Classification of Quasifinite Modules over the Lie Algebras of Weyl Type

Abstract

For a nondegenerate additive subgroup G of the n-dimensional vector space Fn over an algebraically closed field F of characteristic zero, there is an associative algebra and a Lie algebra of Weyl type W(G,n) spanned by all differential operators u D1m1... Dnmn for u∈ F[G] (the group algebra), and m1,...,mn 0, where D1, ...,Dn are degree operators. In this paper, it is proved that an irreducible quasifinite W(,1)-module is either a highest or lowest weight module or else a module of the intermediate series; furthermore, a classification of uniformly bounded W(,1)-modules is completely given. It is also proved that an irreducible quasifinite W(G,n)-module is a module of the intermediate series and a complete classification of quasifinite W(G,n)-modules is also given, if G is not isomorphic to .

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