Misplaced Pages

Black hole thermodynamics

Article snapshot taken from Wikipedia with creative commons attribution-sharealike license. Give it a read and then ask your questions in the chat. We can research this topic together.
(Redirected from Bekenstein-Hawking formula) Area of study
An artist's depiction of two black holes merging, a process in which the laws of thermodynamics are upheld
Thermodynamics
The classical Carnot heat engine
Branches
Laws
Systems
State
Processes
Cycles
System propertiesNote: Conjugate variables in italics
Process functions
Functions of state
Material properties
Specific heat capacity  c = {\displaystyle c=}
T {\displaystyle T} S {\displaystyle \partial S}
N {\displaystyle N} T {\displaystyle \partial T}
Compressibility  β = {\displaystyle \beta =-}
1 {\displaystyle 1} V {\displaystyle \partial V}
V {\displaystyle V} p {\displaystyle \partial p}
Thermal expansion  α = {\displaystyle \alpha =}
1 {\displaystyle 1} V {\displaystyle \partial V}
V {\displaystyle V} T {\displaystyle \partial T}
Equations
Potentials
  • History
  • Culture
History
Philosophy
Theories
Key publications
Timelines
  • Art
  • Education
Scientists
Other

In physics, black hole thermodynamics is the area of study that seeks to reconcile the laws of thermodynamics with the existence of black hole event horizons. As the study of the statistical mechanics of black-body radiation led to the development of the theory of quantum mechanics, the effort to understand the statistical mechanics of black holes has had a deep impact upon the understanding of quantum gravity, leading to the formulation of the holographic principle.

Overview

The second law of thermodynamics requires that black holes have entropy. If black holes carried no entropy, it would be possible to violate the second law by throwing mass into the black hole. The increase of the entropy of the black hole more than compensates for the decrease of the entropy carried by the object that was swallowed.

In 1972, Jacob Bekenstein conjectured that black holes should have an entropy proportional to the area of the event horizon, where by the same year, he proposed no-hair theorems.

In 1973 Bekenstein suggested ln 2 0.8 π 0.276 {\displaystyle {\frac {\ln {2}}{0.8\pi }}\approx 0.276} as the constant of proportionality, asserting that if the constant was not exactly this, it must be very close to it. The next year, in 1974, Stephen Hawking showed that black holes emit thermal Hawking radiation corresponding to a certain temperature (Hawking temperature). Using the thermodynamic relationship between energy, temperature and entropy, Hawking was able to confirm Bekenstein's conjecture and fix the constant of proportionality at 1 / 4 {\displaystyle 1/4} :

S BH = k B A 4 P 2 , {\displaystyle S_{\text{BH}}={\frac {k_{\text{B}}A}{4\ell _{\text{P}}^{2}}},}

where A {\displaystyle A} is the area of the event horizon, k B {\displaystyle k_{\text{B}}} is the Boltzmann constant, and P = G / c 3 {\displaystyle \ell _{\text{P}}={\sqrt {G\hbar /c^{3}}}} is the Planck length.

This is often referred to as the Bekenstein–Hawking formula. The subscript BH either stands for "black hole" or "Bekenstein–Hawking". The black hole entropy is proportional to the area of its event horizon A {\displaystyle A} . The fact that the black hole entropy is also the maximal entropy that can be obtained by the Bekenstein bound (wherein the Bekenstein bound becomes an equality) was the main observation that led to the holographic principle. This area relationship was generalized to arbitrary regions via the Ryu–Takayanagi formula, which relates the entanglement entropy of a boundary conformal field theory to a specific surface in its dual gravitational theory.

Although Hawking's calculations gave further thermodynamic evidence for black hole entropy, until 1995 no one was able to make a controlled calculation of black hole entropy based on statistical mechanics, which associates entropy with a large number of microstates. In fact, so called "no-hair" theorems appeared to suggest that black holes could have only a single microstate. The situation changed in 1995 when Andrew Strominger and Cumrun Vafa calculated the right Bekenstein–Hawking entropy of a supersymmetric black hole in string theory, using methods based on D-branes and string duality. Their calculation was followed by many similar computations of entropy of large classes of other extremal and near-extremal black holes, and the result always agreed with the Bekenstein–Hawking formula. However, for the Schwarzschild black hole, viewed as the most far-from-extremal black hole, the relationship between micro- and macrostates has not been characterized. Efforts to develop an adequate answer within the framework of string theory continue.

