Geometric leaf of symplectic groupoid
Abstract
We consider the symplectic groupoid of pairs (B, A) with A real unipotent upper-triangular matrix and B∈ GLn being such that A=BABT is also a unipotent upper-triangular matrix. Fock and Chekhov defined a Poisson map of Teichm\"uller space Tg,s of genus g surfaces with s holes into the space of unipotent upper-triangular n× n matrices whose image forms the geometric locus. The elements of geometric locus satisfy rank condition. We describe the Hamiltonian reduction of the Poisson cluster variety of symplectic groupoid by the rank condition for n=5 and 6. In both cases, we analyze the induced cluster structures on the results of Hamiltonian reduction and recover celebrated cluster structure on T2,1 for n=5 and T2,2 for n=6.
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