# Constrained affine Gaudin models and diagonal Yang-Baxter deformations

**Authors:** Sylvain Lacroix

arXiv: 1907.04836 · 2020-06-08

## TL;DR

This paper develops a systematic gauging approach for affine Gaudin models, enabling the construction of integrable deformations that break diagonal symmetry, with applications to coupled sigma-models on product Lie groups.

## Contribution

It introduces a gauging procedure to reformulate affine Gaudin models with gauge symmetry and constructs their integrable deformations, including diagonal Yang-Baxter deformations.

## Key findings

- Reformulation of affine Gaudin models as gauge theories.
- Construction of integrable deformations breaking diagonal symmetry.
- Application to coupled sigma-models on product Lie groups.

## Abstract

We review and pursue further the study of constrained realisations of affine Gaudin models, which form a large class of two-dimensional integrable field theories with gauge symmetries. In particular, we develop a systematic gauging procedure which allows to reformulate the non-constrained realisations of affine Gaudin models considered recently in [JHEP 06 (2019) 017] as equivalent models with a gauge symmetry. This reformulation is then used to construct integrable deformations of these models breaking their diagonal symmetry. In a second time, we apply these general methods to the integrable coupled $\sigma$-model introduced recently, whose target space is the N-fold Cartesian product $G_0^N$ of a real semi-simple Lie group $G_0$. We present its gauged formulation as a model on $G_0^{N+1}$ with a gauge symmetry acting as the right multiplication by the diagonal subgroup $G_0^{\text{diag}}$ and construct its diagonal homogeneous Yang-Baxter deformation.

## Full text

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## References

40 references — full list in the complete paper: https://tomesphere.com/paper/1907.04836/full.md

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Source: https://tomesphere.com/paper/1907.04836