Two-Parameter Quantum Groups and $R$-Matrices: Classical Types

TL;DR

This paper constructs explicit finite and affine R-matrices for two-parameter quantum groups of classical types, using decomposition, universal R-matrix evaluation, and Lyndon word combinatorics, extending known one-parameter results.

Contribution

It introduces new methods to explicitly construct R-matrices for two-parameter quantum groups and affine algebras, generalizing previous one-parameter formulas.

Findings

Explicit finite R-matrices for fundamental representations.

Formulas for affine R-matrices via Yang-Baxterization.

Extension of one-parameter R-matrix formulas to two-parameter case.

Abstract

We construct finite $R$-matrices for the first fundamental representation $V$ of two-parameter quantum groups $U_{r,s}(\mathfrak{g})$ for classical $\mathfrak{g}$, both through the decomposition of $V\otimes V$ into irreducibles $U_{r,s}(\mathfrak{g})$-submodules as well as by evaluating the universal $R$-matrix. The latter is crucially based on the construction of dual PBW-type bases of $U^{\pm}_{r,s}(\mathfrak{g})$ consisting of the ordered products of quantum root vectors defined via $(r,s)$-bracketings and combinatorics of standard Lyndon words. We further derive explicit formulas for affine $R$-matrices, both through the Yang-Baxterization technique of [Internat. J. Modern Phys. A 6 (1991), 3735-3779] and as the unique intertwiner between the tensor product of $V(u)$ and $V(v)$, viewed as modules over two-parameter quantum affine algebras $U_{r,s}(\widehat{\mathfrak{g}})$ for classical $\mathfrak{g}$. The latter generalizes the formulas of [Comm. Math. Phys. 102 (1986), 537-547] for one-parametric quantum affine algebras.