Contact Lie algebras, generic stabilisers, and affine seaweeds
Abstract
Let q=Lie Q be an algebraic Lie algebra of index 1, i.e., a generic Q-orbit on q* has codimension 1. We show that the following conditions are equivalent: q is contact; a generic Q-orbit on q* is not conical; there is a generic stabiliser for the coadjoint action of q. In addition, if q is contact, then the subalgebra S( q) si⊂ S( q) generated by symmetric semi-invariants of q is a polynomial ring. We study also affine seaweed Lie algebras of type A and find some contact as well as non-contact examples among them.
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