Some semi-direct products with free algebras of symmetric invariants
Abstract
Let g be a complex reductive Lie algebra and V the underling vector space of a finite-dimensional representation of g. Then one can consider a new Lie algebra q= g V, which is a semi-direct product of g and an Abelian ideal V. We outline several results on the algebra C[ q*] q of symmetries invariants of q and describe all semi-direct products related to the defining representation of sln with C[ q*] q being a free algebra.
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