Trigonometric K-matrices for finite-dimensional representations of quantum affine algebras

Abstract

Let g be a complex simple Lie algebra and Uq(g) the corresponding quantum affine algebra. We prove that every irreducible finite-dimensional Uq(g)-module gives rise to a family of trigonometric solutions of Cherednik's generalized reflection equation. These depend upon the choice of a quantum affine symmetric pair Uq(k)⊂ Uq(g). Our result relies on the construction of universal K-matrices for arbitrary quantum symmetric pairs, obtained in our previous work, as well as the fact that every irreducible Uq(g)-module is generically irreducible under restriction to Uq(k). In the case of small modules and Kirillov-Reshetikhin modules, we obtain new solutions of the standard and the transposed reflection equations.