Integrable sigma models at RG fixed points: quantisation as affine Gaudin models

verfasst von: Gleb Andreevich Kotoousov, Sylvain Lacroix, Joerg Teschner
Abstract: The goal of this paper is to make first steps towards the quantisation of integrable non-linear sigma models using the formalism of affine Gaudin models, by approaching these theories through their conformal limits. We focus mostly on the example of the Klimčík model, which is a two-parameter deformation of the Principal Chiral Model on a Lie group G. We show that the UV fixed point of this theory is described classically by two decoupled chiral affine Gaudin models, encoding its left- and right-moving degrees of freedom, and give a detailed analysis of the chiral and integrable structures of these models. Their quantisation is then explored within the framework of Feigin and Frenkel. We study the quantum local integrals of motion using the formalism of quantised affine Gaudin models and show agreement of the first two integrals with known results in the literature for G=SU(2). Evidence is given for the existence of a monodromy matrix satisfying the Yang-Baxter algebra for this model, thus paving the way for the quantisation of the non-local integrals of motion. We conclude with various perspectives, including on generalisations of this program to a larger class of integrable sigma models and applications of the ODE/IQFT correspondence to the description of their quantum spectrum.
Organisationseinheit(en): Institut für Theoretische Physik
Externe Organisation(en): Universität Hamburg
Deutsches Elektronen-Synchrotron (DESY)
Laboratoire de Physique Théorique et des Hautes Energies (LPTHE)
Typ: Artikel
Journal: Annales Henri Poincaré
Band: 25
Seiten: 843
Anzahl der Seiten: 1006
ISSN: 1424-0637
Publikationsdatum: 03.12.2022
Publikationsstatus: Veröffentlicht
Peer-reviewed: Ja

BibTeX

@article{95ac610180b146469f8004ac1dd0c879,
title = "Integrable sigma models at RG fixed points: quantisation as affine Gaudin models",
abstract = "The goal of this paper is to make first steps towards the quantisation of integrable non-linear sigma models using the formalism of affine Gaudin models, by approaching these theories through their conformal limits. We focus mostly on the example of the Klim{\v c}{\'i}k model, which is a two-parameter deformation of the Principal Chiral Model on a Lie group G. We show that the UV fixed point of this theory is described classically by two decoupled chiral affine Gaudin models, encoding its left- and right-moving degrees of freedom, and give a detailed analysis of the chiral and integrable structures of these models. Their quantisation is then explored within the framework of Feigin and Frenkel. We study the quantum local integrals of motion using the formalism of quantised affine Gaudin models and show agreement of the first two integrals with known results in the literature for G=SU(2). Evidence is given for the existence of a monodromy matrix satisfying the Yang-Baxter algebra for this model, thus paving the way for the quantisation of the non-local integrals of motion. We conclude with various perspectives, including on generalisations of this program to a larger class of integrable sigma models and applications of the ODE/IQFT correspondence to the description of their quantum spectrum.",
author = "Kotoousov, {Gleb Andreevich} and Sylvain Lacroix and Joerg Teschner",
year = "2022",
month = dec,
day = "3",
language = "English",
volume = "25",
pages = "843",
journal = "Annales Henri Poincar{\'e}",
issn = "1424-0637",
publisher = "Birkhauser Verlag Basel",
}