Schwarzschild metric
General relativity  

G_{\mu \nu} + \Lambda g_{\mu \nu}= {8\pi G\over c^4} T_{\mu \nu}


Fundamental concepts




In Einstein's theory of general relativity, the Schwarzschild metric (also known as the Schwarzschild vacuum or Schwarzschild solution) is the solution to the Einstein field equations that describes the gravitational field outside a spherical mass, on the assumption that the electric charge of the mass, angular momentum of the mass, and universal cosmological constant are all zero. The solution is a useful approximation for describing slowly rotating astronomical objects such as many stars and planets, including Earth and the Sun. The solution is named after Karl Schwarzschild, who first published the solution in 1916.
According to Birkhoff's theorem, the Schwarzschild metric is the most general spherically symmetric, vacuum solution of the Einstein field equations. A Schwarzschild black hole or static black hole is a black hole that has no charge or angular momentum. A Schwarzschild black hole is described by the Schwarzschild metric, and cannot be distinguished from any other Schwarzschild black hole except by its mass.
The Schwarzschild black hole is characterized by a surrounding spherical surface, called the event horizon, which is situated at the Schwarzschild radius, often called the radius of a black hole. Any nonrotating and noncharged mass that is smaller than its Schwarzschild radius forms a black hole. The solution of the Einstein field equations is valid for any mass M, so in principle (according to general relativity theory) a Schwarzschild black hole of any mass could exist if conditions became sufficiently favorable to allow for its formation.
Contents
 The Schwarzschild metric 1
 History 2
 Singularities and black holes 3
 Alternative coordinates 4
 Flamm's paraboloid 5
 Orbital motion 6
 Symmetries 7
 Quotes 8
 See also 9
 Notes 10
 References 11
The Schwarzschild metric
In Schwarzschild coordinates, the line element for the Schwarzschild metric has the form
 c^2 {d \tau}^{2} = \left(1  \frac{r_s}{r} \right) c^2 dt^2  \left(1\frac{r_s}{r}\right)^{1} dr^2  r^2 \left(d\theta^2 + \sin^2\theta \, d\varphi^2\right),
where
 \tau is the proper time (time measured by a clock moving along the same world line with the test particle),
 c is the speed of light,
 t is the time coordinate (measured by a stationary clock located infinitely far from the massive body),
 r is the radial coordinate (measured as the circumference, divided by 2π, of a sphere centered around the massive body),
 θ is the colatitude (angle from North, in units of radians),
 φ is the longitude (also in radians), and
 r_s is the Schwarzschild radius of the massive body, a scale factor which is related to its mass M by r_{s} = 2GM/c^{2}, where G is the gravitational constant.^{[1]}
The analogue of this solution in classical Newtonian theory of gravity corresponds to the gravitational field around a point particle.^{[2]}
In practice, the ratio r_{s}/r is almost always extremely small. For example, the Schwarzschild radius r_{s} of the Earth is roughly 8.9 mm, while the Sun, which is 3.3×10^{5} times as massive^{[3]} has a Schwarzschild radius of approximately 3.0 km. Even at the surface of the Earth, the corrections to Newtonian gravity are only one part in a billion. The ratio only becomes large close to black holes and other ultradense objects such as neutron stars.
The Schwarzschild metric is a solution of Einstein's field equations in empty space, meaning that it is valid only outside the gravitating body. That is, for a spherical body of radius R the solution is valid for r > R. To describe the gravitational field both inside and outside the gravitating body the Schwarzschild solution must be matched with some suitable interior solution at r = R.^{[4]}
History
The Schwarzschild solution is named in honor of Karl Schwarzschild, who found the exact solution in 1915 and published it in 1916,^{[5]} a little more than a month after the publication of Einstein's theory of general relativity. It was the first exact solution of the Einstein field equations other than the trivial flat space solution. Schwarzschild died shortly after his paper was published, as a result of a disease he contracted while serving in the German army during World War I.^{[6]}
Johannes Droste in 1916^{[7]} independently produced the same solution as Schwarzschild, using a simpler, more direct derivation.^{[8]}
In the early years of general relativity there was a lot of confusion about the nature of the singularities found in the Schwarzschild and other solutions of the Einstein field equations. In Schwarzschild's original paper, he put what we now call the event horizon at the origin of his coordinate system.^{[9]} In this paper he also introduced what is now known as the Schwarzschild radial coordinate (r in the equations above), as an auxiliary variable. In his equations, Schwarzschild was using a different radial coordinate that was zero at the Schwarzschild radius.
A more complete analysis of the singularity structure was given by David Hilbert^{[10]} in the following year, identifying the singularities both at r = 0 and r = r_{s}. Although there was general consent that the singularity at r = 0 was a 'genuine' physical singularity, the nature of the singularity at r = r_{s} remained unclear.^{[11]}
In 1921 Lemaître coordinates) to the same effect and was the first to recognize that this implied that the singularity at r = r_{s} was not physical. In 1939 Howard Robertson showed that a free falling observer descending in the Schwarzschild metric would cross the r = r_{s} singularity in a finite amount of proper time even though this would take an infinite amount of time in terms of coordinate time t.^{[11]}
In 1950, Schwarzschild, K. (1916). "Über das Gravitationsfeld eines Massenpunktes nach der Einsteinschen Theorie".


