V.A. Fateev scite author profile

In their recent paper [1] Alday, Gaiotto and Tachikawa proposed a relation between N = 2 fourdimensional supersymmetric gauge theories and two-dimensional conformal field theories. As part of their conjecture they gave an explicit combinatorial formula for the expansion of the conformal blocks inspired from the exact form of instanton part of the Nekrasov partition function. In this paper we study the origin of such an expansion from a CFT point of view. We consider the algebra A = Vir ⊗ H which is the tensor product of mutually commuting Virasoro and Heisenberg algebras and discover the special orthogonal basis of states in the highest weight representations of A. The matrix elements of primary fields in this basis have a very simple factorized form and coincide with the function called Z bif appearing in the instanton counting literature. Having such a simple basis, the problem of computation of the conformal blocks simplifies drastically and can be shown to lead to the expansion proposed in [1]. We found that this basis diagonalizes an infinite system of commuting Integrals of Motion related to Benjamin-Ono integrable hierarchy.

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Correlation functions in conformal Toda field theory I

Fateev¹,

Litvinov²

2007

J. High Energy Phys.

146

292

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Two-dimensional sl(n) quantum Toda field theory on a sphere is considered. This theory provides an important example of conformal field theory with higher spin symmetry. We derive the three-point correlation functions of the exponential fields if one of the three fields has a special form. In this case it is possible to write down and solve explicitly the differential equation for the four-point correlation function if the fourth field is completely degenerate. We give also expressions for the three-point correlation functions in the cases, when they can be expressed in terms of known functions. The semiclassical and minisuperspace approaches in the conformal Toda field theory are studied and the results coming from these approaches are compared with the proposed analytical expression for the three-point correlation function. We show, that in the framework of semiclassical and minisuperspace approaches general three-point correlation function can be reduced to the finite-dimensional integral.

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Integrable deformations of the O(3) sigma model. The sausage model

1993

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The sigma model (dual) representation for a two-parameter family of integrable quantum field theories

1996

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V.A. Fateev

Conformal algebra and multipoint correlation functions in 2D statistical models

Expectation values of descendent fields in the sine-Gordon model

Four-point correlation functions and the operator algebra in 2D conformal invariant theories with central charge C≤1

Conformal quantum field theory models in two dimensions having Z3 symmetry

On Combinatorial Expansion of the Conformal Blocks Arising from AGT Conjecture

Correlation functions in conformal Toda field theory I

Integrable deformations of the O(3) sigma model. The sausage model

The sigma model (dual) representation for a two-parameter family of integrable quantum field theories

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