Fisher’s zeros, complex RG flows and confinement in LGT models

Alan Denbleyker; Alexei Bazavov; Daping Du; Yuzhi Liu; Haiyuan Zou; Yannick Meurice

Fisher’s zeros, complex RG flows and confinement in LGT models

Alan Denbleyker, Alexei Bazavov, Daping Du, Yuzhi Liu, Haiyuan Zou, Yannick Meurice

Research output: Contribution to journal › Conference article › peer-review

Abstract

The zeros of the partition function in the complex β plane (Fisher’s zeros) play an important role in our understanding of phase transitions and RG flows. Recently, we argued that they act as gates or separatrices for complex RG flows. Using histogram reweighting to construct the density of states, we calculate the Fisher’s zeros for pure gauge SU(2) and U(1) on L⁴ lattices. For SU(2), these zeros appear to move almost horizontally when the volume increases. They stay away from the real axis which indicates a confining theory at zero temperature. We discuss the effect of an adjoint term on these results. In contrast, using recent multicanonical simulations for the U(1) model for L up to 8 we find that the zeros pinch the real axis near β=1.0113. Preliminary results concerning U(1) at larger volumes, SU(3) with 3 light flavors and plans to delimit the boundary of the conformal window are briefly discussed.

Original language	English
Journal	Proceedings of Science
Volume	139
State	Published - 2011
Externally published	Yes
Event	29th International Symposium on Lattice Field Theory, Lattice 2011 - Squaw Valley, Lake Tahoe, United States Duration: 10 Jul 2011 → 16 Jul 2011

Cite this

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title = "Fisher{\textquoteright}s zeros, complex RG flows and confinement in LGT models",

abstract = "The zeros of the partition function in the complex β plane (Fisher{\textquoteright}s zeros) play an important role in our understanding of phase transitions and RG flows. Recently, we argued that they act as gates or separatrices for complex RG flows. Using histogram reweighting to construct the density of states, we calculate the Fisher{\textquoteright}s zeros for pure gauge SU(2) and U(1) on L4 lattices. For SU(2), these zeros appear to move almost horizontally when the volume increases. They stay away from the real axis which indicates a confining theory at zero temperature. We discuss the effect of an adjoint term on these results. In contrast, using recent multicanonical simulations for the U(1) model for L up to 8 we find that the zeros pinch the real axis near β=1.0113. Preliminary results concerning U(1) at larger volumes, SU(3) with 3 light flavors and plans to delimit the boundary of the conformal window are briefly discussed.",

author = "Alan Denbleyker and Alexei Bazavov and Daping Du and Yuzhi Liu and Haiyuan Zou and Yannick Meurice",

note = "Publisher Copyright: {\textcopyright} Copyright owned by the author(s).; 29th International Symposium on Lattice Field Theory, Lattice 2011 ; Conference date: 10-07-2011 Through 16-07-2011",

year = "2011",

language = "英语",

volume = "139",

journal = "Proceedings of Science",

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T1 - Fisher’s zeros, complex RG flows and confinement in LGT models

AU - Denbleyker, Alan

AU - Bazavov, Alexei

AU - Du, Daping

AU - Liu, Yuzhi

AU - Zou, Haiyuan

AU - Meurice, Yannick

N1 - Publisher Copyright: © Copyright owned by the author(s).

PY - 2011

Y1 - 2011

N2 - The zeros of the partition function in the complex β plane (Fisher’s zeros) play an important role in our understanding of phase transitions and RG flows. Recently, we argued that they act as gates or separatrices for complex RG flows. Using histogram reweighting to construct the density of states, we calculate the Fisher’s zeros for pure gauge SU(2) and U(1) on L4 lattices. For SU(2), these zeros appear to move almost horizontally when the volume increases. They stay away from the real axis which indicates a confining theory at zero temperature. We discuss the effect of an adjoint term on these results. In contrast, using recent multicanonical simulations for the U(1) model for L up to 8 we find that the zeros pinch the real axis near β=1.0113. Preliminary results concerning U(1) at larger volumes, SU(3) with 3 light flavors and plans to delimit the boundary of the conformal window are briefly discussed.

AB - The zeros of the partition function in the complex β plane (Fisher’s zeros) play an important role in our understanding of phase transitions and RG flows. Recently, we argued that they act as gates or separatrices for complex RG flows. Using histogram reweighting to construct the density of states, we calculate the Fisher’s zeros for pure gauge SU(2) and U(1) on L4 lattices. For SU(2), these zeros appear to move almost horizontally when the volume increases. They stay away from the real axis which indicates a confining theory at zero temperature. We discuss the effect of an adjoint term on these results. In contrast, using recent multicanonical simulations for the U(1) model for L up to 8 we find that the zeros pinch the real axis near β=1.0113. Preliminary results concerning U(1) at larger volumes, SU(3) with 3 light flavors and plans to delimit the boundary of the conformal window are briefly discussed.

UR - https://www.scopus.com/pages/publications/84976265068

M3 - 会议文章

AN - SCOPUS:84976265068

SN - 1824-8039

VL - 139

JO - Proceedings of Science

JF - Proceedings of Science

T2 - 29th International Symposium on Lattice Field Theory, Lattice 2011

Y2 - 10 July 2011 through 16 July 2011

ER -

Fisher’s zeros, complex RG flows and confinement in LGT models

Abstract

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