Double Bruhat cells and symplectic groupoids

Abstract

Let G be a connected complex semisimple Lie group, equipped with a standard multiplicative Poisson structure π st determined by a pair of opposite Borel subgroups (B, B-). We prove that for each v in the Weyl group W of G, the double Bruhat cell Gv,v = BvB B-vB- in G, together with the Poisson structure π st, is naturally a Poisson groupoid over the Bruhat cell BvB/B in the flag variety G/B. Correspondingly, every symplectic leaf of π st in Gv,v is a symplectic groupoid over BvB/B. For u, v ∈ W, we show that the double Bruhat cell (Gu,v, π st) has a naturally defined left Poisson action by the Poisson groupoid (Gu, u,π st) and a right Poisson action by the Poisson groupoid (Gv,v, π st), and the two actions commute. Restricting to symplectic leaves of π st, one obtains commuting left and right Poisson actions on symplectic leaves in Gu,v by symplectic leaves in Gu, u and in Gv,v as symplectic groupoids.