Index of a Lie algebra

Group theory → Lie groups
Lie groups

Classical
List of simple Lie groups
A_n B_n C_n D_n
Exceptional
G₂ F₄ E₆ E₇ E₈

Other Lie groups

Lie algebras

Semisimple Lie algebra

Homogeneous spaces

Representation theory

Lie groups in physics

Scientists

Table of Lie groups

Let g be a Lie algebra over a field K. Let further $\xi \in {\mathfrak {g}}^{*}$ be a one-form on g. The stabilizer g_ξ of ξ is the Lie subalgebra of elements of g that annihilate ξ in the coadjoint representation. The index of the Lie algebra is

{\mathrm {ind}}\,{\mathfrak {g}}:=\min \limits _{{\xi \in {\mathfrak {g}}^{*}}}{\mathrm {dim}}\,{\mathfrak {g}}_{\xi }.

Examples

Reductive Lie algebras

If g is reductive then the index of g is also the rank of g, because the adjoint and coadjoint representation are isomorphic and rk g is the minimal dimension of a stabilizer of an element in g. This is actually the dimension of the stabilizer of any regular element in g.

Frobenius Lie algebra

If ind g=0, then g is called Frobenius Lie algebra. This is equivalent to the fact that the Kirillov form $K_{\xi }\colon {\mathfrak {g\otimes g}}\to {\mathbb {K}}:(X,Y)\mapsto \xi ([X,Y])$ is non-singular for some ξ in g^*. Another equivalent condition when g is the Lie algebra of an algebraic group G, is that g is Frobenius if and only if G has an open orbit in g^* under the coadjoint representation.

Notes

References

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