Schwarzschild radius

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The Schwarzschild radius or the gravitational radius is a physical parameter in the Schwarzschild solution to Einstein's field equations that corresponds to the radius defining the event horizon of a Schwarzschild black hole. It is a characteristic radius associated with any quantity of mass. The Schwarzschild radius was named after the German astronomer Karl Schwarzschild, who calculated this exact solution for the theory of general relativity in 1916.

The Schwarzschild radius is given as

where G is the gravitational constant, M is the object mass, and c is the speed of light.[note 1][1][2]

History[edit]

In 1916, Karl Schwarzschild obtained the exact solution[3][4] to Einstein's field equations for the gravitational field outside a non-rotating, spherically symmetric body with mass (see Schwarzschild metric). The solution contained terms of the form and , which becomes singular at and respectively. The has come to be known as the Schwarzschild radius. The physical significance of these singularities was debated for decades. It was found that the one at is a coordinate singularity, meaning that it is an artifact of the particular system of coordinates that was used; while the one at is a spacetime singularity and cannot be removed.[5] The Schwarzschild radius is nonetheless a physically relevant quantity, as noted above and below.

This expression had previously been calculated, using Newtonian mechanics, as the radius of a spherically symmetric body at which the escape velocity was equal to the speed of light. It had been identified in the 18th century by John Michell[6] and Pierre-Simon Laplace.[7]

Parameters[edit]

The Schwarzschild radius of an object is proportional to its mass. Accordingly, the Sun has a Schwarzschild radius of approximately 3.0 km (1.9 mi),[8] whereas Earth's is approximately 9 mm (0.35 in)[8] and the Moon's is approximately 0.1 mm (0.0039 in).

Object's Schwarzschild radius
Object Mass Schwarzschild radius Actual radius Schwarzschild density or
Milky Way 1.6×1042 kg 2.4×1015 m (0.25 ly) 5×1020 m (52900 ly) 0.000029 kg/m3
Phoenix A (largest known black hole) 2×1041 kg 3×1014 m (~2000 AU) 0.0018 kg/m3
Ton 618 1.3×1041 kg 1.9×1014 m (~1300 AU) 0.0045 kg/m3
SMBH in NGC 4889 4.2×1040 kg 6.2×1013 m (~410 AU) 0.042 kg/m3
SMBH in Messier 87[9] 1.3×1040 kg 1.9×1013 m (~130 AU) 0.44 kg/m3
SMBH in Andromeda Galaxy[10] 3.4×1038 kg 5.0×1011 m (3.3 AU) 640 kg/m3
Sagittarius A* (SMBH in Milky Way)[11] 8.26×1036 kg 1.23×1010 m (0.08 AU) 1.068×106 kg/m3
SMBH in NGC 4395[12] 7.1568×1035 kg 1.062×109 m (1.53 R) 1.4230×108 kg/m3
Potential intermediate black hole in HCN-0.009-0.044[13][14] 6.3616×1034 kg 9.44×108 m (14.8 R🜨) 1.8011×1010 kg/m3
Resulting intermediate black hole from GW190521 merger[15] 2.823×1032 kg 4.189×105 m (0.066 R🜨) 9.125×1014 kg/m3
Sun 1.99×1030 kg 2.95×103 m 7.0×108 m 1.84×1019 kg/m3
Jupiter 1.90×1027 kg 2.82 m 7.0×107 m 2.02×1025 kg/m3
Saturn 5.683×1026 kg 8.42×10−1 m 6.03×107 m 2.27×1026 kg/m3
Neptune 1.024×1026 kg 1.52×10−1 m 2.47×107 m 6.97×1027 kg/m3
Uranus 8.681×1025 kg 1.29×10−1 m 2.56×107 m 9.68×1027 kg/m3
Earth 5.97×1024 kg 8.87×10−3 m 6.37×106 m 2.04×1030 kg/m3
Venus 4.867×1024 kg 7.21×10−3 m 6.05×106 m 3.10×1030 kg/m3
Mars 6.39×1023 kg 9.47×10−4 m 3.39×106 m 1.80×1032 kg/m3
Mercury 3.285×1023 kg 4.87×10−4 m 2.44×106 m 6.79×1032 kg/m3
Moon 7.35×1022 kg 1.09×10−4 m 1.74×106 m 1.35×1034 kg/m3
Human 70 kg 1.04×10−25 m ~5×10−1 m 1.49×1076 kg/m3
Planck mass 2.18×10−8 kg 3.23×10−35 m (2 lP) 1.54×1095 kg/m3

