Meromorphic tensor equivalence for Yangians and quantum loop algebras

TL;DR

This paper constructs a tensor equivalence between representations of Yangians and quantum loop algebras, extending the Kohno-Drinfeld theorem to a meromorphic braided tensor category setting for generic deformation parameters.

Contribution

It introduces a tensor structure on a functor linking Yangian and quantum loop algebra representations, establishing an equivalence of meromorphic braided tensor categories.

Findings

Constructed a tensor structure on the functor Gammad.

Proved the equivalence of categories when |q| eq 1.

Extended the Kohno-Drinfeld theorem to the meromorphic setting.

Abstract

Let ${\mathfrak g}$ be a complex semisimple Lie algebra, and $Y_h({\mathfrak g})$, $U_q(L{\mathfrak g})$ the corresponding Yangian and quantum loop algebra, with deformation parameters related by $q=\exp(\pi i h)$. When $h$ is not a rational number, we constructed in arXiv:1310.7318 a faithful functor $\Gamma$ from the category of finite-dimensional representations of $Y_h ({\mathfrak g})$ to those of $U_q(L{\mathfrak g})$. The functor $\Gamma$ is governed by the additive difference equations defined by the commuting fields of the Yangian, and restricts to an equivalence on a subcategory of $Y_h({\mathfrak g})$ defined by choosing a branch of the logarithm. In this paper, we construct a tensor structure on $\Gamma$ and show that, if $|q|\neq 1$, it yields an equivalence of meromorphic braided tensor categories, when $Y_h({\mathfrak g})$ and $U_q(L{\mathfrak g})$ are endowed with the deformed Drinfeld coproducts and the commutative part of the universal $R$-matrix. This proves in particular the Kohno-Drinfeld theorem for the abelian $q$KZ equations defined by $Y_h({\mathfrak g})$. The tensor structure arises from the abelian $q$KZ equations defined by a appropriate regularisation of the commutative $R$-matrix of $Y_h({\mathfrak g})$.