On quantization of Semenov-Tian-Shansky Poisson bracket on simple algebraic groups
Abstract
Let G be a simple complex factorizable Poisson Lie algebraic group. Let () be the corresponding quantum group. We study ()-equivariant quantization [G] of the affine coordinate ring [G] along the Semenov-Tian-Shansky bracket. For a simply connected group G we prove an analog of the Kostant-Richardson theorem stating that [G] is a free module over its center.
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