In loop quantum gravity (LQG) it is possible to associate a geometrical interpretation with the microstates: these are the quantum geometries of the horizon. LQG offers a geometric explanation of the finiteness of the entropy and of the proportionality of the area of the horizon. It is possible to derive, from the covariant formulation of full quantum theory (spinfoam) the correct relation between energy and area (1st law), the Unruh temperature and the distribution that yields Hawking entropy. The calculation makes use of the notion of dynamical horizon and is done for non-extremal black holes. There seems to be also discussed the calculation of Bekenstein–Hawking entropy from the point of view of loop quantum gravity. The current accepted microstate ensemble for black holes is the microcanonical ensemble. The partition function for black holes results in a negative heat capacity. In canonical ensembles, there is limitation for a positive heat capacity, whereas microcanonical ensembles can exist at a negative heat capacity.

The laws of black hole mechanics

The four laws of black hole mechanics are physical properties that black holes are believed to satisfy. The laws, analogous to the laws of thermodynamics, were discovered by Jacob Bekenstein, Brandon Carter, and James Bardeen. Further considerations were made by Stephen Hawking.

Statement of the laws

The laws of black hole mechanics are expressed in geometrized units.

The zeroth law

The horizon has constant surface gravity for a stationary black hole.

The first law

For perturbations of stationary black holes, the change of energy is related to change of area, angular momentum, and electric charge by

d E = κ 8 π d A + Ω d J + Φ d Q , {\displaystyle dE={\frac {\kappa }{8\pi }}\,dA+\Omega \,dJ+\Phi \,dQ,}

where E {\displaystyle E} is the energy, κ {\displaystyle \kappa } is the surface gravity, A {\displaystyle A} is the horizon area, Ω {\displaystyle \Omega } is the angular velocity, J {\displaystyle J} is the angular momentum, Φ {\displaystyle \Phi } is the electrostatic potential and Q {\displaystyle Q} is the electric charge.

The second law

The horizon area is, assuming the weak energy condition, a non-decreasing function of time:

d A d t 0. {\displaystyle {\frac {dA}{dt}}\geq 0.}

This "law" was superseded by Hawking's discovery that black holes radiate, which causes both the black hole's mass and the area of its horizon to decrease over time.

The third law

It is not possible to form a black hole with vanishing surface gravity. That is, κ = 0 {\displaystyle \kappa =0} cannot be achieved.

Discussion of the laws

The zeroth law

The zeroth law is analogous to the zeroth law of thermodynamics, which states that the temperature is constant throughout a body in thermal equilibrium. It suggests that the surface gravity is analogous to temperature. T constant for thermal equilibrium for a normal system is analogous to κ {\displaystyle \kappa } constant over the horizon of a stationary black hole.

The first law

The left side, d E {\displaystyle dE} , is the change in energy (proportional to mass). Although the first term does not have an immediately obvious physical interpretation, the second and third terms on the right side represent changes in energy due to rotation and electromagnetism. Analogously, the first law of thermodynamics is a statement of energy conservation, which contains on its right side the term T d S {\displaystyle TdS} .

The second law

The second law is the statement of Hawking's area theorem. Analogously, the second law of thermodynamics states that the change in entropy in an isolated system will be greater than or equal to 0 for a spontaneous process, suggesting a link between entropy and the area of a black hole horizon. However, this version violates the second law of thermodynamics by matter losing (its) entropy as it falls in, giving a decrease in entropy. However, generalizing the second law as the sum of black hole entropy and outside entropy, shows that the second law of thermodynamics is not violated in a system including the universe beyond the horizon.

