Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
1894577 | Journal of Geometry and Physics | 2007 | 12 Pages |
In [A.A. Stolin, On rational solutions of Yang–Baxter equation for sl(n), Math. Scand. 69 (1991) 57–80; A.A. Stolin, On rational solutions of Yang–Baxter equation. Maximal orders in loop algebra, Comm. Math. Phys. 141 (1991) 533–548; A. Stolin, A geometrical approach to rational solutions of the classical Yang–Baxter equation. Part I, in: Walter de Gruyter & Co. (Ed.), Symposia Gaussiana, Conf. Alg., Berlin, New York, 1995, pp. 347–357] a theory of rational solutions of the classical Yang–Baxter equation for a simple complex Lie algebra g was presented. We discuss this theory for simple compact real Lie algebras g. We prove that up to gauge equivalence all rational solutions have the form X(u,v)=Ωu−v+t1∧t2+⋯+t2n−1∧t2n, where ΩΩ denotes the quadratic Casimir element of g and {ti}{ti} are linearly independent elements in a maximal torus t of g. The quantization of these solutions is also emphasized.