N=2* gauge theory, free fermions on the torus and Painlev\'e VI

Abstract

In this paper we study the extension of Painlev\'e/gauge theory correspondence to circular quivers by focusing on the special case of SU(2) N=2* theory. We show that the Nekrasov-Okounkov partition function of this gauge theory provides an explicit combinatorial expression and a Fredholm determinant formula for the tau-function describing isomonodromic deformations of SL2 flat connections on the one-punctured torus. This is achieved by reformulating the Riemann-Hilbert problem associated to the latter in terms of chiral conformal blocks of a free-fermionic algebra. This viewpoint provides the exact solution of the renormalization group flow of the SU(2) N=2* theory on self-dual -background and, in the Seiberg-Witten limit, an elegant relation between the IR and UV gauge couplings.