The Frobenius semiradical, generic stabilisers, and Poisson centre for nilradicals

Abstract

Let g be a complex simple Lie algebra and n the nilradical of a parabolic subalgebra of g. We consider some properties of the coadjoint representation of n and related algebras of invariants. This includes (i) the problem of existence of generic stabilisers, (ii) a description of the Frobenius semiradical of n and the Poisson centre Z( n) of the symmetric algebra S( n), (iii) the structure of S( n) as Z( n)-module, and (iv) the description of square integrable (= quasi-reductive) nilradicals. Our main technical tools are the Kostant cascade in the set of positive roots of g and the notion of optimisation of n.

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