Confinement-Higgs phase crossover as a lattice artifact in 1 + 1 dimensions
详细信息    查看全文
  • 作者:Axel Cortés Cubero
  • 关键词:Field Theories in Lower Dimensions ; Lattice Gauge Field Theories ; 1/N Expansion ; Integrable Field Theories
  • 刊名:Journal of High Energy Physics
  • 出版年:2015
  • 出版时间:December 2015
  • 年:2015
  • 卷:2015
  • 期:12
  • 全文大小:376 KB
  • 参考文献:[1]E.H. Fradkin and S.H. Shenker, Phase diagrams of lattice gauge theories with Higgs fields, Phys. Rev. D 19 (1979) 3682 [INSPIRE ].ADS
    [2]A.C. Cubero and P. Orland, Dynamical mass reduction in the massive Yang-Mills spectrum in 1 + 1 dimensions, Phys. Rev. D 89 (2014) 085027 [arXiv:-403.-276 ] [INSPIRE ].ADS
    [3]S. Gongyo and D. Zwanziger, Phase structure and the gluon propagator of SU(2) gauge-Higgs model in two dimensions, JHEP 01 (2015) 002 [arXiv:-402.-124 ] [INSPIRE ].CrossRef ADS
    [4]P. Orland, Summing planar diagrams by an integrable bootstrap, Phys. Rev. D 84 (2011) 105005 [arXiv:-108.-058 ] [INSPIRE ].ADS
    [5]P. Orland, Seeing asymptotic freedom in an exact correlator of a large-N matrix field theory, Phys. Rev. D 90 (2014) 125038 [arXiv:-410.-627 ] [INSPIRE ].ADS
    [6]A.C. Cubero, Nontrivial thermodynamics in -em class="EmphasisTypeItalic ">t Hooft-em class="EmphasisTypeItalic ">s large-N limit, Phys. Rev. D 91 (2015) 105025 [arXiv:-503.-6139 ] [INSPIRE ].ADS
    [7]A. Leclair and G. Mussardo, Finite temperature correlation functions in integrable QFT, Nucl. Phys. B 552 (1999) 624 [hep-th/-902075 ] [INSPIRE ].CrossRef ADS MathSciNet
    [8]A.M. Polyakov and P.B. Wiegmann, Theory of nonabelian Goldstone bosons, Phys. Lett. B 131 (1983) 121 [INSPIRE ].CrossRef ADS MathSciNet
    [9]E. Abdalla, M.C.B. Abdalla and A. Lima-Santos, On the exact solution of the principal chiral model, Phys. Lett. B 140 (1984) 71 [Erratum ibid. B 146 (1984) 457] [INSPIRE ].
    [10]P.B. Wiegmann, On the theory of nonabelian Goldstone bosons in two-dimensions: exact solution of the O(3) nonlinear σ model, Phys. Lett. B 141 (1984) 217 [INSPIRE ].CrossRef ADS MathSciNet
    [11]P. Wiegmann, Exact factorized S matrix of the chiral field in two-dimensions, Phys. Lett. B 142 (1984) 173 [INSPIRE ].CrossRef ADS
    [12]A. Cherman, D. Dorigoni, G.V. Dunne and M. ünsal, Resurgence in quantum field theory: nonperturbative effects in the principal chiral model, Phys. Rev. Lett. 112 (2014) 021601 [arXiv:-308.-127 ] [INSPIRE ].CrossRef ADS
    [13]A. Cherman, D. Dorigoni and M. ünsal, Decoding perturbation theory using resurgence: Stokes phenomena, new saddle points and Lefschetz thimbles, JHEP 10 (2015) 056 [arXiv:-403.-277 ] [INSPIRE ].CrossRef ADS
    [14]F.A. Smirnov, Form factors in completely integrable models of quantum field theory, Advanced Series in Mathematical Physics volume 14, World Scientific, Singapore (1992).
    [15]A.M. Polyakov, Gauge fields and strings, Harwood Academic Pulishers, Chur, Switzerland (1987).
    [16]P. Rossi and E. Vicari, Two-dimensional SU(N ) × SU(N ) chiral models on the lattice. 2. The Green-em class="EmphasisTypeItalic ">s function, Phys. Rev. D 49 (1994) 6072 [Erratum ibid. D 50 (1994) 4718] [hep-lat/-401029 ] [INSPIRE ].
    [17]P. Rossi, M. Campostrini and E. Vicari, The large-N expansion of unitary matrix models, Phys. Rept. 302 (1998) 143 [hep-lat/-609003 ] [INSPIRE ].CrossRef ADS MathSciNet
    [18]C.-N. Yang and C.P. Yang, Thermodynamics of one-dimensional system of bosons with repulsive delta function interaction, J. Math. Phys. 10 (1969) 1115 [INSPIRE ].CrossRef ADS MATH
    [19]A.B. Zamolodchikov, Thermodynamic Bethe ansatz in relativistic models. Scaling three state potts and Lee-Yang models, Nucl. Phys. B 342 (1990) 695 [INSPIRE ].CrossRef ADS MathSciNet
    [20]H. Saleur, A comment on finite temperature correlations in integrable QFT, Nucl. Phys. B 567 (200) 602 [hep-th/-909019 ] [INSPIRE ].
    [21]O.A. Castro-Alvaredo and A. Fring, Finite temperature correlation functions from form-factors, Nucl. Phys. B 636 (2002) 611 [hep-th/-203130 ] [INSPIRE ].CrossRef ADS MathSciNet
    [22]M. Karowski and P. Weisz, Exact form-factors in (1 + 1)-dimensional field theoretic models with soliton behavior, Nucl. Phys. B 139 (1978) 455 [INSPIRE ].CrossRef ADS MathSciNet
    [23]H.M. Babujian, A. Foerster and M. Karowski, Exact form factors of the O(N ) σ-model, JHEP 11 (2013) 089 [arXiv:-308.-459 ] [INSPIRE ].CrossRef ADS MathSciNet
    [24]B. Pozsgay and G. Takács, Form factor expansion for thermal correlators, J. Stat. Mech. (2010) P11012 [arXiv:-008.-810 ] [INSPIRE ].
    [25]V. Kazakov and S. Leurent, Finite size spectrum of SU(N ) principal chiral field from discrete Hirota dynamics, arXiv:-007.-770 [INSPIRE ].
    [26]F. Buccheri and G. Takács, Finite temperature one-point functions in non-diagonal integrable field theories: the sine-Gordon model, JHEP 03 (2014) 026 [arXiv:-312.-623 ] [INSPIRE ].CrossRef ADS
  • 作者单位:Axel Cortés Cubero (1)

    1. SISSA and INFN -Sezione di Trieste, via Bonomea 265, 34136, Trieste, 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
文摘
NGLC 2004-2010.National Geological Library of China All Rights Reserved.
Add:29 Xueyuan Rd,Haidian District,Beijing,PRC. Mail Add: 8324 mailbox 100083
For exchange or info please contact us via email.