Some exact results for the three-layer Zamolodchikov model

H. E. Boos; V. V. Mangazeev

doi:10.1016/S0550-3213(00)00619-2

Some exact results for the three-layer Zamolodchikov model

H. E. Boos^*, V. V. Mangazeev

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

2 Citations (Scopus)

Abstract

In this paper we continue the study of the three-layer Zamolodchikov model started in our previous works (H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 3041-3054 and H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298). We analyse numerically the solutions to the Bethe ansatz equations obtained in H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298. We consider two regimes I and II which differ by the signs of the spherical sides (a₁,a₂,a₃)→(-a₁,-a₂,-a₃). We accept the two-line hypothesis for the regime I and the one-line hypothesis for the regime II. In the thermodynamic limit we derive integral equations for distribution densities and solve them exactly. We calculate the partition function for the three-layer Zamolodchikov model and check a compatibility of this result with the functional relations obtained in H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298. We also do some numeric checkings of our results.

Original language	English
Pages (from-to)	597-626
Number of pages	30
Journal	Nuclear Physics B
Volume	592
Issue number	3
DOIs	https://doi.org/10.1016/S0550-3213(00)00619-2
Publication status	Published - 8 Jan 2001

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title = "Some exact results for the three-layer Zamolodchikov model",

abstract = "In this paper we continue the study of the three-layer Zamolodchikov model started in our previous works (H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 3041-3054 and H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298). We analyse numerically the solutions to the Bethe ansatz equations obtained in H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298. We consider two regimes I and II which differ by the signs of the spherical sides (a1,a2,a3)→(-a1,-a2,-a3). We accept the two-line hypothesis for the regime I and the one-line hypothesis for the regime II. In the thermodynamic limit we derive integral equations for distribution densities and solve them exactly. We calculate the partition function for the three-layer Zamolodchikov model and check a compatibility of this result with the functional relations obtained in H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298. We also do some numeric checkings of our results.",

keywords = "05.30, 05.50, Bethe ansatz, Functional relations, Inversion relations, Transfer matrix, Zamolodchikov model* sl(n) chiral Potts model",

author = "Boos, \{H. E.\} and Mangazeev, \{V. V.\}",

year = "2001",

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doi = "10.1016/S0550-3213(00)00619-2",

language = "English",

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T1 - Some exact results for the three-layer Zamolodchikov model

AU - Boos, H. E.

AU - Mangazeev, V. V.

PY - 2001/1/8

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N2 - In this paper we continue the study of the three-layer Zamolodchikov model started in our previous works (H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 3041-3054 and H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298). We analyse numerically the solutions to the Bethe ansatz equations obtained in H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298. We consider two regimes I and II which differ by the signs of the spherical sides (a1,a2,a3)→(-a1,-a2,-a3). We accept the two-line hypothesis for the regime I and the one-line hypothesis for the regime II. In the thermodynamic limit we derive integral equations for distribution densities and solve them exactly. We calculate the partition function for the three-layer Zamolodchikov model and check a compatibility of this result with the functional relations obtained in H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298. We also do some numeric checkings of our results.

AB - In this paper we continue the study of the three-layer Zamolodchikov model started in our previous works (H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 3041-3054 and H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298). We analyse numerically the solutions to the Bethe ansatz equations obtained in H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298. We consider two regimes I and II which differ by the signs of the spherical sides (a1,a2,a3)→(-a1,-a2,-a3). We accept the two-line hypothesis for the regime I and the one-line hypothesis for the regime II. In the thermodynamic limit we derive integral equations for distribution densities and solve them exactly. We calculate the partition function for the three-layer Zamolodchikov model and check a compatibility of this result with the functional relations obtained in H.E. Boos, V.V. Mangazeev, J. Phys. A 32 (1999) 5285-5298. We also do some numeric checkings of our results.

KW - 05.30

KW - 05.50

KW - Bethe ansatz

KW - Functional relations

KW - Inversion relations

KW - Transfer matrix

KW - Zamolodchikov model sl(n) chiral Potts model

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U2 - 10.1016/S0550-3213(00)00619-2

DO - 10.1016/S0550-3213(00)00619-2

M3 - Article

SN - 0550-3213

VL - 592

SP - 597

EP - 626

JO - Nuclear Physics B

JF - Nuclear Physics B

IS - 3

ER -

Some exact results for the three-layer Zamolodchikov model

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