Tensor modules over the Lie algebras of divergence zero vector fields on Cn
Abstract
Let n≥ 2 be an integer, Sn be the Lie algebra of vector fields on Cn with zero divergence, and Dn be the Weyl algebra over the polynomial algebra An=C[t1,t2,·s,tn]. In this paper, we study the simplicity of the tensor Sn-module F(P,M), where P is a simple Dn-module and M is a simple sln-module. We obtain the necessary and sufficient conditions for F(P,M) to be an irreducible module, and determine all simple subquotients of F(P,M) when it is reducible.
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