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On Some Universal Algebras Associated to the Category of Lie Bialgebras

✍ Scribed by B. Enriquez

Publisher
Elsevier Science
Year
2001
Tongue
English
Weight
195 KB
Volume
164
Category
Article
ISSN
0001-8708

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✦ Synopsis

In our previous work (math/0008128), we studied the set Quant(K) of all universal quantization functors of Lie bialgebras over a field K of characteristic zero, compatible with the operations of taking duals and doubles. We showed that Quant ), where G 0 (K) is a universal group and Q Q(K) is a quotient set of a set B(K) of families of Lie polynomials by the action of a group G(K). We prove here that G 0 (K) is equal to the multiplicative group

We also prove that the only universal derivations of Lie bialgebras are multiples of the composition of the bracket with the cobracket. Finally, we prove that the stabilizer of any element of B(K) is reduced to the 1-parameter subgroup generated by the corresponding ''square of the antipode.''

πŸ“œ SIMILAR VOLUMES

On the Associative Analog of Lie Bialgeb
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✍ Marcelo Aguiar πŸ“‚ Article πŸ“… 2001 πŸ› Elsevier Science 🌐 English βš– 233 KB

An infinitesimal bialgebra is at the same time an associative algebra and coalgebra in such a way that the comultiplication is a derivation. This paper continues the basic study of these objects, with emphasis on the connections with the theory of Lie bialgebras. It is shown that non-degenerate anti