AGT, Burge pairs and minimal models

Abstract

We consider the AGT correspondence in the context of the conformal field theory M\, p, p MH, where M\, p, p is the minimal model based on the Virasoro algebra V\, p, p labeled by two co-prime integers \p, p\, 1 < p < p, and MH is the free boson theory based on the Heisenberg algebra H. Using Nekrasov's instanton partition functions without modification to compute conformal blocks in M\, p, p MH leads to ill-defined or incorrect expressions. Let B\, p, p, Hn be a conformal block in M\, p, p MH, with n consecutive channels i, i = 1, ·s, n, and let i carry states from Hp, pri, si F, where Hp, pri, si is an irreducible highest-weight V\, p, p-representation, labeled by two integers \ri, si\, 0 < ri < p, 0 < si < p, and F is the Fock space of H. We show that restricting the states that flow in i to states labeled by a partition pair \Y1i, Y2i\ such that Yi2, R - Yi1, R + si - 1 ≥ 1 - ri, and Yi1, R - Yi2, R + p - si - 1 ≥ 1 - p + ri, where Yij, R is row- R of Yij, j ∈ \1, 2\, we obtain a well-defined expression that we identify with B\, p, p, Hn. We check the correctness of this expression for 1. Any 1-point B\, p, p, H1 on the torus, when the operator insertion is the identity, and 2. The 6-point B\, 3, 4, H3 on the sphere that involves six Ising magnetic operators.