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Deconfinement and universality in the 3D U(1) lattice gauge theory at finite temperature: study in the dual formulation
- 作者:O. Borisenko ; V. Chelnokov ; M. Gravina ; A. Papa
- 关键词:Lattice Gauge Field Theories ; Confinement ; Duality in Gauge Field Theories
- 刊名:Journal of High Energy Physics
- 出版年:2015
- 出版时间:September 2015
- 年:2015
- 卷:2015
- 期:9
- 全文大小:420 KB
- 参考文献:[1]B. Svetitsky and L.G. Yaffe, Critical behavior at finite temperature confinement transitions, Nucl. Phys. B 210 (1982) 423 [INSPIRE ].CrossRef ADS
[2]V.L. Berezinsky, Destruction of long range order in one-dimensional and two-dimensional systems having a continuous symmetry group. 1. Classical systems, Sov. Phys. JETP 32 (1971) 493 [INSPIRE ].ADS [3]J.M. Kosterlitz and D.J. Thouless, Ordering, metastability and phase transitions in two-dimensional systems, J. Phys. C 6 (1973) 1181 [INSPIRE ].ADS [4]J.M. Kosterlitz, The critical properties of the two-dimensional xy model, J. Phys. C 7 (1974) 1046 [INSPIRE ].ADS [5]N. Mermin and H. Wagner, Absence of ferromagnetism or antiferromagnetism in one- or two-dimensional isotropic Heisenberg models, Phys. Rev. Lett. 17 (1966) 1133 [Erratum ibid. 17 (1996) 1307] [INSPIRE ]. [6]N. Parga, Finite temperature behavior of topological excitations in lattice compact QED, Phys. Lett. B 107 (1981) 442 [INSPIRE ].CrossRef ADS [7]O. Borisenko, Critical behaviour of 3D U(1) LGT at finite temperature, PoS(LATTICE 2007)170 . [8]O. Borisenko and V. Chelnokov, Twist free energy and critical behavior of 3D U(1) LGT at finite temperature, Phys. Lett. B 730 (2014) 226 [arXiv:鈥?311.鈥?179 ] [INSPIRE ].CrossRef ADS [9]O. Borisenko et al., Phase transitions in strongly coupled 3D Z(N ) lattice gauge theories at finite temperature, Phys. Rev. E 86 (2012) 051131 [arXiv:鈥?206.鈥?607 ] [INSPIRE ].ADS [10]O. Borisenko, V. Chelnokov, G. Cortese, M. Gravina, A. Papa and I. Surzhikov, Phase structure of 3D Z(N ) lattice gauge theories at finite temperature, Nucl. Phys. B 870 (2013) 159 [arXiv:鈥?212.鈥?198 ] [INSPIRE ].MathSciNet CrossRef ADS [11]O. Borisenko, V. Chelnokov, M. Gravina and A. Papa, Phase structure of 3D Z(N ) lattice gauge theories at finite temperature: large-N and continuum limits, Nucl. Phys. B 888 (2014) 52 [arXiv:鈥?408.鈥?780 ] [INSPIRE ].MathSciNet CrossRef ADS [12]O. Borisenko et al., BKT phase transitions in strongly coupled 3D Z(N ) LGT at finite temperature, PoS(LATTICE 2012)270 . [13]O. Borisenko et al., Phase transitions in the three-dimensional Z(N ) models, PoS(LATTICE 2013)347 . [14]P.D. Coddington, A.J.G. Hey, A.A. Middleton and J.S. Townsend, The deconfining transition for finite temperature U(1) lattice gauge theory in (2 + 1)-dimensions, Phys. Lett. B 175 (1986) 64 [INSPIRE ].CrossRef ADS [15]O. Borisenko, M. Gravina and A. Papa, Critical behavior of the compact 3D U(1) theory in the limit of zero spatial coupling, J. Stat. Mech. (2008) P08009 [arXiv:鈥?806.鈥?081 ] [INSPIRE ]. [16]O. Borisenko, R. Fiore, M. Gravina and A. Papa, Critical behavior of the compact 3D U(1) gauge theory on isotropic lattices, J. Stat. Mech. (2010) P04015 [arXiv:鈥?001.鈥?979 ] [INSPIRE ]. [17]J. Fr枚hlich and T. Spencer, The Kosterlitz-thouless transition in two-dimensional abelian spin systems and the coulomb gas, Commun. Math. Phys. 81 (1981) 527 [INSPIRE ].CrossRef ADS [18]D.R. Nelson and J.M. Kosterlitz, Universal jump in the superfluid density of two-dimensional superfluids, Phys. Rev. Lett. 39 (1977) 1201 [INSPIRE ].CrossRef ADS [19]C. Itzykson and J.M. Drouffe, Statistical field theory. Volume 1: from brownian motion to renormalization and lattice gauge theory, Cambridge University Press, Cambridge U.K. (1989). [20]M. Hasenbusch, The two dimensional XY model at the transition temperature: A High precision Monte Carlo study, J. Phys. A 38 (2005) 5869 [cond-mat/鈥?502556 ] [INSPIRE ]. [21]M. Hasenbusch, The Binder cumulant at the Kosterlitz-Thouless transition, J. Stat. Mech. (2008) P08003[arXiv:鈥?804.鈥?880 ]. [22]M. Hasenbusch, G. Lana, M. Marcu and K. Pinn, Cluster algorithm for a solid-on-solid model with constraints, Phys. Rev. B 46 (1992) 10472 [cond-mat/鈥?207022 ] [INSPIRE ].
- 作者单位:O. Borisenko (1)
V. Chelnokov (1) M. Gravina (2) A. Papa (2)
1. Bogolyubov Institute for Theoretical Physics, National Academy of Sciences of Ukraine, UA-03680, Kiev, Ukraine 2. Dipartimento di Fisica, Universit脿 della Calabria, and INFN 鈥?Gruppo collegato di Cosenza, I-87036, Arcavacata di Rende, Cosenza, Italy
- 刊物类别:Physics and Astronomy
- 刊物主题:Physics
Elementary Particles and Quantum Field Theory Quantum Field Theories, String Theory
- 出版者:Springer Berlin / Heidelberg
- ISSN:1029-8479
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