GROUP FIELD THEORY - Encyclopedia Information

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Group field theory (GFT) is a quantum field theory in which the base manifold is taken to be a Lie group. It is closely related to background independent quantum gravity approaches such as loop quantum gravity, the spin foam formalism and causal dynamical triangulation. Its perturbative expansion can be interpreted as spin foams and simplicial pseudo-manifolds (depending on the representation of the fields). Thus, its partition function defines a non-perturbative sum over all simplicial topologies and geometries, giving a path integral formulation of quantum spacetime.

References

Wayback Machine see Sec 6.8 Dynamics: III. Group field theory
Freidel, L. (2005). "Group Field Theory: An Overview". International Journal of Theoretical Physics. 44 (10): 1769–1783. arXiv: hep-th/0505016. Bibcode: 2005IJTP...44.1769F. doi: 10.1007/s10773-005-8894-1. S2CID 119099369.
Oriti, Daniele (2006). "The group field theory approach to quantum gravity". arXiv: gr-qc/0607032. Bibcode: 2006gr.qc.....7032O. {{ cite journal}}: Cite journal requires |journal= ( help)
Oriti, Daniele (2009). "The Group Field Theory Approach to Quantum Gravity: A QFT for the Microstructure of Spacetime" (PDF). arXiv: 0912.2441. {{ cite journal}}: Cite journal requires |journal= ( help)
Geloun, Joseph Ben; Krajewski, Thomas; Magnen, Jacques; Rivasseau, Vincent (2010). "Linearized group field theory and power-counting theorems". Classical and Quantum Gravity. 27 (15): 155012. arXiv: 1002.3592. Bibcode: 2010CQGra..27o5012B. doi: 10.1088/0264-9381/27/15/155012. S2CID 29020457.
Ben Geloun, J.; Gurau, R.; Rivasseau, V. (2010). "EPRL/FK group field theory". Europhysics Letters. 92 (6): 60008. arXiv: 1008.0354. Bibcode: 2010EL.....9260008B. doi: 10.1209/0295-5075/92/60008. S2CID 119247896.
Ashtekar, Abhay; Campiglia, Miguel; Henderson, Adam (2009). "Loop quantum cosmology and spin foams". Physics Letters B. 681 (4): 347–352. arXiv: 0909.4221. Bibcode: 2009PhLB..681..347A. doi: 10.1016/j.physletb.2009.10.042. S2CID 56281948.
Fairbairn, Winston J.; Livine, Etera R. (2007). "3D spinfoam quantum gravity: Matter as a phase of the group field theory". Classical and Quantum Gravity. 24 (20): 5277–5297. arXiv: gr-qc/0702125. Bibcode: 2007CQGra..24.5277F. doi: 10.1088/0264-9381/24/20/021. S2CID 119369221.
Alexandrov, Sergei; Roche, Philippe (2011). "Critical overview of loops and foams". Physics Reports. 506 (3–4): 41–86. arXiv: 1009.4475. Bibcode: 2011PhR...506...41A. doi: 10.1016/j.physrep.2011.05.002. S2CID 118543391.
Gielen, Steffen; Oriti, Daniele; Sindoni, Lorenzo (2013). "Cosmology from Group Field Theory Formalism for Quantum Gravity". Physical Review Letters. 111 (3): 031301. arXiv: 1303.3576. Bibcode: 2013PhRvL.111c1301G. doi: 10.1103/PhysRevLett.111.031301. PMID 23909305. S2CID 14203682.

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 Noncommutative geometry Spin foam Group field theory Superfluid vacuum theory Twistor theory Dual graviton

Applications

Quantum cosmology

See also: Template:Quantum mechanics topics

This quantum mechanics-related article is a stub. You can help Wikipedia by expanding it.

References

Wayback Machine see Sec 6.8 Dynamics: III. Group field theory

Freidel, L. (2005). "Group Field Theory: An Overview". International Journal of Theoretical Physics. 44 (10): 1769–1783. arXiv: hep-th/0505016. Bibcode: 2005IJTP...44.1769F. doi: 10.1007/s10773-005-8894-1. S2CID 119099369.

Oriti, Daniele (2006). "The group field theory approach to quantum gravity". arXiv: gr-qc/0607032. Bibcode: 2006gr.qc.....7032O.

{{
cite journal}}

: Cite journal requires |journal= ( help)

Oriti, Daniele (2009). "The Group Field Theory Approach to Quantum Gravity: A QFT for the Microstructure of Spacetime" (PDF). arXiv: 0912.2441.

{{
cite journal}}

: Cite journal requires |journal= ( help)

Geloun, Joseph Ben; Krajewski, Thomas; Magnen, Jacques; Rivasseau, Vincent (2010). "Linearized group field theory and power-counting theorems". Classical and Quantum Gravity. 27 (15): 155012. arXiv: 1002.3592. Bibcode: 2010CQGra..27o5012B. doi: 10.1088/0264-9381/27/15/155012. S2CID 29020457.

Ben Geloun, J.; Gurau, R.; Rivasseau, V. (2010). "EPRL/FK group field theory". Europhysics Letters. 92 (6): 60008. arXiv: 1008.0354. Bibcode: 2010EL.....9260008B. doi: 10.1209/0295-5075/92/60008. S2CID 119247896.

Ashtekar, Abhay; Campiglia, Miguel; Henderson, Adam (2009). "Loop quantum cosmology and spin foams". Physics Letters B. 681 (4): 347–352. arXiv: 0909.4221. Bibcode: 2009PhLB..681..347A. doi: 10.1016/j.physletb.2009.10.042. S2CID 56281948.

Fairbairn, Winston J.; Livine, Etera R. (2007). "3D spinfoam quantum gravity: Matter as a phase of the group field theory". Classical and Quantum Gravity. 24 (20): 5277–5297. arXiv: gr-qc/0702125. Bibcode: 2007CQGra..24.5277F. doi: 10.1088/0264-9381/24/20/021. S2CID 119369221.

Alexandrov, Sergei; Roche, Philippe (2011). "Critical overview of loops and foams". Physics Reports. 506 (3–4): 41–86. arXiv: 1009.4475. Bibcode: 2011PhR...506...41A. doi: 10.1016/j.physrep.2011.05.002. S2CID 118543391.

Gielen, Steffen; Oriti, Daniele; Sindoni, Lorenzo (2013). "Cosmology from Group Field Theory Formalism for Quantum Gravity". Physical Review Letters. 111 (3): 031301. arXiv: 1303.3576. Bibcode: 2013PhRvL.111c1301G. doi: 10.1103/PhysRevLett.111.031301. PMID 23909305. S2CID 14203682.

This quantum mechanics-related article is a stub. You can help Wikipedia by expanding it.

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