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On the unicity of braidings of quasitriangular Lie bialgebras

Any quantization of a quasitriangular Lie bialgebra g gives rise to a braiding of the dual Poisson-Lie formal group G^*. We show that this braiding always coincides with the Weinstein-Xu braiding. We also define the lifts of the classical r-matrix r as certain functions on G^* x G^*, prove their existence and uniqueness using co-Hochschild cohomology arguments and show that the lift can be expressed in terms of r by universal formulas.

preprint2002arXivOpen access
B. EnriquezF. GavariniG. Halbout
math.QA
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Open access3 authors1 topic
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B. EnriquezF. GavariniG. Halbout

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