The centralisers of nilpotent elements in classical Lie algebras
Abstract
The index of a finite-dimensional Lie algebra g is the minimum of dimensions of stabilisers gα of elements α∈ g*. Let g be a reductive Lie algebra and z(x) a centraliser of a nilpotent element x∈ g. Elashvili has conjectured that the index of the centraliser z(x) equals the index of g, i.e., the rank of g. Here Elashvili's conjecture is proved for reductive Lie algebras of classical type. It is shown that in cases g=gln and g=sp2n the coadjoint action of z(x) has a generic stabiliser. Also, we give an example of a nilpotent element x∈ so8 such that the coadjoint action of z(x) has no generic stabiliser.
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