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			{{Short description\|Topological structure used in a description of quantum gravity}}
	In ], a '''spin foam''' is a topological structure made out of two-dimensional faces that represents one of the configurations that must be summed to obtain a ] (]) description of ]. It is closely related to ].
			{{Beyond the Standard Model\|cTopic=]}}

			In ], the ] structure of '''spinfoam''' or '''spin foam'''<ref name="url Introduction to Loop Quantum Gravity and Spin Foams">{{cite arXiv \|title= Introduction to Loop Quantum Gravity and Spin Foams \|eprint=gr-qc/0409061 \|last1=Perez \|first1=Alejandro \|year=2004 }}</ref> consists of two-dimensional faces representing a configuration required by ] to obtain a ] description of ]. These structures are employed in ] as a version of ].
⚫	==~~Spin foam in~~ loop quantum gravity==
⚫	~~In ] there are some results from a possible ] of ] at the ]. Any path integral formulation of the theory can be written in the form of a '''spin foam model''', such as the ].~~ A ] is defined as a diagram (like ]) which ~~make~~ a basis of ~~connections~~ between the elements of a ] for the ] defined over them~~. ]s provide a~~ ~~representation~~ for computations of amplitudes between two different ]s of the ]. Any evolution of ] provides a spin foam over a ] of one dimension higher than the dimensions of the corresponding spin network. A spin foam ~~may~~ be ~~viewed as a~~ ].

		⚫	==In loop quantum gravity==
⚫	==~~The~~ ~~idea~~==
		⚫	{{main\|Loop quantum gravity}}
⚫	~~]s provide a language to describe ] of space. Spin foam does the same job on spacetime.~~ A spin network is a ~~one~~-dimensional ], together with labels on its vertices and edges which ~~encodes~~ aspects of a spatial geometry.

			The ] of loop quantum gravity provides the best formulation of the dynamics of the theory of ] – a ] where the invariance under ] of ] applies. The resulting path integral represents a sum over all the possible configurations of spin foam.{{how\|date=May 2016}}
⚫	Spacetime is ~~considered~~ as a superposition of spin foams, which is a generalized ] where instead of a graph ~~we use~~ a higher-dimensional complex. In ] this sort of space is called a 2-]. A spin foam is a particular type of 2-complex, ~~together~~ with labels for ], edges and ]. The boundary of a spin foam is spin network, just as in the theory of ], where the boundary of an n-manifold is an (n-1)-manifold.

	==~~See~~ ~~also~~==		===Spin network===
			{{Main\|Spin network}}
⚫	*]
		⚫	A spin network is a two-dimensional ], together with labels on its vertices and edges which encode aspects of a spatial geometry.
	*]

		⚫	A spin network is defined as a diagram like the ] which makes a basis of ]s between the elements of a ] for the ]s defined over them, and for computations of amplitudes between two different ]s of the ]. Any evolution of the spin network provides a spin foam over a manifold of one dimension higher than the dimensions of the corresponding spin network.{{clarify\|date=May 2016}} A spin foam is analogous to ].{{why\|date=May 2016}}

			===Spacetime===

			Spin networks provide a language to describe the ] of space. Spin foam does the same job for spacetime.

		⚫	Spacetime can be defined as a superposition of spin foams, which is a generalized Feynman diagram where instead of a graph, a higher-dimensional complex is used. In ] this sort of space is called a 2-]. A spin foam is a particular type of 2-], with labels for ], edges and ]. The boundary of a spin foam is a spin network, just as in the theory of manifolds, where the boundary of an n-manifold is an (n-1)-manifold.