The generalized second law of thermodynamics (GSL) was needed to present the second law of thermodynamics as valid. This is because the second law of thermodynamics, as a result of the disappearance of entropy near the exterior of black holes, is not useful. The GSL allows for the application of the law because now the measurement of interior, common entropy is possible. The validity of the GSL can be established by studying an example, such as looking at a system having entropy that falls into a bigger, non-moving black hole, and establishing upper and lower entropy bounds for the increase in the black hole entropy and entropy of the system, respectively. One should also note that the GSL will hold for theories of gravity such as Einstein gravity, Lovelock gravity, or Braneworld gravity, because the conditions to use GSL for these can be met.

However, on the topic of black hole formation, the question becomes whether or not the generalized second law of thermodynamics will be valid, and if it is, it will have been proved valid for all situations. Because a black hole formation is not stationary, but instead moving, proving that the GSL holds is difficult. Proving the GSL is generally valid would require using quantum-statistical mechanics, because the GSL is both a quantum and statistical law. This discipline does not exist so the GSL can be assumed to be useful in general, as well as for prediction. For example, one can use the GSL to predict that, for a cold, non-rotating assembly of N {\displaystyle N} nucleons, S B H S > 0 {\displaystyle S_{BH}-S>0} , where S B H {\displaystyle S_{BH}} is the entropy of a black hole and S {\displaystyle S} is the sum of the ordinary entropy.

The third law

The third law of black hole thermodynamics is controversial. Specific counterexamples called extremal black holes fail to obey the rule. The classical third law of thermodynamics, known as the Nernst theorem, which says the entropy of a system must go to zero as the temperature goes to absolute zero is also not a universal law. However the systems that fail the classical third law have not been realized in practice, leading to the suggestion that the extremal black holes may not represent the physics of black holes generally.

A weaker form of the classical third law known as the "unattainability principle" states that an infinite number of steps are required to put a system in to its ground state. This form of the third law does have an analog in black hole physics.

Interpretation of the laws

The four laws of black hole mechanics suggest that one should identify the surface gravity of a black hole with temperature and the area of the event horizon with entropy, at least up to some multiplicative constants. If one only considers black holes classically, then they have zero temperature and, by the no-hair theorem, zero entropy, and the laws of black hole mechanics remain an analogy. However, when quantum-mechanical effects are taken into account, one finds that black holes emit thermal radiation (Hawking radiation) at a temperature

T H = κ 2 π . {\displaystyle T_{\text{H}}={\frac {\kappa }{2\pi }}.}

From the first law of black hole mechanics, this determines the multiplicative constant of the Bekenstein–Hawking entropy, which is (in geometrized units)

S BH = A 4 . {\displaystyle S_{\text{BH}}={\frac {A}{4}}.}

which is the entropy of the black hole in Einstein's general relativity. Quantum field theory in curved spacetime can be utilized to calculate the entropy for a black hole in any covariant theory for gravity, known as the Wald entropy.

Critique

While black hole thermodynamics (BHT) has been regarded as one of the deepest clues to a quantum theory of gravity, there remain a philosophical criticism that "the analogy is not nearly as good as is commonly supposed", that it “is often based on a kind of caricature of thermodynamics” and "it’s unclear what the systems in BHT are supposed to be".

These criticisms where reexamined in detail, ending with the opposite conclusion, "stationary black holes are not analogous to thermodynamic systems: they are thermodynamic systems, in the fullest sense."

Beyond black holes

Gary Gibbons and Hawking have shown that black hole thermodynamics is more general than black holes—that cosmological event horizons also have an entropy and temperature.

More fundamentally, Gerard 't Hooft and Leonard Susskind used the laws of black hole thermodynamics to argue for a general holographic principle of nature, which asserts that consistent theories of gravity and quantum mechanics must be lower-dimensional. Though not yet fully understood in general, the holographic principle is central to theories like the AdS/CFT correspondence.

There are also connections between black hole entropy and fluid surface tension.

