible arbitrary functional parameters present in them, four arbitrary functions of 3-space just representing the gauge freedom and therefore of no direct physical significance.
Another problem with the synchronous frame is that caustics can occur which cause the gauge choice to break down. These problems have caused some difficulties doing cosmological perturbation theory in synchronous frame, but the problems are now well understood. Synchronous coordinates are generally considered the most efficient reference system for doing calculations, and are used in many modern cosmology codes, such as CMBFAST. They are also useful for solving theoretical problems in which a spacelike hypersurface needs to be fixed, as with spacelike singularities.
Introduction of a synchronous frame allows one to separate the operations of space and time differentiation in the Einstein field equations. To make them more concise, the notationis introduced for the time derivatives of the three-dimensional metric tensor; these quantities also form a three-dimensional tensor. In the synchronous frame
\varkappa\alpha
\varkappa\alpha
| \alpha | |
| \varkappa | |
| \alpha |
| i | |
| \Gamma | |
| kl |
| \gamma | |
| λ | |
| \alpha\beta |
With the Christoffel symbols, the components Rik = gilRlk of the Ricci tensor can be written in the form:Dots on top denote time differentiation, semicolons (";") denote covariant differentiation which in this case is performed with respect to the three-dimensional metric γαβ with three-dimensional Christoffel symbols
| \gamma | |
| λ | |
| \alpha\beta |
\varkappa\equiv
| \alpha | |
| \varkappa | |
| \alpha |
| \gamma | |
| λ | |
| \alpha\beta |
| k | |
| R | |
| i |
=8\pik\left(
| k | |
| T | |
| i |
-
| 1 | |
| 2 |
| k | |
| \delta | |
| i |
T\right)
\varkappa\alpha
\varkappa\alpha
At the same time the matter filling the space cannot in general be at rest relative to the synchronous frame. This is obvious from the fact that particles of matter within which there are pressures generally move along lines that are not geodesics; the world line of a particle at rest is a time line, and thus is a geodesic in the synchronous frame. An exception is the case of dust (p = 0). Here the particles interacting with one another will move along geodesic lines; consequently, in this case the condition for a synchronous frame does not contradict the condition that it be comoving with the matter. Even in this case, in order to be able to choose a synchronously comoving frame, it is still necessary that the matter move without rotation. In the comoving frame the contravariant components of the velocity are u0 = 1, uα = 0. If the frame is also synchronous, the covariant components must satisfy u0 = 1, uα = 0, so that its four-dimensional curl must vanish:
ui;k-uk;i\equiv
| \partialui | |
| \partialxk |
-
| \partialuk | |
| \partialxi |
=0.
Use of the synchronous frame in cosmological problems requires thorough examination of its asymptotic behaviour. In particular, it must be known if the synchronous frame can be extended to infinite time and infinite space maintaining always the unambiguous labelling of every point in terms of coordinates in this frame.
It was shown that unambiguous synchronization of clocks over the whole space is impossible because of the impossibility to synchronize clocks along a closed contour. As concerns synchronization over infinite time, let's first remind that the time lines of all observers are normal to the chosen hypersurface and in this sense are "parallel". Traditionally, the concept of parallelism is defined in Euclidean geometry to mean straight lines that are everywhere equidistant from each other but in arbitrary geometries this concept can be extended to mean lines that are geodesics. It was shown that time lines are geodesics in synchronous frame. Another, more convenient for the present purpose definition of parallel lines are those that have all or none of their points in common. Excluding the case of all points in common (obviously, the same line) one arrives to the definition of parallelism where no two time lines have a common point.
