Trigonometric dynamical r-matrices over Poisson Lie base
Abstract
Let be a finite dimensional complex Lie algebra and ⊂ a Lie subalgebra equipped with the structure of a factorizable quasitriangular Lie bialgebra. Consider the Lie group with the Semenov-Tjan-Shansky Poisson bracket as a Poisson Lie manifold for the double Lie bialgebra . Let (0)⊂ be an open domain parameterizing a neighborhood of the identity in by the exponential map. We present dynamical r-matrices with values in over the Poisson Lie base manifold (0).
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