Add to ORKG2 Figures, jetpl.cls - Pis'ma v ZhETF, vol. 83, iss. 4, pp. 206-212We study the space of scaling fields in the $Z_N$ symmetric models with the factorized scattering and propose simplest algebraic relations between form factors induced by the action of deformed parafermionic currents. The construction gives a new free field representation for form factors of perturbed Virasoro algebra primary fields, which are parafermionic algebra descendants. We find exact vacuum expectation values of physically important fields and study correlation functions of order and disorder fields in the form factor and CFT perturbation approaches
The graded parafermion conformal field theory at level k is a close cousin of the much-studied Z(k) ...
This thesis is devoted to the study of the local fields in the Ising model. The scaling limit of the...
String dynamics is considered from the viewpoint of conformally invariant field theory. We discuss ...
We study the space of scaling fields in the Z N symmetric models with factorized scattering and prop...
29 ppInternational audienceWe study correlation functions of parafermionic currents and disorder fie...
Abstract Copyright: (c) 2008: Springer Science+Business Media, Inc.We compute exact vacuum expectati...
Using the Ising model with a thermal perturbation as an example, we show that the solution space of ...
We introduce the notion of parafermionic fields as the chiral fields which describe particle excitat...
We study form factors of the quantum complex sinh-Gordon theory in the algebraic approach. In the ca...
Abstract We study quasilocal operators in the quantum complex sinh-Gordon theory in the form factor ...
It is shown that the scaling operators in the conformal limit of a two-dimensional field theory have...
It is shown that the scaling operators in the conformal limit of a two-dimensional field theory have...
AbstractWe study form factors of the quantum complex sinh-Gordon theory in the algebraic approach. I...
Critical statistical mechanics and Conformal Field Theory (CFT) are conjecturally connected since th...
We compute the form factors of the relevant scaling operators in a class of integrable models withou...
The graded parafermion conformal field theory at level k is a close cousin of the much-studied Z(k) ...
This thesis is devoted to the study of the local fields in the Ising model. The scaling limit of the...
String dynamics is considered from the viewpoint of conformally invariant field theory. We discuss ...
We study the space of scaling fields in the Z N symmetric models with factorized scattering and prop...
29 ppInternational audienceWe study correlation functions of parafermionic currents and disorder fie...
Abstract Copyright: (c) 2008: Springer Science+Business Media, Inc.We compute exact vacuum expectati...
Using the Ising model with a thermal perturbation as an example, we show that the solution space of ...
We introduce the notion of parafermionic fields as the chiral fields which describe particle excitat...
We study form factors of the quantum complex sinh-Gordon theory in the algebraic approach. In the ca...
Abstract We study quasilocal operators in the quantum complex sinh-Gordon theory in the form factor ...
It is shown that the scaling operators in the conformal limit of a two-dimensional field theory have...
It is shown that the scaling operators in the conformal limit of a two-dimensional field theory have...
AbstractWe study form factors of the quantum complex sinh-Gordon theory in the algebraic approach. I...
Critical statistical mechanics and Conformal Field Theory (CFT) are conjecturally connected since th...
We compute the form factors of the relevant scaling operators in a class of integrable models withou...
The graded parafermion conformal field theory at level k is a close cousin of the much-studied Z(k) ...
This thesis is devoted to the study of the local fields in the Ising model. The scaling limit of the...
String dynamics is considered from the viewpoint of conformally invariant field theory. We discuss ...