A uniform trigonometric R-matrix for the exceptional series

Abstract

The exceptional series is a finite list of points on a projective line with a simple Lie algebra attached to each point. This list of Lie algebras includes the five exceptional Lie algebras. We give a uniform trigonometric R-matrix for the exceptional series in the representation L I, where L is the quantum deformation of the adjoint representation and I is the trivial representation. We construct a sixteen dimensional algebra, A(2), which interpolates the algebras End(2(L I)) and a 287 dimensional algebra, A(3), which interpolates the algebras End(3(L I)). The R-matrix lives in A(2) and satisfies the Yang-Baxter equation in A(3); it interpolates the trigonometric R-matrices for the points in the exceptional series.