See also

Notes

  1. See List of loop quantum gravity researchers.

Citations

  1. Carlip, S (2014). "Black Hole Thermodynamics". International Journal of Modern Physics D. 23 (11): 1430023–736. arXiv:1410.1486. Bibcode:2014IJMPD..2330023C. CiteSeerX 10.1.1.742.9918. doi:10.1142/S0218271814300237. S2CID 119114925.
  2. ^ Bousso, Raphael (2002). "The Holographic Principle". Reviews of Modern Physics. 74 (3): 825–874. arXiv:hep-th/0203101. Bibcode:2002RvMP...74..825B. doi:10.1103/RevModPhys.74.825. S2CID 55096624.
  3. Bekenstein, A. (1972). "Black holes and the second law". Lettere al Nuovo Cimento. 4 (15): 99–104. doi:10.1007/BF02757029. S2CID 120254309.
  4. "First Observation of Hawking Radiation" Archived 2012-03-01 at the Wayback Machine from the Technology Review.
  5. Matson, John (Oct 1, 2010). "Artificial event horizon emits laboratory analogue to theoretical black hole radiation". Sci. Am.
  6. Charlie Rose: A conversation with Dr. Stephen Hawking & Lucy Hawking Archived March 29, 2013, at the Wayback Machine
  7. A Brief History of Time, Stephen Hawking, Bantam Books, 1988.
  8. Hawking, S. W (1975). "Particle creation by black holes". Communications in Mathematical Physics. 43 (3): 199–220. Bibcode:1975CMaPh..43..199H. doi:10.1007/BF02345020. S2CID 55539246.
  9. Majumdar, Parthasarathi (1999). "Black Hole Entropy and Quantum Gravity". Indian J. Phys. 73.21 (2): 147. arXiv:gr-qc/9807045. Bibcode:1999InJPB..73..147M.
  10. Van Raamsdonk, Mark (31 August 2016). "Lectures on Gravity and Entanglement". New Frontiers in Fields and Strings. pp. 297–351. arXiv:1609.00026. doi:10.1142/9789813149441_0005. ISBN 978-981-314-943-4. S2CID 119273886.
  11. ^ Bhattacharya, Sourav (2007). "Black-Hole No-Hair Theorems for a Positive Cosmological Constant". Physical Review Letters. 99 (20): 201101. arXiv:gr-qc/0702006. Bibcode:2007PhRvL..99t1101B. doi:10.1103/PhysRevLett.99.201101. PMID 18233129. S2CID 119496541.
  12. Strominger, A.; Vafa, C. (1996). "Microscopic origin of the Bekenstein-Hawking entropy". Physics Letters B. 379 (1–4): 99–104. arXiv:hep-th/9601029. Bibcode:1996PhLB..379...99S. doi:10.1016/0370-2693(96)00345-0. S2CID 1041890.
  13. Rovelli, Carlo (1996). "Black Hole Entropy from Loop Quantum Gravity". Physical Review Letters. 77 (16): 3288–3291. arXiv:gr-qc/9603063. Bibcode:1996PhRvL..77.3288R. doi:10.1103/PhysRevLett.77.3288. PMID 10062183. S2CID 43493308.
  14. Ashtekar, Abhay; Baez, John; Corichi, Alejandro; Krasnov, Kirill (1998). "Quantum Geometry and Black Hole Entropy". Physical Review Letters. 80 (5): 904–907. arXiv:gr-qc/9710007. Bibcode:1998PhRvL..80..904A. doi:10.1103/PhysRevLett.80.904. S2CID 18980849.
  15. Bianchi, Eugenio (2012). "Entropy of Non-Extremal Black Holes from Loop Gravity". arXiv:1204.5122 .
  16. Casadio, R. (2011). "Microcanonical description of (micro) black holes". Entropy. 13 (2): 502–517. arXiv:1101.1384. Bibcode:2011Entrp..13..502C. doi:10.3390/e13020502. S2CID 120254309.
  17. ^ Bekenstein, Jacob D. (1974-06-15). "Generalized second law of thermodynamics in black hole physics". Physical Review D. 9 (12): 3292–3300. Bibcode:1974PhRvD...9.3292B. doi:10.1103/physrevd.9.3292. ISSN 0556-2821. S2CID 123043135.
  18. Wu, Wang, Yang, Zhang, Shao-Feng, Bin, Guo-Hang, Peng-Ming (17 November 2008). "The generalized second law of thermodynamics in generalized gravity theories". Classical and Quantum Gravity. 25 (23): 235018. arXiv:0801.2688. Bibcode:2008CQGra..25w5018W. doi:10.1088/0264-9381/25/23/235018. S2CID 119117894.{{cite journal}}: CS1 maint: multiple names: authors list (link)