Since the time lines in a synchronous frame are geodesics, these lines are straight (the path of light) for all observers in the generating hypersurface. The spatial metric is
dl2=\gamma\alphadx\alphadx\beta
\gamma
\gamma\alpha
{\vec\gamma}1
{\vec\gamma}2
{\vec\gamma}3
{\vec\gamma}1
{\vec\gamma}2
{\vec\gamma}3
\gamma=|{\vec\gamma}1 ⋅ ({\vec\gamma}2 x {\vec\gamma}3)|=\begin{vmatrix} \gamma11&\gamma12&\gamma13\\ \gamma21&\gamma22&\gamma23\\ \gamma31&\gamma32&\gamma33\end{vmatrix} =Vparallelepiped
\gamma
The Landau group have found that the synchronous frame necessarily forms a time singularity, that is, the time lines intersect (and, respectively, the metric tensor determinant turns to zero) in a finite time.
This is proven in the following way. The right-hand of the, containing the stress–energy tensors of matter and electromagnetic field,
| k | |
| T | |
| i |
=\left(p+\varepsilon\right) x uiuk+p
| k | |
| \delta | |
| i |
for matter
| 0 | |
| T | |
| 0 |
-
| 1 | |
| 2 |
T=
| 1 | |
| 2 |
\left(\varepsilon+3p\right)+
| \left(p+\varepsilon\right)v2 | |
| 1-v2 |
>0
for electromagnetic field
T=0,
| 0 | |
| T | |
| 0 |
={1\over2}\left(\epsilon0E2+
| 1 | |
| \mu0 |
B2\right)>0
Using the algebraic inequality
| \alpha | |
| \varkappa | |
| \beta |
| \beta | |
| \varkappa | |
| \alpha |
\geq
| 1 | |
| 3 |
| \alpha | |
| \left(\varkappa | |
| \alpha |
\right)2
| \partial | |
| \partialt |
| \alpha | ||
| \varkappa | + | |
| \alpha |
| 1 | |
| 6 |
\left(
| \alpha | |
| \varkappa | |
| \alpha |
\right)2\leq0
\left(
| \alpha | |
| \varkappa | |
| \alpha |
\right)2
| 1 | ||||||||
|
| \partial | |
| \partialt |
| \alpha | |
| \varkappa | |
| \alpha |
=-
| \partial | |
| \partialt |
| 1 | ||||||
|
| \alpha | |
| \varkappa | |
| \alpha |
>0
| \alpha | |
| \varkappa | |
| \alpha |
+infty
| \alpha | |
| \varkappa | |
| \alpha |
=\partialln\gamma/\partialt
\gamma
t6
| \alpha | |
| \varkappa | |
| \alpha |
<0
An idea about the space at the singularity can be obtained by considering the diagonalized metric tensor. Diagonalization makes the elements of the
\gamma\alpha
λ1,λ2
λ3
\gamma
λ1=0
\gamma\alpha
λ2,λ3
\gamma=0
\gamma=0
Geometrically, diagonalization is a rotation of the basis for the vectors comprising the matrix in such a way that the direction of basis vectors coincide with the direction of the eigenvectors. If
\gamma\alpha
\gamma
An analogy from geometrical optics is comparison of the singularity with caustics, such as the bright pattern in Fig. 3, which shows caustics formed by a glass of water illuminated from the right side. The light rays are an analogue of the time lines of the free-falling observers localized on the synchronized hypersurface. Judging by the approximately parallel sides of the shadow contour cast by the glass, one can surmise that the light source is at a practically infinite distance from the glass (such as the sun) but this is not certain as the light source is not shown on the photo. So one can suppose that the light rays (time lines) are parallel without this being proven with certainty. The glass of water is an analogue of the Einstein equations or the agent(s) behind them that bend the time lines to form the caustics pattern (the singularity). The latter is not as simple as the face of a parallelepiped but is a complicated mix of various kinds of intersections. One can distinguish an overlap of two-, one-, or zero-dimensional spaces, i.e., intermingling of surfaces and lines, some converging to a point (cusp) such as the arrowhead formation in the centre of the caustics pattern.
The conclusion that timelike geodesic vector fields must inevitably reach a singularity after a finite time has been reached independently by Raychaudhuri by another method that led to the Raychaudhuri equation, which is also called Landau–Raychaudhuri equation to honour both researchers.