Gödel metric

The Gödel metric is an exact solution of the Einstein field equations in which the stress-energy tensor contains two terms, the first representing the matter density of a homogeneous distribution of swirling dust particles, and the second associated with a nonzero cosmological constant (see lambdavacuum solution). It is also known as the Gödel solution.

This solution has many strange properties, discussed below. Its definition is somewhat artificial (the value of the cosmological constant must be carefully chosen to match the density of the dust grains), but this spacetime is regarded as an important pedagogical example.

The solution was found in 1949 by Kurt Gödel.

Definition

Like any other Lorentzian spacetime, the Gödel solution is defined by giving the metric tensor in terms of some local coordinate chart. In terms of the original chart, we have

$ds^2=\; frac\{1\}\{2omega^2\}\; ,\; left(-left(dt\; +\; exp(x)\; ,\; dz\; right)^2\; +\; dx^2\; +\; dy^2\; +\; 1/2\; ,\; exp(2x),\; dz^2\; right)$

where $omega$ is a nonzero real constant, which turns out to be the angular velocity, as measured by a nonspinning observers riding any one of the dust grains, of nearby dust grains.

Properties

To study the properties of the Gödel solution, we can adopt the frame field (dual to the coframe read off the metric as given above)

$vec\{e\}\_0\; =\; sqrt\{2\}\; omega\; ,\; partial\_t$

$vec\{e\}\_1\; =\; sqrt\{2\}\; omega\; ,\; partial\_x$

$vec\{e\}\_2\; =\; sqrt\{2\}\; omega\; ,\; partial\_y$

$vec\{e\}\_3\; =\; 2\; omega\; ,\; left(exp(-x)\; ,\; partial\_z\; -\; ,\; partial\_t\; right)$

This frame defines a family of inertial observers who are comoving with the dust grains. However, computing the Fermi-Walker derivatives with respect to $vec\{e\}\_0$ shows that the spatial frames are spinning about $vec\{e\}\_2$ with angular velocity $-omega$. It follows that the nonspinning inertial frame comoving with the dust particles is

$vec\{f\}\_0\; =\; vec\{e\}\_0$

$vec\{f\}\_1\; =\; cos(omega\; t)\; ,\; vec\{e\}\_1\; -\; sin(omega\; t)\; ,\; vec\{e\}\_3$

$vec\{f\}\_2\; =\; vec\{e\}\_2$

$vec\{f\}\_3\; =\; sin(omega\; t)\; ,\; vec\{e\}\_1\; +\; cos(omega\; t)\; ,\; vec\{e\}\_3$

Matter tensor

The components of the Einstein tensor (with respect to either frame above) are

$G^\{hat\{a\}hat\{b\}\}\; =\; omega^2\; ,\; operatorname\{diag\}\; (-1,1,1,1)\; +\; 2\; omega^2\; ,\; operatorname\{diag\}\; (1,0,0,0)$

Here, the first term is characteristic of a lambdavacuum solution and the second term is characteristic of a pressureless perfect fluid or dust solution. Notice that the cosmological constant is carefully chosen to partially cancel the matter density of the dust.

Topology

The Gödel spacetime is a rare example of a regular (singularity-free) solution of the Einstein field equation. The chart given here (the original chart of Gödel) is geodesically complete but singularity free; therefore, it is a global chart, and the spacetime is diffeomorphic to R⁴, and therefore simply connected.

Invariants

The curvature invariants of the Gödel spacetime are remarkable. We'll mention just one feature.

In any Lorentzian spacetime, the fourth-rank Riemann tensor is a multilinear operator on the four dimensional space of tangent vectors (at some event), but a linear operator on the six-dimensional space of bivectors at that event. Accordingly it has a characteristic polynomial, whose roots are the eigenvalues. In the Gödel spacetime, these eigenvalues are extremely simple:

• triple eigenvalue zero,
• double eigenvalue -$omega^2$,
• simple eigenvalue $omega^2$.

Killing vectors

This spacetime admits a remarkable five dimensional Lie algebra of Killing vectors, which can be generated by time translation $partial\_t$, two spatial translations $partial\_y,\; ;\; partial\_z$, plus two further Killing vector fields,

$partial\_x\; -\; z\; ,\; partial\_z$

$-2\; exp(-x)\; ,\; partial\_t\; +\; z\; ,\; partial\_x\; +\; left(exp(-2x)\; -z^2/2\; right)\; ,\; partial\_z$

The isometry group acts transitively (since we can translate in $t,y,z$, and using the fourth vector we can move along $x$ as well), so the spacetime is homogeneous. However, it is not isotropic, as we shall see.