 Schwarzschild, K. (1916). "Über das Gravitationsfeld einer Kugel aus inkompressibler Flüssigkeit".
 Flamm, L. (1916). "Beiträge zur Einstein'schen Gravitationstheorie".
 Adler, R.; Bazin, M.; Schiffer, M. (1975). Introduction to General Relativity (2nd ed.).
 Landau, L. D.; Lifshitz, E. M. (1951). The Classical Theory of Fields.
 Misner, C. W.; Thorne, K. S.; Wheeler, J. A. (1970). Gravitation.
 Weinberg, S. (1972). Gravitation and Cosmology: Principles and Applications of the General Theory of Relativity.
 Taylor, E. F.; Wheeler, J. A. (2000). Exploring Black Holes: Introduction to General Relativity.
 Heinzle, J. M.; Steinbauer, R. (2002). "Remarks on the distributional Schwarzschild geometry".
 Foukzon, J. (2008). "Distributional Schwarzschild Geometry from nonsmooth regularization via Horizon".

 Text of the original paper, in Wikisource
 Translation: Antoci, S.; Loinger, A. (1999). "On the gravitational field of a mass point according to Einstein's theory".
 A commentary on the paper, giving a simpler derivation: Bel, L. (2007). "Über das Gravitationsfeld eines Massenpunktesnach der Einsteinschen Theorie".
References
 ^ (Landau & Liftshitz 1975).
 ^ Ehlers, J. (1997). "Examples of Newtonian limits of relativistic spacetimes".
 ^ Tennent, R.M., ed. (1971). Science Data Book.
 ^ Frolov, Valeri. Introduction to Black Hole Physics. Oxford. p. 168.
 ^ Schwarzschild, K. (1916). "Über das Gravitationsfeld eines Massenpunktes nach der Einsteinschen Theorie".
 ^ .
 ^ Droste, J. (1917). "The field of a single centre in Einstein's theory of gravitation, and the motion of a particle in that field" (PDF).
 ^ Kox, A. J. (1992). "General Relativity in the Netherlands:19151920". In Eisenstaedt, J.; Kox, A. J. Studies in the History of General Relativity.
 ^ Brown, K. (2011). Reflections On Relativity.
 ^ Hilbert, David (1924). "Die Grundlagen der Physik". Mathematische Annalen (SpringerVerlag) 92 (12): 1–32.
 ^ ^{a} ^{b} ^{c} ^{d} Earman, J. (1999). "The Penrose–Hawking singularity theorems: History and Implications". In Goenner, H. The expanding worlds of general relativity.
 ^ Synge, J. L. (1950). "The gravitational field of a particle".
 ^ Szekeres, G. (1960). "On the singularities of a Riemannian manifold".
 ^ Kruskal, M. D. (1960). "Maximal extension of Schwarzschild metric".
 ^ Hughston, L.P.; Tod, K.P. (1990). An introduction to general relativity.
 ^ Brill, D. (19 January 2012). "Black Hole Horizons and How They Begin". Astronomical Review.
 ^ Eddington, A. S. (1924). The Mathematical Theory of Relativity (2nd ed.).
Notes
 Deriving the Schwarzschild solution
 Reissner–Nordström metric (charged, nonrotating solution)
 Kerr metric (uncharged, rotating solution)
 Kerr–Newman metric (charged, rotating solution)
 Black hole, a general review
 Schwarzschild coordinates
 Kruskal–Szekeres coordinates
 Eddington–Finkelstein coordinates
 Gullstrand–Painlevé coordinates
 Lemaitre coordinates (Schwarzschild solution in synchronous coordinates)
 Frame fields in general relativity (Lemaître observers in the Schwarzschild vacuum)
See also
"Es ist immer angenehm, über strenge Lösungen einfacher Form zu verfügen." (It is always pleasant to have exact solutions in simple form at your disposal.) – Karl Schwarzschild, 1916.
Quotes
The group of isometries of the Schwarzschild metric is the subgroup of the tendimensional Poincaré group which takes the time axis (trajectory of the star) to itself. It omits the spatial translations (three dimensions) and boosts (three dimensions). It retains the time translations (one dimension) and rotations (three dimensions). Thus it has four dimensions. Like the Poincaré group, it has four connected components: the component of the identity; the time reversed component; the spatial inversion component; and the component which is both time reversed and spatially inverted.
Symmetries