			In loop quantum gravity, the present spin foam theory has been inspired by the work of ]. The idea was introduced by Reisenberger and Rovelli in 1997,<ref>{{cite journal \|author1=Reisenberger \|first=Michael \|author2=Rovelli \|first2=Carlo \|author-link2=Carlo Rovelli \|year=1997 \|title="Sum over surfaces" form of loop quantum gravity \|journal=Physical Review D \|volume=56 \|issue=6 \|pages=3490–3508 \|arxiv=gr-qc/9612035 \|bibcode=1997PhRvD..56.3490R \|doi=10.1103/PhysRevD.56.3490}}</ref> and later developed into the ]. The formulation that is used nowadays is commonly called EPRL after the names of the authors of a series of seminal papers,<ref>{{cite journal \|author1=Engle \|first=Jonathan \|author2=Pereira \|first2=Roberto \|author3=Rovelli \|first3=Carlo \|author-link3=Carlo Rovelli \|author4=Livine \|first4=Etera \|year=2008 \|title=LQG vertex with finite Immirzi parameter \|journal=Nuclear Physics B \|volume=799 \|issue=1–2 \|pages=136–149 \|arxiv=0711.0146 \|bibcode=2008NuPhB.799..136E \|doi=10.1016/j.nuclphysb.2008.02.018}}</ref> but the theory has also seen fundamental contributions from the work of many others, such as ] (FK model) and ] (KKL model).

			==Definition==
			The summary partition function for a '''spin foam model''' is

			<math> Z:=\sum_{\Gamma}w(\Gamma)\left</math>

			with:

			* a set of 2-complexes <math>\Gamma</math> each consisting out of faces <math>f</math>, edges <math>e</math> and vertices <math>v</math>. Associated to each 2-complex <math>\Gamma</math> is a weight <math>w(\Gamma)</math>
			* a set of irreducible representations <math>j</math> which label the faces and intertwiners <math>i</math> which label the edges.
			* a vertex amplitude <math>A_v(j_f,i_e)</math> and an edge amplitude <math>A_e(j_f,i_e)</math>
			* a face amplitude <math>A_f(j_f)</math>, for which we almost always have <math>A_f(j_f)=\dim(j_f)</math>

		⚫	==See also==
			* ]
			* ]
			* ]
			* ]

	==References==		==References==
			{{Reflist}}
	* Alejandro Perez(2002)""


			== External links ==
			* {{cite journal \|arxiv=gr-qc/9709052 \|first=John C. \|last=Baez \|title=Spin foam models \|journal=Classical and Quantum Gravity \|year=1998 \|volume=15 \|issue=7 \|pages=1827–1858 \|doi=10.1088/0264-9381/15/7/004 \|bibcode=1998CQGra..15.1827B \|s2cid=6449360 }}
			* {{cite journal \|arxiv=gr-qc/0301113 \|first=Alejandro \|last=Perez \|title=Spin Foam Models for Quantum Gravity \|journal=Classical and Quantum Gravity \|date=2003 \|volume=20 \|issue=6 \|pages=R43–R104 \|doi=10.1088/0264-9381/20/6/202 \|s2cid=13891330 }}
			* {{cite arXiv \|eprint=1102.3660 \|first=Carlo \|last=Rovelli \|title=Zakopane lectures on loop gravity \|date=2011 \|class=gr-qc }}

	]		{{Quantum gravity}}
	{{quantum-stub}}

			{{DEFAULTSORT:Spin Foam}}
	]
			]
	]
			]

Latest revision as of 18:18, 26 November 2024

Topological structure used in a description of quantum gravity

Beyond the Standard Model
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In physics, the topological structure of spinfoam or spin foam consists of two-dimensional faces representing a configuration required by functional integration to obtain a Feynman's path integral description of quantum gravity. These structures are employed in loop quantum gravity as a version of quantum foam.

In loop quantum gravity

Main article: Loop quantum gravity

The covariant formulation of loop quantum gravity provides the best formulation of the dynamics of the theory of quantum gravity – a quantum field theory where the invariance under diffeomorphisms of general relativity applies. The resulting path integral represents a sum over all the possible configurations of spin foam.

Spin network

Main article: Spin network

A spin network is a two-dimensional graph, together with labels on its vertices and edges which encode aspects of a spatial geometry.

