Classical Yang-Baxter Equation and Left Invariant Affine Geometry on Lie Groups

Abstract

Let G be a Lie group with Lie algebra G: = Tε G and T*G = G* G its cotangent bundle considered as a Lie group, where G acts on G* via the coadjoint action. We show that there is a 1-1 correspondance between the skew-symmetric solutions r∈ 2 G of the Classical Yang-Baxter Equation in G, and the set of connected Lie subgroups of T*G which carry a left invariant affine structure and whose Lie algebras are lagrangian graphs in G G*. An invertible solution r endows G with a left invariant symplectic structure and hence a left invariant affine structure. In this case we prove that the Poisson Lie tensor π := r+ - r- is polynomial of degree at most 2 and the double Lie groups of (G,π) also carry a canonical left invariant affine structure. In the general case of (non necessarly invertible) solutions r, we supply a necessary and suffisant condition to the geodesic completness of the associated affine structure

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