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Revision as of 11:19, 3 July 2022 edit OpenScience709 (talk \| contribs) Extended confirmed users 4,004 edits m The Polyakov action is an important example of such a model. ← Previous edit		Latest revision as of 07:03, 4 July 2025 edit undo 2405:201:500a:9119:40cb:4c97:bba2:83cb (talk) No edit summary Tags: Mobile edit Mobile web edit
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Line 1: {{Short description\|Class of quantum field theory models}} In [[quantum field theory]], a '''nonlinear ''σ'' model''' describes a ~~[[scalar~~ field]] {{mvar\|Σ}} ~~which~~that takes on values in a nonlinear manifold called the '''target manifold'''  ''T''. The non-linear ''σ''-model was introduced by {{harvtxt\|Gell-Mann\|Lévy\|1960\|loc=~~section~~ §6}}, who named it after a field corresponding to a ~~spinless~~[[spin (physics)\|sp]] [[meson]] called ''σ'' in their model.<ref>{{Citation \| last2=Lévy \| first1=M. \| last1=Gell-Mann \| first2=M. \| s2cid=122945049 \| title=The axial vector current in beta decay \| publisher=Italian Physical Society \| doi=10.1007/BF02859738 \| year=1960 \| journal=Il Nuovo Cimento \| issn=1827-6121 \| volume=16 \| issue=4 \| pages=705–726\| bibcode=1960NCim...16..705G }}</ref> This article deals primarily with the quantization of the non-linear sigma model; please refer to the base article on the [[sigma model]] for general definitions and classical (non-quantum) formulations and results. ==Description== Line 30 ⟶ 31: This represents a [[Ricci flow]], obeying [[Einstein field equations]] for the target manifold as a fixed point. The existence of such a fixed point is relevant, as it grants, at this order of perturbation theory, that [[conformal field theory\|conformal invariance]] is not lost due to quantum corrections, so that the [[quantum field theory]] of this model is sensible (renormalizable). Further adding nonlinear interactions representing flavor-chiral anomalies results in the [[Wess–Zumino–Witten model]],<ref>{{cite journal \|first=E. \|last=Witten \|s2cid=122018499 \|title=Non-abelian bosonization in two dimensions \|journal=[[Communications in Mathematical Physics]] \|volume= 92\| issue= 4 \|year=1984 \| pages= 455–472 \| doi= 10.1007/BF01215276\|bibcode = 1984CMaPh..92..455W \|url=http://projecteuclid.org/euclid.cmp/1103940923 }}</ref> which augments the geometry of the flow to include [[Torsion tensor\|torsion]], preserving renormalizability and leading to an [[infrared fixed point]] as well, on account of [[teleparallelism]] ("geometrostasis").<ref>{{Cite journal \| last1 = Braaten \| first1 = E. \| last2 = Curtright \| first2 = T. L. \| last3 = Zachos \| first3 = C. K. \| doi = 10.1016/0550-3213(85)90053-7 \| title = Torsion and geometrostasis in nonlinear sigma models \| journal = Nuclear Physics B \| volume = 260 \| issue = 3–4 \| pages = 630 \| year = 1985 \|bibcode = 1985NuPhB.260..630B }}</ref> {{further\|Ricci flow}} Line 68 ⟶ 69: [[Category:Quantum field theory]] [[Category:Mathematical physics]] [[Category:Murray Gell-Mann]]