English

Double Bruhat cells and symplectic groupoids

Differential Geometry 2016-07-05 v1

Abstract

Let GG be a connected complex semisimple Lie group, equipped with a standard multiplicative Poisson structure πst\pi_{{\rm st}} determined by a pair of opposite Borel subgroups (B,B)(B, B_-). We prove that for each vv in the Weyl group WW of GG, the double Bruhat cell Gv,v=BvBBvBG^{v,v} = BvB \cap B_-vB_- in GG, together with the Poisson structure πst\pi_{{\rm st}}, is naturally a Poisson groupoid over the Bruhat cell BvB/BBvB/B in the flag variety G/BG/B. Correspondingly, every symplectic leaf of πst\pi_{{\rm st}} in Gv,vG^{v,v} is a symplectic groupoid over BvB/BBvB/B. For u,vWu, v \in W, we show that the double Bruhat cell (Gu,v,πst)(G^{u,v}, \pi_{{\rm st}}) has a naturally defined left Poisson action by the Poisson groupoid (Gu,u,πst)(G^{u, u},\pi_{{\rm st}}) and a right Poisson action by the Poisson groupoid (Gv,v,πst)(G^{v,v}, \pi_{{\rm st}}), and the two actions commute. Restricting to symplectic leaves of πst\pi_{{\rm st}}, one obtains commuting left and right Poisson actions on symplectic leaves in Gu,vG^{u,v} by symplectic leaves in Gu,uG^{u, u} and in Gv,vG^{v,v} as symplectic groupoids.

Keywords

Cite

@article{arxiv.1607.00527,
  title  = {Double Bruhat cells and symplectic groupoids},
  author = {Jiang-Hua Lu and Victor Mouquin},
  journal= {arXiv preprint arXiv:1607.00527},
  year   = {2016}
}

Comments

32 pages

R2 v1 2026-06-22T14:41:34.230Z