| Popis: |
We give a uniform trigonometric $R$-matrix for the adjoint representations on the exceptional series. 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. For $L$ a simple Lie algebra there is a rational $R$-matrix in $\mathrm{End}_L(\otimes^2(L\oplus I))$ which has a quantum deformation to a trigonometric $R$-matrix. We construct a sixteen dimensional algebra, $A^\square(\mathit{2})$, which interpolates the quantum deformations of the algebras $\mathrm{End}_L(\otimes^2(L\oplus I))$ and a 287 dimensional algebra, $A^\square(\mathit{3})$, which interpolates the quantum deformations of the algebras $\mathrm{End}_L(\otimes^3(L\oplus I))$. Then we construct an $R$-matrix in $A^\square(\mathit{2})$ which satisfies the Yang--Baxter equation in $A^\square(\mathit{3})$ and which interpolates the trigonometric $R$-matrices for the points in the exceptional series. |
