The magnetic deformation of the Ising model, and the thermal deformations of both the tricritical Ising model and the tricritical Potts model, are governed by an algebraic structure based on the Dynkin diagram associated with the exceptional algebras E(n) (respectively for n = 8, 7, 6). We make use of these underlying structures as well as the discrete symmetries of the models to compute the matrix elements of the stress-energy tensor and its two-point correlation function by means of the spectral representation method.

Form factors and correlation functions of the stress-energy tensor in massive deformation of the minimal models (E(n))(1)circle times(E(n))(1)/(E(n))(2)

Mussardo, Giuseppe
1996-01-01

Abstract

The magnetic deformation of the Ising model, and the thermal deformations of both the tricritical Ising model and the tricritical Potts model, are governed by an algebraic structure based on the Dynkin diagram associated with the exceptional algebras E(n) (respectively for n = 8, 7, 6). We make use of these underlying structures as well as the discrete symmetries of the models to compute the matrix elements of the stress-energy tensor and its two-point correlation function by means of the spectral representation method.
1996
11
30
5327
5364
Acerbi, C; Valleriani, A; Mussardo, Giuseppe
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/20.500.11767/17161
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