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Manin triple

From Wikipedia, the free encyclopedia

In mathematics, a Manin triple consists of a Lie algebra with a non-degenerate invariant symmetric bilinear form, together with two isotropic subalgebras and such that is the direct sum of and as a vector space. A closely related concept is the (classical) Drinfeld double, which is an even dimensional Lie algebra which admits a Manin decomposition.

Manin triples were introduced by Vladimir Drinfeld in 1987, who named them after Yuri Manin.[1]

In 2001 Delorme [fr] classified Manin triples where is a complex reductive Lie algebra.[2]

Manin triples and Lie bialgebras

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There is an equivalence of categories between finite-dimensional Manin triples and finite-dimensional Lie bialgebras.

More precisely, if is a finite-dimensional Manin triple, then can be made into a Lie bialgebra by letting the cocommutator map be the dual of the Lie bracket (using the fact that the symmetric bilinear form on identifies with the dual of ).

Conversely if is a Lie bialgebra then one can construct a Manin triple by letting be the dual of and defining the commutator of and to make the bilinear form on invariant.

Examples

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  • Suppose that is a complex semisimple Lie algebra with invariant symmetric bilinear form . Then there is a Manin triple with , with the scalar product on given by . The subalgebra is the space of diagonal elements , and the subalgebra is the space of elements with in a fixed Borel subalgebra containing a Cartan subalgebra , in the opposite Borel subalgebra, and where and have the same component in .

References

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  1. ^ Drinfeld, V. G. (1987). Gleason, Andrew (ed.). "Quantum groups" (PDF). Proceedings of the International Congress of Mathematicians 1986. 1. Berkeley: American Mathematical Society: 798–820. ISBN 978-0-8218-0110-9. MR 0934283.
  2. ^ Delorme, Patrick (2001-12-01). "Classification des triples de Manin pour les algèbres de Lie réductives complexes: Avec un appendice de Guillaume Macey". Journal of Algebra. 246 (1): 97–174. arXiv:math/0003123. doi:10.1006/jabr.2001.8887. ISSN 0021-8693. MR 1872615.