A local normal form for Hamiltonian actions of compact semisimple Poisson-Lie groups

Abstract

The main contribution of this manuscript is a local normal form for Hamiltonian actions of Poisson-Lie groups K on a symplectic manifold equipped with an AN-valued moment map, where AN is the dual Poisson-Lie group of K. Our proof uses the delinearization theorem of Alekseev which relates a classical Hamiltonian action of K with k*-valued moment map to a Hamiltonian action with an AN-valued moment map, via a deformation of symplectic structures. We obtain our main result by proving a ``delinearization commutes with symplectic quotients'' theorem which is also of independent interest, and then putting this together with the local normal form theorem for classical Hamiltonian actions wtih k*-valued moment maps. A key ingredient for our main result is the delinearization D(ωcan) of the canonical symplectic structure on T*K, so we additionally take some steps toward explicit computations of D(ωcan). In particular, in the case K=SU(2), we obtain explicit formulas for the matrix coefficients of D(ωcan) with respect to a natural choice of coordinates on T*SU(2).

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