1. Configuration Poisson groupoids of flags
- Author
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Lu, Jiang-Hua, Mouquin, Victor, and Yu, Shizhuo
- Subjects
Mathematics - Symplectic Geometry ,General Mathematics ,Mathematics::Category Theory ,Mathematics - Quantum Algebra ,FOS: Mathematics ,Symplectic Geometry (math.SG) ,Quantum Algebra (math.QA) ,Representation Theory (math.RT) ,Mathematics::Symplectic Geometry ,Mathematics - Representation Theory - Abstract
Let $G$ be a connected complex semi-simple Lie group and ${\mathcal {B}}$ its flag variety. For every positive integer $n$, we introduce a Poisson groupoid over ${{\mathcal {B}}}^n$, called the $n$th total configuration Poisson groupoid of flags of $G$, which contains a family of Poisson sub-groupoids whose total spaces are generalized double Bruhat cells and bases generalized Schubert cells in ${\mathcal {B}}^n$. Certain symplectic leaves of these Poisson sub-groupoids are then shown to be symplectic groupoids over generalized Schubert cells. We also give explicit descriptions of symplectic leaves in three series of Poisson varieties associated to $G$.
- Published
- 2021