Derivation[edit]

Black hole classification by Schwarzschild radius[edit]

Black hole classifications
Class Approx.
mass
Approx.
radius
Supermassive black hole 105–1010 MSun 0.001–400 AU
Intermediate-mass black hole 103 MSun 103 km ≈ REarth
Stellar black hole 10 MSun 30 km
Micro black hole up to MMoon up to 0.1 mm

Any object whose radius is smaller than its Schwarzschild radius is called a black hole. The surface at the Schwarzschild radius acts as an event horizon in a non-rotating body (a rotating black hole operates slightly differently). Neither light nor particles can escape through this surface from the region inside, hence the name "black hole".

Black holes can be classified based on their Schwarzschild radius, or equivalently, by their density, where density is defined as mass of a black hole divided by the volume of its Schwarzschild sphere. As the Schwarzschild radius is linearly related to mass, while the enclosed volume corresponds to the third power of the radius, small black holes are therefore much more dense than large ones. The volume enclosed in the event horizon of the most massive black holes has an average density lower than main sequence stars.

Supermassive black hole[edit]

A supermassive black hole (SMBH) is the largest type of black hole, though there are few official criteria on how such an object is considered so, on the order of hundreds of thousands to billions of solar masses. (Supermassive black holes up to 21 billion (2.1 × 1010M have been detected, such as NGC 4889.)[16] Unlike stellar mass black holes, supermassive black holes have comparatively low average densities. (Note that a (non-rotating) black hole is a spherical region in space that surrounds the singularity at its center; it is not the singularity itself.) With that in mind, the average density of a supermassive black hole can be less than the density of water.

The Schwarzschild radius of a body is proportional to its mass and therefore to its volume, assuming that the body has a constant mass-density.[17] In contrast, the physical radius of the body is proportional to the cube root of its volume. Therefore, as the body accumulates matter at a given fixed density (in this example, 997 kg/m3, the density of water), its Schwarzschild radius will increase more quickly than its physical radius. When a body of this density has grown to around 136 million solar masses (1.36 × 108 M), its physical radius would be overtaken by its Schwarzschild radius, and thus it would form a supermassive black hole.

It is thought that supermassive black holes like these do not form immediately from the singular collapse of a cluster of stars. Instead they may begin life as smaller, stellar-sized black holes and grow larger by the accretion of matter, or even of other black holes.[citation needed]

The Schwarzschild radius of the supermassive black hole at the Galactic Center of the Milky Way is approximately 12 million kilometres.[11] Its mass is about 4.1 million M.

Stellar black hole[edit]

Stellar black holes have much greater average densities than supermassive black holes. If one accumulates matter at nuclear density (the density of the nucleus of an atom, about 1018 kg/m3; neutron stars also reach this density), such an accumulation would fall within its own Schwarzschild radius at about 3 M and thus would be a stellar black hole.

Micro black hole[edit]

A small mass has an extremely small Schwarzschild radius. A black hole of mass similar to that of Mount Everest[18][note 2] would have a Schwarzschild radius much smaller than a nanometre.[note 3] Its average density at that size would be so high that no known mechanism could form such extremely compact objects. Such black holes might possibly be formed in an early stage of the evolution of the universe, just after the Big Bang, when densities of matter were extremely high. Therefore, these hypothetical miniature black holes are called primordial black holes.