Noncircular orbits, such as Mercury's, dwell longer at small radii than would be expected classically. This can be seen as a less extreme version of the more dramatic case in which a particle passes through the event horizon and dwells inside it forever. Intermediate between the case of Mercury and the case of an object falling past the event horizon, there are exotic possibilities such as "knifeedge" orbits, in which the satellite can be made to execute an arbitrarily large number of nearly circular orbits, after which it flies back outward.
A particle orbiting in the Schwarzschild metric can have a stable circular orbit with r > 3r_s. Circular orbits with r between 3r_s/2 and 3r_s are unstable, and no circular orbits exist for r<3r_s/2. The circular orbit of minimum radius 3r_s/2 corresponds to an orbital velocity approaching the speed of light. It is possible for a particle to have a constant value of r between r_s and 3r_s/2, but only if some force acts to keep it there.
Orbital motion
whose solution is Flamm's paraboloid.
 w(r) = \int \frac{\mathrm{d}r}{\sqrt{\frac{r}{r_{s}}1}} = 2 r_{s} \sqrt{\frac{r}{r_{s}} 1} + \mbox{constant}
yields an integral expression for w(r):
 \mathrm{d}s^2 = \left(1\frac{r_{s}}{r} \right)^{1} \mathrm{d}r^2 + r^2\mathrm{d}\phi^2,
Comparing this with the Schwarzschild metric in the equatorial plane (θ = π/2) at a fixed time (t = constant, dt = 0)
 \mathrm{d}s^2 = \left[ 1 + \left(\frac{\mathrm{d}w}{\mathrm{d}r}\right)^2 \right] \mathrm{d}r^2 + r^2\mathrm{d}\phi^2,
Letting the surface be described by the function w= w(r), the Euclidean metric can be written as
 \mathrm{d}s^2 = \mathrm{d}w^2 + \mathrm{d}r^2 + r^2 \mathrm{d}\phi^2.\,
Flamm's paraboloid may be derived as follows. The Euclidean metric in the cylindrical coordinates (r, φ, w) is written
Thus, Flamm's paraboloid is useful for visualizing the spatial curvature of the Schwarzschild metric. It should not, however, be confused with a gravity well. No ordinary (massive or massless) particle can have a worldline lying on the paraboloid, since all distances on it are spacelike (this is a crosssection at one moment of time, so any particle moving on it would have an infinite velocity). Even a tachyon would not move along the path that one might naively expect from a "rubber sheet" analogy: in particular, if the dimple is drawn pointing upward rather than downward, the tachyon's path still curves toward the central mass, not away. See the gravity well article for more information.
 dw^2 + dr^2 + r^2 d\varphi^2 = c^2 d\tau^2 = \frac{dr^2}{1  \frac{r_s}{r}} + r^2 d\varphi^2
This surface has the property that distances measured within it match distances in the Schwarzschild metric, because with the definition of w above,
 w = 2 \sqrt{r_{s} \left( r  r_{s} \right)}.
The spatial curvature of the Schwarzschild solution for r>r_s can be visualized as the graphic shows. Consider a constant time equatorial slice through the Schwarzschild solution (θ = π/2, t = constant) and let the position of a particle moving in this plane be described with the remaining Schwarzschild coordinates (r, φ). Imagine now that there is an additional Euclidean dimension w, which has no physical reality (it is not part of spacetime). Then replace the (r, φ) plane with a surface dimpled in the w direction according to the equation (Flamm's paraboloid)
Flamm's paraboloid
In table above, some shorthand has been introduced for brevity. The speed of light c has been set to one. The notation d\Omega^2= d\theta^2+\sin(\theta)^2 d\phi^2 is used for the metric of a two dimensional sphere. Moreover, in each entry R and T denote alternative choices of radial and time coordinate for the particular coordinates. Note, the R and/or T may vary from entry to entry.
Coordinates  Line element  Notes  Features 

EddingtonFinkelstein coordinates (ingoing)  \left(1\frac{r_s}{r} \right) dv^2  2 dv dr  r^2 d\Omega^2 
regular at horizon extends across future horizon 

EddingtonFinkelstein coordinates (outgoing)  \left(1\frac{r_s}{r} \right) du^2 + 2 du dr  r^2 d\Omega^2 
regular at horizon extends across past horizon 

