Two-Parameter Quantum Groups and R-Matrices: Classical Types
Abstract
We construct finite R-matrices for the first fundamental representation V of two-parameter quantum groups Ur,s(g) for classical g, both through the decomposition of V V into irreducibles Ur,s(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 Ur,s(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 Ur,s(g) for classical g. The latter generalizes the formulas of [Comm. Math. Phys. 102 (1986), 537-547] for one-parametric quantum affine algebras.
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