Semiclassical gravity: Difference between revisions

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	~~'''Semiclassical~~ ~~gravity''' is the approximation to the~~ theory of ~~] in which one treats ]s~~ as ~~being~~ quantum ~~and~~ ~~the~~ ] as ~~being~~ classical.		{{Short description\|Physical theory with matter as quantum fields but gravity as a classical field}}
			'''Semiclassical gravity''' is an approximation to the theory of ] in which one treats matter and energy ] as being quantum and the ] as being classical.

	In semiclassical gravity, matter is represented by quantum matter fields that propagate according to the theory of ]. The spacetime in which the fields propagate is classical but dynamical. The ~~curvature~~ of the ~~spacetime~~ is ~~given~~ by the ''semiclassical Einstein equations'', which relate the curvature of the spacetime, ~~given~~ by the ] <math>G_{\mu\nu}</math>, to the expectation value of the ] ~~operator,~~ <math>T_{\mu\nu}</math>, of the matter fields:		In semiclassical gravity, matter is represented by quantum matter fields that propagate according to the theory of ]. The spacetime in which the fields propagate is classical but dynamical. The dynamics of the theory is described by the ''semiclassical Einstein equations'', which relate the curvature of the spacetime that is encoded by the ] <math>G_{\mu\nu}</math> to the ] of the ] <math>\hat T_{\mu\nu}</math> (a ] operator) of the matter fields, i.e.

	:<math> G_{\mu\nu} = 8 \pi G \left\langle \hat T_{\mu\nu} \right\rangle_\psi </math>		: <math>G_{\mu\nu} = \frac{8 \pi G}{c^4} \left\langle \hat T_{\mu\nu} \right\rangle_\psi,</math>

	where ''G'' is ] and <math>\psi</math> indicates the quantum state of the matter fields.		where ''G'' is the ], and <math>\psi</math> indicates the quantum state of the matter fields.

			==Energy–momentum tensor==
⚫	Since the theory of quantum gravity is not yet known, it is difficult to ~~say~~ ~~what is~~ the regime of validity of semiclassical gravity. However, one can formally show that semiclassical gravity could be deduced from quantum gravity by considering ''N'' copies of the quantum matter fields, and taking the limit of ''N'' going to infinity while keeping the product ''GN'' constant. At diagrammatic level, semiclassical gravity corresponds to summing all ]s ~~which~~ do not have loops of gravitons (but have an arbitrary number of matter loops). Semiclassical gravity can also be deduced from an axiomatic approach.
			There is some ambiguity in regulating the energy–momentum tensor, and this depends upon the curvature. This ambiguity can be absorbed into the ], the ], and the ]<ref>See Wald (1994) Chapter 4, section 6 "The Stress–Energy Tensor".</ref>
			: <math>\int \sqrt{-g} R^2 \, d^dx</math> and <math>\int \sqrt{-g} R^{\mu\nu} R_{\mu\nu} \, d^dx.</math>
			There is another quadratic term of the form
			: <math>\int \sqrt{-g} R^{\mu\nu\rho\sigma} R_{\mu\nu\rho\sigma} \, d^dx,</math>
			but in four dimensions this term is a linear combination of the other two terms and a surface term. See ] for more details.

		⚫	Since the theory of quantum gravity is not yet known, it is difficult to precisely determine the regime of validity of semiclassical gravity. However, one can formally show that semiclassical gravity could be deduced from quantum gravity by considering ''N'' copies of the quantum matter fields and taking the limit of ''N'' going to infinity while keeping the product ''GN'' constant. At a diagrammatic level, semiclassical gravity corresponds to summing all ]s that do not have loops of gravitons (but have an arbitrary number of matter loops). Semiclassical gravity can also be deduced from an axiomatic approach.
⚫	The most important applications of semiclassical gravity are to understand the ] of ] and the generation of random ~~gaussian~~-distributed perturbations in the theory of ], which is thought to occur at the very ~~beginnings~~ of the ].

			==Experimental status==
			There are cases where semiclassical gravity breaks down. For instance,<ref>See Page and Geilker; Eppley and Hannah; Albers, Kiefer, and Reginatto.</ref> if ''M'' is a huge mass, then the superposition
			: <math>\frac{1}{\sqrt{2}} \big(\|M \text{ at } A\rangle + \|M \text{ at } B\rangle\big),</math>
			where the locations ''A'' and ''B'' are spatially separated, results in an expectation value of the energy–momentum tensor that is ''M''/2 at ''A'' and ''M''/2 at ''B'', but one would never observe the metric sourced by such a distribution. Instead, one would observe the ] into a state with the metric sourced at ''A'' and another sourced at ''B'' with a 50% chance each. Extensions of semiclassical gravity that incorporate decoherence have also been studied.

			==Applications==
		⚫	The most important applications of semiclassical gravity are to understand the ] of ]s and the generation of random Gaussian-distributed perturbations in the theory of ], which is thought to occur at the very beginning of the ].

