Parabolic contractions of semisimple Lie algebras and their invariants (1301.0249v1)

Abstract: Let $G$ be a connected semisimple algebraic group with Lie algebra $g$ and $P$ a parabolic subgroup of $G$ with $Lie(P)=p$. The parabolic contraction of $g$ is the semi-direct product of $p$ and a $p$-module $g/p$ regarded as an abelian ideal. We are interested in the polynomial invariants of the adjoint and coadjoint representations of $q$. In the adjoint case the algebra of invariants is easy to describe and turns out to be a graded polynomial algebra. The coadjoint case is more complicated. Here we found a connection between symmetric invariants of $q$ and symmetric invariants of centralisers $g_e\subset g$, where $e$ is a Richardson element with polarisation $p$. Using this connection and results of Panyushev, Premet, and Yakimova (see arxiv:0610049), we prove that the algebra of symmetric invariants of $q$ is free for all parabolics in types $A$ and $C$ and some parabolics in type $B$. The technique also applies to minimal parabolics in all types. For a Borel subalgebra, one gets a contraction of $g$ recently introduced by E.Feigin (arXiv:1007.0646 and arXiv:1101.1898) and studied from invariant-theoretic point of view in our previous paper (arxiv:1107.0702).