Morita equivalences, moduli spaces and flag varieties
Abstract
Double Bruhat cells in a complex semisimple Lie group $G$ emerged as a crucial concept in the work of S. Fomin and A. Zelevinsky on total positivity and cluster algebras. Double Bruhat cells are special instances of a broader class of cluster varieties known as generalized double Bruhat cells. These can be studied collectively as Poisson subvarieties of $\widetilde{F}_{2n} = G \times \mathcal{B}^{2n-1}$, where $\mathcal{B}$ is the flag variety of $G$. The spaces $\widetilde{F}_{2n}$ are Poisson groupoids over $\mathcal{B}^n$, and they were introduced in the study of configuration Poisson groupoids of flags by J.-H. Lu, V. Mouquin, and S. Yu. In this work, we describe the spaces $\widetilde{F}_{2n}$ as decorated moduli spaces of flat $G$-bundles over a disc. As a consequence, we obtain the following results. (1) We explicitly integrate the Poisson groupoids $\widetilde{F}_{2n}$ to double symplectic groupoids, which are complex algebraic varieties. Moreover, we show that these integrations are symplectically Morita equivalent for all $n$, thereby recovering the Poisson bimodule structures on double Bruhat cells via restriction. (2) Using the previous construction, we integrate the Poisson subgroupoids of $\widetilde{F}_{2n}$ given by unions of generalized double Bruhat cells to explicit double symplectic groupoids. As a corollary, we obtain integrations of the top-dimensional generalized double Bruhat cells inside them. (3) Finally, we relate our integration with the work of P. Boalch on meromorphic connections. We lift to the groupoids the torus actions that give rise to such cluster varieties and show that they correspond to the quasi-Hamiltonian actions on the fission spaces of irregular singularities.