Other uses[edit]

In gravitational time dilation[edit]

Gravitational time dilation near a large, slowly rotating, nearly spherical body, such as the Earth or Sun can be reasonably approximated as follows:[19]

where:

  • tr is the elapsed time for an observer at radial coordinate r within the gravitational field;
  • t is the elapsed time for an observer distant from the massive object (and therefore outside of the gravitational field);
  • r is the radial coordinate of the observer (which is analogous to the classical distance from the center of the object);
  • rs is the Schwarzschild radius.

Compton wavelength intersection[edit]

The Schwarzschild radius () and the Compton wavelength () corresponding to a given mass are similar when the mass is around one Planck mass (), when both are of the same order as the Planck length ().

Calculating the maximum volume and radius possible given a density before a black hole forms[edit]

The Schwarzschild radius equation can be manipulated to yield an expression that gives the largest possible radius from an input density that doesn't form a black hole. Taking the input density as ρ,

For example, the density of water is 1000 kg/m3. This means the largest amount of water you can have without forming a black hole would have a radius of 400 920 754 km (about 2.67 AU).

See also[edit]

Classification of black holes by type:

A classification of black holes by mass:

Notes[edit]

  1. ^ In geometrized unit systems, G and c are both taken to be unity, which reduces this equation to .
  2. ^ Using these values,[18] one can calculate a mass estimate of 6.3715×1014 kg.
  3. ^ One can calculate the Schwarzschild radius: 2 × 6.6738×10−11 m3⋅kg−1⋅s−2 × 6.3715×1014 kg / (299792458 m⋅s−1)2 = 9.46×10−13 m = 9.46×10−4 nm.

References[edit]

