The Hartle–Thorne metric is an approximate solution of the vacuum

Einstein field equations In the General relativity, general theory of relativity, the Einstein field equations (EFE; also known as Einstein's equations) relate the geometry of spacetime to the distribution of Matter#In general relativity and cosmology, matter within it. ...

of general relativity that describes the exterior of a slowly and rigidly rotating, stationary and

axially symmetric In geometry, circular symmetry is a type of continuous symmetry for a planar object that can be rotated by any arbitrary angle and map onto itself. Rotational circular symmetry is isomorphic with the circle group in the complex plane, or the ...

body. The metric was found by

James Hartle James Burkett Hartle (August 17, 1939 – May 17, 2023) was an American theoretical physicist. He joined the faculty of the University of California, Santa Barbara in 1966, and was a member of the external faculty of the Santa Fe Institute. Hart ...

and

Kip Thorne Kip Stephen Thorne (born June 1, 1940) is an American theoretical physicist and writer known for his contributions in gravitational physics and astrophysics. Along with Rainer Weiss and Barry C. Barish, he was awarded the 2017 Nobel Pri ...

in the 1960s to study the spacetime outside

neutron stars A neutron star is the gravitationally collapsed core of a massive supergiant star. It results from the supernova explosion of a massive star—combined with gravitational collapse—that compresses the core past white dwarf star density to th ...

white dwarfs A white dwarf is a stellar core remnant composed mostly of electron-degenerate matter. A white dwarf is very dense: in an Earth sized volume, it packs a mass that is comparable to the Sun. No nuclear fusion takes place in a white dwarf; what ...

and

supermassive stars In 1944, Walter Baade categorized groups of stars within the Milky Way into stellar populations. In the abstract of the article by Baade, he recognizes that Jan Oort originally conceived this type of classification in 1926. Baade observed that ...

. It can be shown that it is an approximation to the

Kerr metric The Kerr metric or Kerr geometry describes the geometry of empty spacetime around a rotating uncharged axially symmetric black hole with a quasispherical event horizon. The Kerr metric is an exact solution of the Einstein field equations of gen ...

(which describes a rotating black hole) when the quadrupole moment is set as

q=-a^2aM^3

, which is the correct value for a black hole but not, in general, for other astrophysical objects.

Metric

Up to second order in the

angular momentum Angular momentum (sometimes called moment of momentum or rotational momentum) is the rotational analog of Momentum, linear momentum. It is an important physical quantity because it is a Conservation law, conserved quantity – the total ang ...

J

, mass

M

and

quadrupole moment A quadrupole or quadrapole is one of a sequence of configurations of things like electric charge or current, or gravitational mass that can exist in ideal form, but it is usually just part of a multipole expansion of a more complex structure ref ...

q

, the metric in

spherical coordinates In mathematics, a spherical coordinate system specifies a given point in three-dimensional space by using a distance and two angles as its three coordinates. These are * the radial distance along the line connecting the point to a fixed point ...

is given by :

\beging_ &= - \left(1-\frac+\frac P_2 +\frac P_2 +\frac P^2_2
-\frac \frac (2P_2+1)\right), \\
g_ &= -\frac\sin^2\theta, \\
g_ &= 1 + \frac +\frac -\frac -\frac
+ \frac \frac +\frac,\\
g_ &=r^2 \left(1-\frac -\frac +\frac\frac
+\frac\right),\\
g_&=r^2\sin^2\theta\left(1-\frac -\frac +\frac\frac
+\frac\right),
\end

where

P_2=\frac.

References

General relativity Metric tensors {{relativity-stub

Metric

See also

References