On irreducible algebras of conformal endomorphisms over a linear algebraic group
Abstract
We study the algebra of conformal endomorphisms G,Gn of a finitely generated free module Mn over the coordinate Hopf algebra H of a linear algebraic group G. It is shown that a conformal subalgebra of n acting irreducibly on Mn generates an essential left ideal of G,Gn if enriched with operators of multiplication on elements of H. In particular, we describe such subalgebras for the case when G is finite.
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