  19. ^ Wald, Robert M. (2001). "The Thermodynamics of Black Holes". Living Reviews in Relativity. 4 (1): 6. arXiv:gr-qc/9912119. Bibcode:2001LRR.....4....6W. doi:10.12942/lrr-2001-6. ISSN 1433-8351. PMC 5253844. PMID 28163633.
  20. ^ Rácz, István (2000-10-21). "Does the third law of black hole thermodynamics really have a serious failure?". Classical and Quantum Gravity. 17 (20): 4353–4356. arXiv:gr-qc/0009049. doi:10.1088/0264-9381/17/20/410. ISSN 0264-9381.
  21. Wald, Robert M (1999-12-01). "Gravitation, thermodynamics and quantum theory". Classical and Quantum Gravity. 16 (12A): A177–A190. arXiv:gr-qc/9901033. Bibcode:1999CQGra..16A.177W. doi:10.1088/0264-9381/16/12A/309. ISSN 0264-9381.
  22. Wald, Robert M. (1997-11-15). ""Nernst theorem" and black hole thermodynamics". Physical Review D. 56 (10): 6467–6474. arXiv:gr-qc/9704008. Bibcode:1997PhRvD..56.6467W. doi:10.1103/PhysRevD.56.6467. ISSN 0556-2821.
  23. Masanes, Lluís; Oppenheim, Jonathan (2017-03-14). "A general derivation and quantification of the third law of thermodynamics". Nature Communications. 8 (1): 14538. arXiv:1412.3828. Bibcode:2017NatCo...814538M. doi:10.1038/ncomms14538. ISSN 2041-1723. PMC 5355879. PMID 28290452.
  24. Wald, Robert (2001). "The thermodynamics of black holes". Living Reviews in Relativity. 4 (1): 6. arXiv:gr-qc/9912119. Bibcode:2001LRR.....4....6W. doi:10.12942/lrr-2001-6. PMC 5253844. PMID 28163633.
  25. Dougherty, John; Callender, Craig. "Black Hole Thermodynamics: More Than an Analogy?" (PDF). philsci-archive.pitt.edu. Guide to the Philosophy of Cosmology, editors: A. Ijjas and B. Loewer. Oxford University Press.
  26. Foster, Brendan Z. (September 2019). "Are We All Wrong About Black Holes? Craig Callender worries that the analogy between black holes and thermodynamics has been stretched too far". quantamagazine.org. Retrieved 3 September 2021.
  27. Wallace, David (November 2018). "The case for black hole thermodynamics part I: Phenomenological thermodynamics". Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics. 64. Philosophy of Modern Physics, Volume 64, Pages 52-67: 52–67. arXiv:1710.02724. Bibcode:2018SHPMP..64...52W. doi:10.1016/j.shpsb.2018.05.002. S2CID 73706680.
  28. For an authoritative review, see Ofer Aharony; Steven S. Gubser; Juan Maldacena; Hirosi Ooguri; Yaron Oz (2000). "Large N field theories, string theory and gravity". Physics Reports. 323 (3–4): 183–386. arXiv:hep-th/9905111. Bibcode:2000PhR...323..183A. doi:10.1016/S0370-1573(99)00083-6. S2CID 119101855.
  29. Callaway, D. (1996). "Surface tension, hydrophobicity, and black holes: The entropic connection". Physical Review E. 53 (4): 3738–3744. arXiv:cond-mat/9601111. Bibcode:1996PhRvE..53.3738C. doi:10.1103/PhysRevE.53.3738. PMID 9964684. S2CID 7115890.

Bibliography

External links

Black holes
Types
Size
Formation
Properties
Issues
Metrics
Alternatives
Analogs
Lists
Related
Notable
Quantum gravity
Central concepts
Toy models
Quantum field theory
in curved spacetime
Black holes
Approaches
String theory
Canonical quantum gravity
Euclidean quantum gravity
Others
Applications
See also: Template:Quantum mechanics topics
Stephen Hawking
Physics
Books
Science
Fiction
Memoirs
Films
Television
Family
Other
Categories: