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Paper detail

A unifying 2d action for integrable $σ$-models from 4d Chern-Simons theory

In the approach recently proposed by K. Costello and M. Yamazaki, which is based on a four-dimensional variant of Chern-Simons theory, we derive a simple and unifying two-dimensional form for the action of many integrable $σ$-models which are known to admit descriptions as affine Gaudin models. This includes both the Yang-Baxter deformation and the $λ$-deformation of the principal chiral model. We also give an interpretation of Poisson-Lie $T$-duality in this setting and derive the action of the $\mathsf{E}$-model.

preprint2020arXivOpen access
Francois DelducSylvain LacroixMarc MagroBenoit Vicedo
hep-th
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Francois DelducSylvain LacroixMarc MagroBenoit Vicedo

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