Manin triple

In mathematics, a Manin triple $({\mathfrak {g}},{\mathfrak {p}},{\mathfrak {q}})$ consists of a Lie algebra ${\mathfrak {g}}$ with a non-degenerate invariant symmetric bilinear form, together with two isotropic subalgebras ${\mathfrak {p}}$ and ${\mathfrak {q}}$ such that ${\mathfrak {g}}$ is the direct sum of ${\mathfrak {p}}$ and ${\mathfrak {q}}$ 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 ${\mathfrak {g}}$ is a complex reductive Lie algebra.^[2]

Manin triples and Lie bialgebras

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

More precisely, if $({\mathfrak {g}},{\mathfrak {p}},{\mathfrak {q}})$ is a finite-dimensional Manin triple, then ${\mathfrak {p}}$ can be made into a Lie bialgebra by letting the cocommutator map ${\mathfrak {p}}\to {\mathfrak {p}}\otimes {\mathfrak {p}}$ be the dual of the Lie bracket ${\mathfrak {q}}\otimes {\mathfrak {q}}\to {\mathfrak {q}}$ (using the fact that the symmetric bilinear form on ${\mathfrak {g}}$ identifies ${\mathfrak {q}}$ with the dual of ${\mathfrak {p}}$ ).

Conversely if ${\mathfrak {p}}$ is a Lie bialgebra then one can construct a Manin triple $({\mathfrak {p}}\oplus {\mathfrak {p}}^{*},{\mathfrak {p}},{\mathfrak {p}}^{*})$ by letting ${\mathfrak {q}}$ be the dual of ${\mathfrak {p}}$ and defining the commutator of ${\mathfrak {p}}$ and ${\mathfrak {q}}$ to make the bilinear form on ${\mathfrak {g}}={\mathfrak {p}}\oplus {\mathfrak {q}}$ invariant.

Examples

Suppose that ${\mathfrak {a}}$ is a complex semisimple Lie algebra with invariant symmetric bilinear form $(\cdot ,\cdot )$ . Then there is a Manin triple $({\mathfrak {g}},{\mathfrak {p}},{\mathfrak {q}})$ with ${\mathfrak {g}}={\mathfrak {a}}\oplus {\mathfrak {a}}$ , with the scalar product on ${\mathfrak {g}}$ given by $((w,x),(y,z))=(w,y)-(x,z)$ . The subalgebra ${\mathfrak {p}}$ is the space of diagonal elements $(x,x)$ , and the subalgebra ${\mathfrak {q}}$ is the space of elements $(x,y)$ with $x$ in a fixed Borel subalgebra containing a Cartan subalgebra ${\mathfrak {h}}$ , $y$ in the opposite Borel subalgebra, and where $x$ and $y$ have the same component in ${\mathfrak {h}}$ .

References

^ 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.
^ 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.

[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.

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