			==Notes==
			{{Reflist}}

			==References==
	* Birrell, N. D. and Davies, P. C. W., ''Quantum fields in curved space'', (Cambridge University Press, Cambridge, UK, 1982).		* Birrell, N. D. and Davies, P. C. W., ''Quantum fields in curved space'', (Cambridge University Press, Cambridge, UK, 1982).
			* {{cite journal \| last1=Page \| first1=Don N. \| last2=Geilker \| first2=C. D. \| title=Indirect Evidence for Quantum Gravity \| journal=Physical Review Letters \| publisher=American Physical Society (APS) \| volume=47 \| issue=14 \| date=1981-10-05 \| issn=0031-9007 \| doi=10.1103/physrevlett.47.979 \| pages=979–982\| bibcode=1981PhRvL..47..979P }}
			* {{cite journal \| last1=Eppley \| first1=Kenneth \| last2=Hannah \| first2=Eric \| title=The necessity of quantizing the gravitational field \| journal=Foundations of Physics \| publisher=Springer Science and Business Media LLC \| volume=7 \| issue=1–2 \| year=1977 \| issn=0015-9018 \| doi=10.1007/bf00715241 \| pages=51–68\| bibcode=1977FoPh....7...51E \| s2cid=123251640 }}
			* {{cite journal \| last1=Albers \| first1=Mark \| last2=Kiefer \| first2=Claus \| last3=Reginatto \| first3=Marcel \| title=Measurement analysis and quantum gravity \| journal=Physical Review D \| publisher=American Physical Society (APS) \| volume=78 \| issue=6 \| date=2008-09-18 \| issn=1550-7998 \| doi=10.1103/physrevd.78.064051 \| page=064051\|arxiv=0802.1978\| bibcode=2008PhRvD..78f4051A \| s2cid=119232226 }}
			* Robert M. Wald, ''Quantum Field Theory in Curved Spacetime and Black Hole Thermodynamics''. University of Chicago Press, 1994.

			==See also==
		⚫	* ]

			{{theories of gravitation}}
			{{quantum gravity}}

	]		]
⚫	]

Latest revision as of 14:31, 23 December 2024

Physical theory with matter as quantum fields but gravity as a classical field

Semiclassical gravity is an approximation to the theory of quantum gravity in which one treats matter and energy fields as being quantum and the gravitational field as being classical.

In semiclassical gravity, matter is represented by quantum matter fields that propagate according to the theory of quantum fields in curved spacetime. The spacetime in which the fields propagate is classical but dynamical. The dynamics of the theory is described by the semiclassical Einstein equations, which relate the curvature of the spacetime that is encoded by the Einstein tensor $G_{\mu \nu }$ to the expectation value of the energy–momentum tensor ${\hat {T}}_{\mu \nu }$ (a quantum field theory operator) of the matter fields, i.e.

G_{\mu \nu }={\frac {8\pi G}{c^{4}}}\left\langle {\hat {T}}_{\mu \nu }\right\rangle _{\psi },

where G is the gravitational constant, and $\psi$ indicates the quantum state of the matter fields.

Energy–momentum tensor

There is some ambiguity in regulating the energy–momentum tensor, and this depends upon the curvature. This ambiguity can be absorbed into the cosmological constant, the gravitational constant, and the quadratic couplings

\int {\sqrt {-g}}R^{2}\,d^{d}x

and

\int {\sqrt {-g}}R^{\mu \nu }R_{\mu \nu }\,d^{d}x.

There is another quadratic term of the form

\int {\sqrt {-g}}R^{\mu \nu \rho \sigma }R_{\mu \nu \rho \sigma }\,d^{d}x,

but in four dimensions this term is a linear combination of the other two terms and a surface term. See Gauss–Bonnet gravity for more details.

Since the theory of quantum gravity is not yet known, it is difficult to precisely determine the regime of validity of semiclassical gravity. However, one can formally show that semiclassical gravity could be deduced from quantum gravity by considering N copies of the quantum matter fields and taking the limit of N going to infinity while keeping the product GN constant. At a diagrammatic level, semiclassical gravity corresponds to summing all Feynman diagrams that do not have loops of gravitons (but have an arbitrary number of matter loops). Semiclassical gravity can also be deduced from an axiomatic approach.

Experimental status

There are cases where semiclassical gravity breaks down. For instance, if M is a huge mass, then the superposition

{\frac {1}{\sqrt {2}}}{\big (}|M{\text{ at }}A\rangle +|M{\text{ at }}B\rangle {\big )},

where the locations A and B are spatially separated, results in an expectation value of the energy–momentum tensor that is M/2 at A and M/2 at B, but one would never observe the metric sourced by such a distribution. Instead, one would observe the decoherence into a state with the metric sourced at A and another sourced at B with a 50% chance each. Extensions of semiclassical gravity that incorporate decoherence have also been studied.

Applications

The most important applications of semiclassical gravity are to understand the Hawking radiation of black holes and the generation of random Gaussian-distributed perturbations in the theory of cosmic inflation, which is thought to occur at the very beginning of the Big Bang.

Notes

See Wald (1994) Chapter 4, section 6 "The Stress–Energy Tensor".
See Page and Geilker; Eppley and Hannah; Albers, Kiefer, and Reginatto.

References

Birrell, N. D. and Davies, P. C. W., Quantum fields in curved space, (Cambridge University Press, Cambridge, UK, 1982).
Page, Don N.; Geilker, C. D. (1981-10-05). "Indirect Evidence for Quantum Gravity". Physical Review Letters. 47 (14). American Physical Society (APS): 979–982. Bibcode:1981PhRvL..47..979P. doi:10.1103/physrevlett.47.979. ISSN 0031-9007.
Eppley, Kenneth; Hannah, Eric (1977). "The necessity of quantizing the gravitational field". Foundations of Physics. 7 (1–2). Springer Science and Business Media LLC: 51–68. Bibcode:1977FoPh....7...51E. doi:10.1007/bf00715241. ISSN 0015-9018. S2CID 123251640.
Albers, Mark; Kiefer, Claus; Reginatto, Marcel (2008-09-18). "Measurement analysis and quantum gravity". Physical Review D. 78 (6). American Physical Society (APS): 064051. arXiv:0802.1978. Bibcode:2008PhRvD..78f4051A. doi:10.1103/physrevd.78.064051. ISSN 1550-7998. S2CID 119232226.
Robert M. Wald, Quantum Field Theory in Curved Spacetime and Black Hole Thermodynamics. University of Chicago Press, 1994.