  1. ^ Kutner, Marc (2003). Astronomy: A Physical Perspective. Cambridge University Press. p. 148. ISBN 9780521529273.
  2. ^ Guidry, Mike (3 January 2019). Modern General Relativity: Black Holes, Gravitational Waves, and Cosmology. Cambridge University Press. p. 92. ISBN 978-1-107-19789-3.
  3. ^ Schwarzschild, Karl (1916). "Über das Gravitationsfeld eines Massenpunktes nach der Einsteinschen Theorie". Sitzungsberichte der Königlich Preussischen Akademie der Wissenschaften: 189. Bibcode:1916SPAW.......189S.
  4. ^ Schwarzschild, Karl (1916). "Über das Gravitationsfeld einer Kugel aus inkompressibler Flüssigkeit nach der Einsteinschen Theorie". Sitzungsberichte der Königlich Preussischen Akademie der Wissenschaften zu Berlin: 424. Bibcode:1916skpa.conf..424S.
  5. ^ Wald, Robert (1984). General Relativity. The University of Chicago Press. pp. 152–153. ISBN 978-0-226-87033-5.
  6. ^ Schaffer, Simon (1979). "John Michell and Black Holes". Journal for the History of Astronomy. 10: 42–43. Bibcode:1979JHA....10...42S. doi:10.1177/002182867901000104. S2CID 123958527. Retrieved 4 June 2018.
  7. ^ Montgomery, Colin; Orchiston, Wayne; Whittingham, Ian (2009). "Michell, Laplace and the origin of the black hole concept" (PDF). Journal of Astronomical History and Heritage. 12 (2): 90. Bibcode:2009JAHH...12...90M. doi:10.3724/SP.J.1440-2807.2009.02.01. S2CID 55890996. Archived from the original (PDF) on 2 May 2014.
  8. ^ a b Anderson, James L. (2001). "V.C The Schwarzschild Field, Event Horizons, and Black Holes". In Meyer, Robert A. (ed.). Encyclopedia of Physical Science and Technology (Third Edition). Cambridge, Massachusetts: Academic Press. ISBN 978-0-12-227410-7. Retrieved 23 October 2023.
  9. ^ Event Horizon Telescope Collaboration (2019). "First M87 Event Horizon Telescope Results. I. The Shadow of the Supermassive Black Hole". Astrophysical Journal Letters. 875 (1): L1. arXiv:1906.11238. Bibcode:2019ApJ...875L...1E. doi:10.3847/2041-8213/AB0EC7. 6.5(7)×109 M = 1.29(14)×1040 kg.
  10. ^ Bender, Ralf; Kormendy, John; Bower, Gary; et al. (2005). "HST STIS Spectroscopy of the Triple Nucleus of M31: Two Nested Disks in Keplerian Rotation around a Supermassive Black Hole". Astrophysical Journal. 631 (1): 280–300. arXiv:astro-ph/0509839. Bibcode:2005ApJ...631..280B. doi:10.1086/432434. S2CID 53415285. 1.7(6)×108 M = 0.34(12)×1039 kg.
  11. ^ a b Ghez, A. M.; et al. (December 2008). "Measuring Distance and Properties of the Milky Way's Central Supermassive Black Hole with Stellar Orbits". Astrophysical Journal. 689 (2): 1044–1062. arXiv:0808.2870. Bibcode:2008ApJ...689.1044G. doi:10.1086/592738. S2CID 18335611.
  12. ^ Peterson, Bradley M.; Bentz, Misty C.; Desroches, Louis-Benoit; Filippenko, Alexei V.; Ho, Luis C.; Kaspi, Shai; Laor, Ari; Maoz, Dan; Moran, Edward C.; Pogge, Richard W.; Quillen, Alice C. (20 October 2005). "Multiwavelength Monitoring of the Dwarf Seyfert 1 Galaxy NGC 4395. I. A Reverberation-Based Measurement of the Black Hole Mass". The Astrophysical Journal. 632 (2): 799–808. arXiv:astro-ph/0506665. Bibcode:2005ApJ...632..799P. doi:10.1086/444494. hdl:1811/48314. ISSN 0004-637X. S2CID 13886279.
  13. ^ Sciences, National Institutes of Natural. "Hiding black hole found". phys.org. Retrieved 15 June 2022.
  14. ^ Takekawa, Shunya; Oka, Tomoharu; Iwata, Yuhei; Tsujimoto, Shiho; Nomura, Mariko (2019). "Indication of Another Intermediate-mass Black Hole in the Galactic Center". The Astrophysical Journal. 871 (1): L1. arXiv:1812.10733. Bibcode:2019ApJ...871L...1T. doi:10.3847/2041-8213/aafb07.
  15. ^ Abbott, R.; Abbott, T. D.; Abraham, S.; Acernese, F.; Ackley, K.; Adams, C.; Adhikari, R. X.; Adya, V. B.; Affeldt, C.; Agathos, M.; Agatsuma, K. (2 September 2020). "Properties and Astrophysical Implications of the 150 M Binary Black Hole Merger GW190521". The Astrophysical Journal. 900 (1): L13. arXiv:2009.01190. Bibcode:2020ApJ...900L..13A. doi:10.3847/2041-8213/aba493. ISSN 2041-8213. S2CID 221447444.
  16. ^ McConnell, Nicholas J. (8 December 2011). "Two ten-billion-solar-mass black holes at the centres of giant elliptical galaxies". Nature. 480 (7376): 215–218. arXiv:1112.1078. Bibcode:2011Natur.480..215M. doi:10.1038/nature10636. PMID 22158244. S2CID 4408896.
  17. ^ Robert H. Sanders (2013). Revealing the Heart of the Galaxy: The Milky Way and its Black Hole. Cambridge University Press. p. 36. ISBN 978-1-107-51274-0.
  18. ^ a b "How does the mass of one mole of M&M's compare to the mass of Mount Everest?" (PDF). School of Science and Technology, Singapore. March 2003. Archived from the original (PDF) on 10 December 2014. Retrieved 8 December 2014. If Mount Everest is assumed* to be a cone of height 8850 m and radius 5000 m, then its volume can be calculated using the following equation:
    volume = πr2h/3 [...] Mount Everest is composed of granite, which has a density of 2750 kg⋅m−3.
  19. ^ Keeton, Keeton (2014). Principles of Astrophysics: Using Gravity and Stellar Physics to Explore the Cosmos (illustrated ed.). Springer. p. 208. ISBN 978-1-4614-9236-8. Extract of page 208