It is obvious from the generators just given that the slices $x=x\_0$ admit a transitive abelian three dimensional transformation group, so a quotient of the solution can reinterpreted as a stationary cylindrically symmetric solution. Less obviously, the slices $y=y\_0$ admit an SL(2,R) action, and the slices $t=t\_0$ admit a Bianchi III (c.f. the fourth Killing vector field). We can restate this by saying that our symmetry group includes as three dimensional subgroups examples of Bianchi types I, III and VIII. Four of the five Killing vectors, as well as the curvature tensor, do not depend upon the coordinate y. Indeed, the Gödel solution is the Cartesian product of a factor R with a three-dimensional Lorentzian manifold (signature -++).

It can be shown that the Gödel solution is, up to local isometry, the only perfect fluid solution of the Einstein field equation admitting a five dimensional Lie algebra of Killing vectors.

Petrov type and Bel decomposition

The Weyl tensor of the Gödel solution has Petrov type D. This means that for an appropriately chosen observer, the tidal forces have Coulomb form.

To study the tidal forces in more detail, we compute the Bel decomposition of the Riemann tensor into three pieces, the tidal or electrogravitic tensor (which represents tidal forces), the magnetogravitic tensor (which represents spin-spin forces on spinning test particles and other gravitational effects analogous to magnetism), and the topogravitic tensor (which represents the spatial sectional curvatures).

Interestingly enough, observers comoving with the dust particles find that the tidal tensor (with respect to $vec\{u\}\; =\; vec\{e\}\_0$, which components evaluated in our frame) has the form

$\{Eleft[vec\{u\}\; right]\}\_\{hat\{m\}hat\{n\}\}\; =\; omega^2\; ,\; operatorname\{diag\}(1,0,1)$

That is, they measure isotropic tidal tension orthogonal to the distinguished direction $partial\_y$.

The gravitomagnetic tensor vanishes identically

$\{Bleft[vec\{u\}\; right]\}\_\{hat\{m\}hat\{n\}\}\; =\; 0$

This is an artifact of the unusual symmetries of this spacetime, and implies that the putative "rotation" of the dust does not have the gravitomagnetic effects usually associated with the gravitational field produced by rotating matter.

The principal Lorentz invariants of the Riemann tensor are

$R\_\{abcd\}\; ,\; R^\{abcd\}\; =\; 12\; omega^4,\; ;\; R\_\{abcd\}\; \{\{\}^star\; R\}^\{abcd\}\; =\; 0$

The vanishing of the second invariant means that some observers measure no gravitomagnetism, which of course is consistent with what we just said. The fact that the first invariant (the Kretschmann invariant) is constant reflects the homogeneity of the Gödel spacetime.

Rigid rotation

The frame fields given above are both inertial, $nabla\_\{vec\{e\}\_0\}\; vec\{e\}\_0\; =\; 0$, but the vorticity vector of the timelike geodesic congruence defined by the timelike unit vectors is

$-omega\; vec\{e\}\_2$

This means that the world lines of nearby dust particles are twisting about one another. Furthermore, the shear tensor of the congruence $vec\{e\}\_0$ vanishes, so the dust particles exhibit rigid rotation.

Optical effects

If we study the past light cone of a given observer, we find that null geodesics moving orthogonally to $partial\_y$ spiral inwards toward the observer, so that if he looks radially, he sees the other dust grains in progressively time-lagged positions. However, the solution is stationary, so it might seem that an observer riding on a dust grain will not see the other grains rotating about himself. However, recall that while the first frame given above (the $vec\{e\}\_j$) appears static in our chart, the Fermi-Walker derivatives show that in fact is spinning with respect to gyroscopes. The second frame (the $vec\{f\}\_j$) appears to spinning in our chart, but in fact it is gyrostabilized, and of course a nonspinning inertial observer riding on a dust grain will indeed see the other dust grains rotating clockwise with angular velocity $omega$ about his axis of symmetry. It turns out that in addition, optical images are expanded and sheared in the direction of rotation.

If a nonspinning inertial observer looks along his axis of symmetry, he sees his coaxial nonspinning inertial peers apparently nonspinning with respect to himself, as we would expect.

Shape of absolute future

According to Hawking and Ellis, another remarkable feature of this spacetime is the fact that, if we suppress the inessential y coordinate, light emitted from an event on the world line of a given dust particle spirals outwards, forms a circular cusp, then spiral inwards and reconverges at a subsequent event on the world line of the original dust particle. This means that observers looking orthogonally to the $vec\{e\}\_2$ direction can see only finitely far out, and also see themselves at an earlier time.

The cusp is a nongeodesic closed null curve. (See the more detailed discussion below using an alternative coordinate chart.)