A spin network is defined as a diagram like the Feynman diagram which makes a basis of connections between the elements of a differentiable manifold for the Hilbert spaces defined over them, and for computations of amplitudes between two different hypersurfaces of the manifold. Any evolution of the spin network provides a spin foam over a manifold of one dimension higher than the dimensions of the corresponding spin network. A spin foam is analogous to quantum history.

Spacetime

Spin networks provide a language to describe the quantum geometry of space. Spin foam does the same job for spacetime.

Spacetime can be defined as a superposition of spin foams, which is a generalized Feynman diagram where instead of a graph, a higher-dimensional complex is used. In topology this sort of space is called a 2-complex. A spin foam is a particular type of 2-complex, with labels for vertices, edges and faces. The boundary of a spin foam is a spin network, just as in the theory of manifolds, where the boundary of an n-manifold is an (n-1)-manifold.

In loop quantum gravity, the present spin foam theory has been inspired by the work of Ponzano–Regge model. The idea was introduced by Reisenberger and Rovelli in 1997, and later developed into the Barrett–Crane model. The formulation that is used nowadays is commonly called EPRL after the names of the authors of a series of seminal papers, but the theory has also seen fundamental contributions from the work of many others, such as Laurent Freidel (FK model) and Jerzy Lewandowski (KKL model).

Definition

The summary partition function for a spin foam model is

$Z:=\sum _{\Gamma }w(\Gamma )\left$

with:

a set of 2-complexes $\Gamma$ each consisting out of faces $f$ , edges $e$ and vertices $v$ . Associated to each 2-complex $\Gamma$ is a weight $w(\Gamma )$
a set of irreducible representations $j$ which label the faces and intertwiners $i$ which label the edges.
a vertex amplitude $A_{v}(j_{f},i_{e})$ and an edge amplitude $A_{e}(j_{f},i_{e})$
a face amplitude $A_{f}(j_{f})$ , for which we almost always have $A_{f}(j_{f})=\dim(j_{f})$

References

Perez, Alejandro (2004). " Introduction to Loop Quantum Gravity and Spin Foams". arXiv:gr-qc/0409061.
Reisenberger, Michael; Rovelli, Carlo (1997). ""Sum over surfaces" form of loop quantum gravity". Physical Review D. 56 (6): 3490–3508. arXiv:gr-qc/9612035. Bibcode:1997PhRvD..56.3490R. doi:10.1103/PhysRevD.56.3490.
Engle, Jonathan; Pereira, Roberto; Rovelli, Carlo; Livine, Etera (2008). "LQG vertex with finite Immirzi parameter". Nuclear Physics B. 799 (1–2): 136–149. arXiv:0711.0146. Bibcode:2008NuPhB.799..136E. doi:10.1016/j.nuclphysb.2008.02.018.

External links

Baez, John C. (1998). "Spin foam models". Classical and Quantum Gravity. 15 (7): 1827–1858. arXiv:gr-qc/9709052. Bibcode:1998CQGra..15.1827B. doi:10.1088/0264-9381/15/7/004. S2CID 6449360.
Perez, Alejandro (2003). "Spin Foam Models for Quantum Gravity". Classical and Quantum Gravity. 20 (6): R43–R104. arXiv:gr-qc/0301113. doi:10.1088/0264-9381/20/6/202. S2CID 13891330.
Rovelli, Carlo (2011). "Zakopane lectures on loop gravity". arXiv:1102.3660 .

Quantum gravity

Central concepts

Toy models

Quantum field theory
in curved spacetime

Black holes

Approaches

String theory	Bosonic string theory M-theory Supergravity Superstring theory
Canonical quantum gravity	Loop quantum gravity Wheeler–DeWitt equation
Euclidean quantum gravity	Hartle–Hawking state
Others	Causal dynamical triangulation Causal sets Dual graviton Group field theory Noncommutative geometry Spin foam Superfluid vacuum theory Twistor theory

Applications

Quantum cosmology

See also:

Template:Quantum mechanics topics

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