Tetrahedron equation and generalized quantum groups

Atsuo Kuniba; Masato Okado; Sergey Sergeev

arXiv:1503.08536·math.QA·June 21, 2016

Tetrahedron equation and generalized quantum groups

Atsuo Kuniba, Masato Okado, Sergey Sergeev

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TL;DR

This paper constructs families of solutions to the Yang-Baxter equation using tetrahedron equation operators, linking them to quantum groups and their various representations, including tensor and oscillator types.

Contribution

It introduces a unified framework connecting solutions of the Yang-Baxter equation with generalized quantum groups and their diverse representations.

Findings

01

Constructed $2^n$-families of Yang-Baxter solutions from tetrahedron operators.

02

Linked solutions to quantum $R$ matrices of generalized quantum groups.

03

Interpolated various representations of quantum groups through trace and boundary vector constructions.

Abstract

We construct $2^{n}$ -families of solutions of the Yang-Baxter equation from $n$ -products of three-dimensional $R$ and $L$ operators satisfying the tetrahedron equation. They are identified with the quantum $R$ matrices for the Hopf algebras known as generalized quantum groups. Depending on the number of $R$ 's and $L$ 's involved in the product, the trace construction interpolates the symmetric tensor representations of $U_{q} (A_{n - 1}^{(1)})$ and the anti-symmetric tensor representations of $U_{- q^{- 1}} (A_{n - 1}^{(1)})$ , whereas a boundary vector construction interpolates the $q$ -oscillator representation of $U_{q} (D_{n + 1}^{(2)})$ and the spin representation of $U_{- q^{- 1}} (D_{n + 1}^{(2)})$ . The intermediate cases are associated with an affinization of quantum super algebras.

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