Closed timelike curves

Because of the homogeneity of the spacetime and the mutual twisting of our family of timelike geodesics, it is more or less inevitable that the Gödel spacetime should have closed timelike curves (CTC's). Indeed, there are CTCs through every event in the Gödel spacetime. This causal anomaly seems to have been secretly regarded as the whole point of the model by Gödel himself, who allegedly spent the last two decades of his life searching for a proof that death could be cheated, and apparently felt that this solution provided the desired proof. This strange conviction came to light decades after his death, when his personal papers were examined by a startled astronomer..

A more rational interpretation of Gödel's motives is that he was striving to (and arguably succeeded in) proving that Einstein's equations of spacetime are not consistent with what we intuitively understand time to be (i.e. that it passes and the past no longer exists), much as he, conversely, succeeded with his Incompleteness Theorems in showing that intuitive mathematical concepts could not be completely described by formal mathematical systems of proof. See the book A World Without Time (ISBN 0465092942).

Globally nonhyperbolic

If the Gödel spacetime admitted any boundaryless spatial hyperslices (e.g. a Cauchy surface), any such CTC would have to intersect it an odd number of times, contradicting the fact that the spacetime is simply connected. Therefore, this spacetime is not globally hyperbolic.

A cylindrical chart

In this section, we introduce another coordinate chart for the Gödel solution, in which some of the features mentioned above are easier to see.

Derivation

Gödel did not explain how he found his solution, but there are in fact many possible derivations. We will sketch one here, and at the same time verify some of the claims made above.

Start with a simple frame in a cylindrical type chart, featuring two undetermined functions of the radial coordinate:

$vec\{e\}\_0=partial\_t,\; ;\; vec\{e\}\_1=partial\_z,\; ;\; vec\{e\}\_2=partial\_r,\; ,\; vec\{e\}\_4=frac\{1\}\{b(r)\}\; ,\; left(-a(r)\; ,\; partial\_t\; +\; partial\_phi\; right)$

Here, we think of the timelike unit vector field $vec\{e\}\_0$ as tangent to the world lines of the dust particles, and their world lines will in general exhibit nonzero vorticity but vanishing expansion and shear. Let us demand that the Einstein tensor match a dust term plus a vacuum energy term. This is equivalent to requiring that it match a perfect fluid; i.e., we require that the components of the Einstein tensor, computed with respect to our frame, take the form

$G^\{hat\{i\}hat\{j\}\}\; =\; mu\; ,\; operatorname\{diag\}(1,0,0,0)\; +\; p\; ,\; operatorname\{diag\}(0,1,1,1)$

This gives the conditions

$b^\{primeprimeprime\}\; =\; frac\{b^\{primeprime\}\; ,\; b^\{prime\}\}\{b\},\; ;\; left(a^prime\; right)^2\; =\; 2\; ,\; b^\{primeprime\}\; ,\; b$

Plugging these into the Einstein tensor, we see that in fact we now have $mu\; =\; p$. The simplest nontrivial spacetime we can construct in this way evidently would have this coefficient be some nonzero but constant function of the radial coordinate. Specifically, with a bit of foresight, let us choose $mu\; =\; omega^2$. This gives

$b(r)\; =\; frac\{sinh(sqrt\{2\}\; omega\; ,r)\}\{sqrt(2)\; omega\},\; ;\; a(r)\; =\; frac\{cosh(sqrt\{2\}\; omega\; r)\}\{omega\}\; +\; c$

Finally, let us demand that this frame satisfy

$vec\{e\}\_3\; =\; frac\{1\}\{r\}\; ,\; partial\_phi\; +\; O\; left(frac\{1\}\{r^2\}\; right)$

This gives $c=-1/omega$, and our frame becomes

$vec\{e\}\_0=partial\_t,\; ;\; vec\{e\}\_1=partial\_z,\; ;\; vec\{e\}\_2=partial\_r,\; ;\; vec\{e\}\_3\; =\; frac\{\; sqrt\{2\}\; omega\; \}\{\; sinh(sqrt\{2\}\; omega\; r\; )\; \}\; ,\; partial\_phi\; -\; frac\{sqrt\{2\}sinh(sqrt\{2\}\; omega\; r)\}\{1+cosh(sqrt\{2\}\; omega\; r)\}\; ,\; partial\_t$

Appearance of the light cones

From the metric tensor we find that the vector field $partial\_phi$, which is of course spacelike for small radii, becomes null at $r=r\_c$ where

$r\_c\; =\; frac\{operatorname\{arccosh\}(3)\}\{sqrt\{2\}\; omega\}$

Here the covector $dt$ also becomes null (tangent to the light cone). The circle $r\; =\; r\_c$ is a closed null curve, but not a null geodesic.