Gullstrand–Painlevé coordinates  \left(1\frac{r_s}{r} \right)dT^2 2\sqrt{\frac{r_s}{r}} dT dr  dr^2r^2d\Omega^2  regular at horizon  
Isotropic coordinates  \frac{(1\frac{r_s}{4R})^{2}}{(1+\frac{r_s}{4R})^{2}}{d t}^2  \left(1+\frac{r_s}{4R}\right)^{4}(dx^2+dy^2+dz^2)  R = \sqrt{ x^2 + y^2 + z^2 }^{[17]}  isotropic lightcones on constant time slices 
KruskalSzekeres coordinates  \frac{4r_s^3}{r}e^{r/r_s}(dT^2  dR^2) r^2 d\Omega^2,  T^2  R^2 = \left(1\frac{r}{r_s}\right)e^{r/r_s} 
regular at horizon Maximally extends to full spacetime 
Lemaitre coordinates  dT^{2}  \frac{r_{s}}{r} dR^{2} r^{2}d\Omega^{2}  r = \left[\frac{3}{2}(RT)\right]^{2/3}r_{s}^{1/3}  regular at horizon 
The Schwarzschild solution can be expressed in a range of different choices of coordinates besides the Schwarzschild coordinates used above. Different choices tend to highlight different features of the solution. The table below shows some popular choices.
Alternative coordinates
The Schwarzschild solution, taken to be valid for all r > 0, is called a Schwarzschild black hole. It is a perfectly valid solution of the Einstein field equations, although it has some rather bizarre properties. For r < r_{s} the Schwarzschild radial coordinate r becomes timelike and the time coordinate t becomes spacelike. A curve at constant r is no longer a possible worldline of a particle or observer, not even if a force is exerted to try to keep it there; this occurs because spacetime has been curved so much that the direction of cause and effect (the particle's future light cone) points into the singularity. The surface r = r_{s} demarcates what is called the event horizon of the black hole. It represents the point past which light can no longer escape the gravitational field. Any physical object whose radius R becomes less than or equal to the Schwarzschild radius will undergo gravitational collapse and become a black hole.^{[16]}
At r = 0 the curvature becomes infinite, indicating the presence of a singularity. At this point the metric, and spacetime itself, is no longer welldefined. For a long time it was thought that such a solution was nonphysical. However, a greater understanding of general relativity led to the realization that such singularities were a generic feature of the theory and not just an exotic special case.
 R^{\alpha\beta\gamma\delta} R_{\alpha\beta\gamma\delta} = \frac{12 {r_s}^2}{r^6} = \frac{48 G^2 M^2}{c^4 r^6} \,.
The case r = 0 is different, however. If one asks that the solution be valid for all r one runs into a true physical singularity, or gravitational singularity, at the origin. To see that this is a true singularity one must look at quantities that are independent of the choice of coordinates. One such important quantity is the Kretschmann invariant, which is given by
The singularity at r = r_{s} divides the Schwarzschild coordinates in two disconnected patches. The exterior Schwarzschild solution with r > r_{s} is the one that is related to the gravitational fields of stars and planets. The interior Schwarzschild solution with 0 < r < r_{s}, which contains the singularity at r = 0, is completely separated from the outer patch by the singularity at r = r_{s}. The Schwarzschild coordinates therefore give no physical connection between the two patches, which may be viewed as separate solutions. The singularity at r = r_{s} is an illusion however; it is an instance of what is called a coordinate singularity. As the name implies, the singularity arises from a bad choice of coordinates or coordinate conditions. When changing to a different coordinate system (for example Lemaitre coordinates, Eddington–Finkelstein coordinates, Kruskal–Szekeres coordinates, Novikov coordinates, or Gullstrand–Painlevé coordinates) the metric becomes regular at r = r_{s} and can extend the external patch to values of r smaller than r_{s}. Using a different coordinate transformation one can then relate the extended external patch to the inner patch.^{[15]}
The Schwarzschild solution appears to have singularities at r = 0 and r = r_{s}; some of the metric components "blow up" at these radii. Since the Schwarzschild metric is only expected to be valid for radii larger than the radius R of the gravitating body, there is no problem as long as R > r_{s}. For ordinary stars and planets this is always the case. For example, the radius of the Sun is approximately 700,000 km, while its Schwarzschild radius is only 3 km.
Singularities and black holes
Progress was only made in the 1960s when the more exact tools of differential geometry entered the field of general relativity, allowing more exact definitions of what it means for a Lorentzian manifold to be singular. This led to definitive identification of the r = r_{s} singularity in the Schwarzschild metric as an event horizon (a hypersurface in spacetime that can only be crossed in one direction).^{[11]}
^{[11]} were much simpler than Synge's but both provided a single set of coordinates that covered the entire spacetime. However, perhaps due to the obscurity of the journals in which the papers of Lemaître and Synge were published their conclusions went unnoticed, with many of the major players in the field including Einstein believing that singularity at the Schwarzschild radius was physical.KruskalSzekeres coordinates The new coordinates nowadays known as ^{[14]}.Martin Kruskal and independently [13]