N = 2 ∗ Gauge Theory, Free Fermions on the Torus and Painlevé VI

Giulio Bonelli; Fabrizio Del Monte; Pavlo Gavrylenko; Alessandro Tanzini

doi:10.1007/s00220-020-03743-y

N = 2 ^∗ Gauge Theory, Free Fermions on the Torus and Painlevé VI

Giulio Bonelli
, Fabrizio Del Monte^*
, Pavlo Gavrylenko
, Alessandro Tanzini

^*Corresponding author for this work

Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper we study the extension of Painlevé/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 Ω -background and, in the Seiberg–Witten limit, an elegant relation between the IR and UV gauge couplings.

Original language	English
Pages (from-to)	1381-1419
Number of pages	39
Journal	Communications in Mathematical Physics
Volume	377
Issue number	2
Early online date	24 Mar 2020
DOIs	https://doi.org/10.1007/s00220-020-03743-y
Publication status	Published - Jul 2020

Bibliographical note

Publisher Copyright:
© 2020, Springer-Verlag GmbH Germany, part of Springer Nature.

ASJC Scopus subject areas

Statistical and Nonlinear Physics
Mathematical Physics

Access to Document

10.1007/s00220-020-03743-yLicence: None: All rights reserved

Cite this

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title = "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 Ω -background and, in the Seiberg–Witten limit, an elegant relation between the IR and UV gauge couplings.",

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