Examining the frame above, we can see that the coordinate $z$ is inessential; our spacetime is the direct product of a factor R with a signature -++ three-manifold. Suppressing $z$ in order to focus our attention on this three-manifold, let us examine how the appearance of the light cones changes as we travel out from the axis of symmetry $r=0$:

As we approach the critical radius, the cones become tangent to the coordinate plane $t=0$, and also become tangent to the closed null curve:

A congruence of closed timelike curves

At the critical radius $r\; =\; r\_c$, the vector field $partial\_phi$ becomes null. For larger radii, it is timelike. Thus, corresponding to our symmetry axis we have a timelike congruence comprised of circles and corresponding to certain observers. This congruence is however only defined outside the cylinder $r=r\_c$.

This is not a geodesic congruence; rather, each observer in this family must maintain a constant acceleration in order to hold his course. Observers with smaller radii must accelerate harder; as $r\; rightarrow\; r\_c$ the magnitude of acceleration diverges, which is of course just what we should expect, given that $r=r\_c$ is a null curve.

Null geodesics

If we examine the past light cone of an event on the axis of symmetry, we find the following picture:

Recall that vertical coordinate lines in our chart represent the world lines of the dust particles, but despite their straight appearance in our chart, the congruence formed by these curves has nonzero vorticity, so the world lines are actually twisting about each other. The fact that the null geodesics spiral inwards in the manner shown above means that when our observer looks radially outwards, he sees nearby dust particles, not at their current locations, but at their earlier locations. This is just what we would expect if the dust particles are in fact rotating about one another.

Note that the null geodesics are of course geometrically straight; in the figure, they appear to be spirals only because the coordinates are "rotating" in order to permit the dust particles to appear stationary.

The absolute future

According to Hawking and Ellis (see monograph cited below), all light rays emitted from an event on the symmetry axis reconverge at a later event on the axis, with the null geodesics forming a circular cusp (which is a null curve, but not a null geodesic), something like two kissing Hershey's Kisses:

This implies that in the Gödel lambdadust solution, the absolute future of each event has a character very different from what we might naively expect!

Cosmological Interpretation

Following Gödel, we can interpret the dust particles as galaxies, so that the Gödel solution becomes a cosmological model of a rotating universe. Because this model exhibits no Hubble expansion, it is certainly not a realistic model of the universe in which we live, but can be taken as illustrating an alternative universe which would in principle be allowed by general relativity (if one admits the legitimacy of a nonzero cosmological constant).

We have seen that observers lying on the y axis (in the original chart) see the rest of the universe rotating clockwise about that axis. However, the homogeneity of the spacetime shows that the direction but not the position of this "axis" is distinguished.

Some have interpreted the Gödel universe as a counterexample to Einstein's hopes that general relativity should exhibit some kind of Mach principle, citing the fact that the matter is rotating (world lines twisting about each other) in a manner sufficient to pick out a preferred direction, although with no distinguished axis of rotation.

Others take Mach principle to mean some physical law tying the definition of nonspinning inertial frames at each event to the global distribution and motion of matter everywhere in the universe, and say that because the nonspinning inertial frames are precisely tied to the rotation of the dust in just the way such a Mach principle would suggest, this model does accord with Mach's ideas.

Many other exact solutions which can be interpreted as cosmological models of rotating universes are known. See the book by Ryan and Shepley for some of these generalizations.

See also

• van Stockum dust, for another rotating dust solution with (true) cylindrical symmetry,
• dust solution, an article about dust solutions in general relativity.

References

• G.Dautcourt and M. Abdel-Megied, Revisiting the Light Cone of the Goedel Universe. arXiv. Retrieved on November 12., 2005.
• Stephani, Hans; Kramer, Dietrich; MacCallum, Malcom; Hoenselaers, Cornelius; Hertl, Eduard (2003). Exact Solutions to Einstein's Field Equations. 2nd ed., Cambridge: Cambridge University Press. ISBN 0-521-46136-7. See section 12.4 for the uniqueness theorem.
• Ryan, M. P.; and Shepley, L. C. (1975). Homogeneous Relativistic Cosmologies. Princeton: Princeton University Press. ISBN 0-691-08153-0.
• Hawking, Stephen; and Ellis, G. F. R. (1973). The Large Scale Structure of Space-Time. Cambridge: Cambridge University Press. ISBN 0-521-09906-4. See section 5.7 for a classic discussion of CTC's in the Gödel spacetime. Warning: in Fig. 31, the light cones do indeed tip over but they also widen, so that vertical coordinate lines are always timelike; indeed, these represent the world lines of the dust particles so they are timelike geodesics.
• Gödel, K. (1949). "An example of a new type of cosmological solution of Einstein's field equations of gravitation". Rev. Mod. Phys. 21 447–450.